Accessing interferometer data

Gravitational-wave detectors are time-domain instruments, attempting to record gravitational-wave amplitude as a differential change in the lengths of each of the interferometer arms. The primary output of these detectors is a single time-stream of gravitational-wave strain.

Alongside these data, thousands of auxiliary instrumental control and error signals and environmental monitors are recorded in real-time and recorded to disk and archived for off-line study. The data are archived in .gwf files, a custom binary format that efficiently stores the time streams and all necessary metadata, for more details about this particular data format, take a look at the specification document LIGO-T970130.

Remote data access

GWpy provides ways to download these data, one for authorised collaborators, and another for public data releases:

Method Restricted? Description
TimeSeries.get LIGO.ORG Fetch data via NDS2 or gw_data_find
TimeSeries.fetch_open_data public Fetch data from LIGO Open Science Center (LOSC)

Public

For example, to fetch 32 seconds of strain data around event GW150914:

from gwpy.timeseries import TimeSeries
data = TimeSeries.fetch_open_data('L1', 1126259446, 1126259478)

Here the 'L1' refers to the LIGO Livingston Observatory ('H1' would be the LIGO Hanford Observatory), and the two 10-digit numbers are GPS times (for more details on GPS timing, see Times and timestamps). You could just as easily use a more readable format:

data = TimeSeries.fetch_open_data('L1', 'Sep 14 2015 09:50:29', 'Sep 14 2015 09:51:01')

Note

These data are part of small snippet of LIGO data provided by the LIGO Open Science Center, and are freely available to the public, see the LOSC website for full details on which data are available.

LIGO.ORG

If you have LIGO.ORG credentials, meaning you’re a member of the LIGO Scientific Collaboration or the Virgo Collaboration, you need to specify the exact name of the channel you want:

data = TimeSeries.get('H1:GDS-CALIB_STRAIN', 1126259446, 1126259478)

With authenticated access, you also have access to the thousands of auxiliary channels mentioned above, if you run.:

gnd = TimeSeries.get('L1:ISI-GND_STS_ITMY_Z_DQ', 'Jan 1 2016', 'Jan 1 2016 01:00')

you’ll get back one hour of data from the vertical-ground-motion seismometer located near the ITMY vacuum enclosure at LIGO Livingston.

The TimeSeries.get method tries direct file access (using glue.datafind for file discovery) first, then falls back to using the Network Data Server (NDS2) for remote access. If you want to manually use NDS2 for remote access you can instead use the TimeSeries.fetch method.

Local data access

If you have direct access to one or more files of data, either on the LIGO Data Grid (where the gwf files are stored) or you have some files of your own, you can use the TimeSeries.read method:

This method is an example of the unified input/output system provided by astropy, so should respond in the same way whether you give it a gwf file, or an ''hdf5'' file, or a simple ''txt'' file.:

data = TimeSeries.read(‘mydata.gwf’, ‘L1:GDS-CALIB_STRAIN’)

Note

The input options to TimeSeries.read depend on what format the source data are in, please refer to the function documentation for details and examples

If you are on the LIGO Data Grid, but you don’t know where the files are, you can use the TimeSeries.find method to automatically locate and read data for a given channel:

data = TimeSeries.find('L1:ISI-GND_STS_ITMY_Z_DQ', 'Jan 1 2016', 'Jan 1 2016 01:00')

Accessing data for multiple channels at once

Because typically each gwf file contains data for a large number of channels, it is inefficient to ask for data for each channel in turn, since that would meaning opening, decoding, and closing each file every time. Instead you can read all of the data you want in a single step, using the TimeSeriesDict object, either for remote access:

from gwpy.timeseries import TimeSeriesDict
alldata = TimeSeriesDict.fetch(['H1:ISI-GND_STS_ITMX_X_DQ', 'H1:SUS-ITMX_L2_WIT_L_DQ', 'Feb 1 09:00', 'Feb 1 09:15')

or from gwf files:

alldata = TimeSeriesDict.get(['H1:PSL-PWR_PMC_TRANS_OUT16','H1:IMC-PWR_IN_OUT16'], 'Feb 1 00:00', 'Feb 1 02:00')  # fetch the data via NDS

[These two channels represent the power generated by the Pre-Stabilized Laser at the input to interferometer, and the power actually entering the Input Mode Cleaner.]

Plotting a TimeSeries

The TimeSeries object comes with its own plot() method, which will quickly construct a TimeSeriesPlot. In the following example, we download ten seconds of gravitational-wave strain data from the LIGO Hanford Observatory, and display it:

(Source code, png)

../_images/index-12.png

And similarly for the TimeSeriesDict (using plot):

(Source code, png)

../_images/index-21.png

Reference/API

The gwpy.timeseries module provides the following class objects for handling instrumental data:

TimeSeries A time-domain data array
TimeSeriesList Ordered key-value mapping of named TimeSeries objects
TimeSeriesDict Ordered key-value mapping of named TimeSeries objects
class gwpy.timeseries.TimeSeries[source]

Bases: gwpy.timeseries.core.TimeSeriesBase

A time-domain data array

Parameters:

value : array-like

input data array

unit : Unit, optional

physical unit of these data

epoch : LIGOTimeGPS, float, str

GPS epoch associated with these data, any input parsable by to_gps is fine

sample_rate : float, Quantity, optional, default: 1

the rate of samples per second (Hertz)

times : array-like

the complete array of GPS times accompanying the data for this series. This argument takes precedence over epoch and sample_rate so should be given in place of these if relevant, not alongside

name : str, optional, default: None

descriptive title for this array

channel : Channel, str

source data stream for these data

dtype : dtype, optional, default: None

input data type

copy : bool, optional, default: False

choose to copy the input data to new memory

subok : bool, optional, default: True

allow passing of sub-classes by the array generator

Examples

Any regular array, i.e. any iterable collection of data, can be easily converted into a TimeSeries:

>>> data = numpy.asarray([1,2,3])
>>> series = TimeSeries(data)

The necessary metadata to reconstruct timing information are recorded in the epoch and sample_rate attributes. This time-stamps can be returned via the times property.

All comparison operations performed on a TimeSeries will return a StateTimeSeries - a boolean array with metadata copied from the starting TimeSeries.

Key Methods

fetch(*args, **kwargs) Fetch data from NDS into a TimeSeries.
read(*args, **kwargs) Read data into a TimeSeries
write(data, *args, **kwargs) Write this TimeSeries to a file
plot(**kwargs) Plot the data for this TimeSeries.

Attributes Summary

T Same as self.transpose(), except that self is returned if self.ndim < 2.
base Base object if memory is from some other object.
cgs Returns a copy of the current Quantity instance with CGS units.
channel Instrumental channel associated with these data
ctypes An object to simplify the interaction of the array with the ctypes module.
data
dt X-axis sample separation
dtype Data-type of the array’s elements.
duration Duration of this series in seconds
dx X-axis sample separation
epoch GPS epoch for these data.
equivalencies A list of equivalencies that will be applied by default during unit conversions.
flags Information about the memory layout of the array.
flat A 1-D iterator over the Quantity array.
imag The imaginary part of the array.
info Container for meta information like name, description, format.
isscalar True if the value of this quantity is a scalar, or False if it is an array-like object.
itemsize Length of one array element in bytes.
name Name for this data set
nbytes Total bytes consumed by the elements of the array.
ndim Number of array dimensions.
real The real part of the array.
sample_rate Data rate for this TimeSeries in samples per second (Hertz).
shape Tuple of array dimensions.
si Returns a copy of the current Quantity instance with SI units.
size Number of elements in the array.
span X-axis [low, high) segment encompassed by these data
strides Tuple of bytes to step in each dimension when traversing an array.
times Series of GPS times for each sample
unit The physical unit of these data
value The numerical value of this quantity.
x0 X-axis value of the first data point
xindex Positions of the data on the x-axis
xspan X-axis [low, high) segment encompassed by these data
xunit Unit of x-axis index

Methods Summary

all([axis, out, keepdims]) Returns True if all elements evaluate to True.
any([axis, out, keepdims]) Returns True if any of the elements of a evaluate to True.
append(other[, gap, inplace, pad, resize]) Connect another series onto the end of the current one.
argmax([axis, out]) Return indices of the maximum values along the given axis.
argmin([axis, out]) Return indices of the minimum values along the given axis of a.
argpartition(kth[, axis, kind, order]) Returns the indices that would partition this array.
argsort([axis, kind, order]) Returns the indices that would sort this array.
asd([fftlength, overlap, method]) Calculate the ASD FrequencySeries of this TimeSeries.
astype(dtype[, order, casting, subok, copy]) Copy of the array, cast to a specified type.
auto_coherence(dt[, fftlength, overlap, window]) Calculate the frequency-coherence between this TimeSeries and a time-shifted copy of itself.
average_fft([fftlength, overlap, window]) Compute the averaged one-dimensional DFT of this TimeSeries.
bandpass(flow, fhigh[, gpass, gstop, stops]) Filter this TimeSeries by applying low- and high-pass filters.
byteswap(inplace) Swap the bytes of the array elements
choose(choices[, out, mode]) Use an index array to construct a new array from a set of choices.
clip([min, max, out]) Return an array whose values are limited to [min, max].
coherence(other[, fftlength, overlap, window]) Calculate the frequency-coherence between this TimeSeries and another.
coherence_spectrogram(other, stride[, ...]) Calculate the coherence spectrogram between this TimeSeries and other.
compress(condition[, axis, out]) Return selected slices of this array along given axis.
conj() Complex-conjugate all elements.
conjugate() Return the complex conjugate, element-wise.
copy([order]) Return a copy of the array.
copy_metadata() Return a deepcopy of the metadata for this array
crop([start, end, copy]) Crop this series to the given x-axis extent.
csd(other[, fftlength, overlap]) Calculate the CSD FrequencySeries for two TimeSeries
csd_spectrogram(other, stride[, fftlength, ...]) Calculate the cross spectral density spectrogram of this TimeSeries with ‘other’.
cumprod([axis, dtype, out]) Return the cumulative product of the elements along the given axis.
cumsum([axis, dtype, out]) Return the cumulative sum of the elements along the given axis.
decompose([bases]) Generates a new Quantity with the units decomposed.
detrend([detrend]) Remove the trend from this TimeSeries
diagonal([offset, axis1, axis2]) Return specified diagonals.
diff([n, axis]) Calculate the n-th discrete difference along given axis.
dot(b[, out]) Dot product of two arrays.
dump(file) Dump a pickle of the array to the specified file.
dumps() Returns the pickle of the array as a string.
ediff1d([to_end, to_begin])
fetch(*args, **kwargs) Fetch data from NDS into a TimeSeries.
fetch_open_data(ifo, start, end[, name, ...]) Fetch open-access data from the LIGO Open Science Center
fft([nfft]) Compute the one-dimensional discrete Fourier transform of this TimeSeries.
fftgram(stride) Calculate the Fourier-gram of this TimeSeries.
fill(value) Fill the array with a scalar value.
filter(*filt) Apply the given filter to this TimeSeries.
find(channel, start, end[, frametype, pad, ...]) Find and read data from frames for a channel
flatten([order]) Return a copy of the array collapsed into one dimension.
from_hdf5(*args, **kwargs) Read an array from the given HDF file.
from_lal(*args, **kwargs) Generate a new TimeSeries from a LAL TimeSeries of any type.
from_nds2_buffer(*args, **kwargs) Construct a new TimeSeries from an nds2.buffer object
from_pycbc(ts) Convert a pycbc.types.timeseries.TimeSeries into a TimeSeries
get(channel, start, end[, pad, dtype, verbose]) Get data for this channel from frames or NDS
getfield(dtype[, offset]) Returns a field of the given array as a certain type.
highpass(frequency[, gpass, gstop, stop]) Filter this TimeSeries with a Butterworth high-pass filter.
insert(obj, values[, axis]) Insert values along the given axis before the given indices and return a new Quantity object.
is_compatible(other) Check whether this series and other have compatible metadata
is_contiguous(other[, tol]) Check whether other is contiguous with self.
item(*args) Copy an element of an array to a standard Python scalar and return it.
itemset(*args) Insert scalar into an array (scalar is cast to array’s dtype, if possible)
lowpass(frequency[, gpass, gstop, stop]) Filter this TimeSeries with a Butterworth low-pass filter.
max([axis, out]) Return the maximum along a given axis.
mean([axis, dtype, out, keepdims]) Returns the average of the array elements along given axis.
median([axis]) Compute the median along the specified axis.
min([axis, out, keepdims]) Return the minimum along a given axis.
nansum([axis, out, keepdims])
newbyteorder([new_order]) Return the array with the same data viewed with a different byte order.
nonzero() Return the indices of the elements that are non-zero.
notch(frequency[, type]) Notch out a frequency in a TimeSeries
override_unit(unit[, parse_strict]) Forcefully reset the unit of these data
pad(pad_width, **kwargs) Pad this series to a new size
partition(kth[, axis, kind, order]) Rearranges the elements in the array in such a way that value of the element in kth position is in the position it would be in a sorted array.
plot(**kwargs) Plot the data for this TimeSeries.
prepend(other[, gap, inplace, pad, resize]) Connect another series onto the start of the current one.
prod([axis, dtype, out, keepdims]) Return the product of the array elements over the given axis
psd([fftlength, overlap, method]) Calculate the PSD FrequencySeries for this TimeSeries.
ptp([axis, out]) Peak to peak (maximum - minimum) value along a given axis.
put(indices, values[, mode]) Set a.flat[n] = values[n] for all n in indices.
q_transform([qrange, frange, gps, search, ...]) Scan a TimeSeries using a multi-Q transform
ravel([order]) Return a flattened array.
rayleigh_spectrogram(stride[, fftlength, ...]) Calculate the Rayleigh statistic spectrogram of this TimeSeries
rayleigh_spectrum([fftlength, overlap]) Calculate the Rayleigh FrequencySeries for this TimeSeries.
read(*args, **kwargs) Read data into a TimeSeries
repeat(repeats[, axis]) Repeat elements of an array.
resample(rate[, window, numtaps]) Resample this Series to a new rate
reshape(shape[, order]) Returns an array containing the same data with a new shape.
resize(new_shape[, refcheck]) Change shape and size of array in-place.
rms([stride]) Calculate the root-mean-square value of this TimeSeries once per stride.
round([decimals, out]) Return a with each element rounded to the given number of decimals.
searchsorted(v[, side, sorter]) Find indices where elements of v should be inserted in a to maintain order.
setfield(val, dtype[, offset]) Put a value into a specified place in a field defined by a data-type.
setflags([write, align, uic]) Set array flags WRITEABLE, ALIGNED, and UPDATEIFCOPY, respectively.
sort([axis, kind, order]) Sort an array, in-place.
spectral_variance(stride[, fftlength, ...]) Calculate the SpectralVariance of this TimeSeries.
spectrogram(stride[, fftlength, overlap, ...]) Calculate the average power spectrogram of this TimeSeries using the specified average spectrum method.
spectrogram2(fftlength[, overlap, window, ...]) Calculate the non-averaged power Spectrogram of this TimeSeries
squeeze([axis]) Remove single-dimensional entries from the shape of a.
std([axis, dtype, out, ddof, keepdims]) Returns the standard deviation of the array elements along given axis.
sum([axis, dtype, out, keepdims]) Return the sum of the array elements over the given axis.
swapaxes(axis1, axis2) Return a view of the array with axis1 and axis2 interchanged.
take(indices[, axis, out, mode]) Return an array formed from the elements of a at the given indices.
to(unit[, equivalencies]) Returns a new Quantity object with the specified units.
to_hdf5(*args, **kwargs) Convert this array to a h5py.Dataset.
to_lal(*args, **kwargs) Convert this TimeSeries into a LAL TimeSeries.
to_pycbc(*args, **kwargs) Convert this TimeSeries into a PyCBC
tobytes([order]) Construct Python bytes containing the raw data bytes in the array.
tofile(fid[, sep, format]) Write array to a file as text or binary (default).
tolist() Return the array as a (possibly nested) list.
tostring([order]) Construct Python bytes containing the raw data bytes in the array.
trace([offset, axis1, axis2, dtype, out]) Return the sum along diagonals of the array.
transpose(*axes) Returns a view of the array with axes transposed.
update(other[, inplace]) Update this series by appending new data from an other and dropping the same amount of data off the start.
value_at(x) Return the value of this Series at the given xindex value
var([axis, dtype, out, ddof, keepdims]) Returns the variance of the array elements, along given axis.
view([dtype, type]) New view of array with the same data.
whiten(fftlength[, overlap, method, window, ...]) White this TimeSeries against its own ASD
write(data, *args, **kwargs) Write this TimeSeries to a file
zip() Zip the xindex and value arrays of this Series
zpk(zeros, poles, gain[, digital, unit]) Filter this TimeSeries by applying a zero-pole-gain filter

Attributes Documentation

T

Same as self.transpose(), except that self is returned if self.ndim < 2.

Examples

>>> x = np.array([[1.,2.],[3.,4.]])
>>> x
array([[ 1.,  2.],
       [ 3.,  4.]])
>>> x.T
array([[ 1.,  3.],
       [ 2.,  4.]])
>>> x = np.array([1.,2.,3.,4.])
>>> x
array([ 1.,  2.,  3.,  4.])
>>> x.T
array([ 1.,  2.,  3.,  4.])
base

Base object if memory is from some other object.

Examples

The base of an array that owns its memory is None:

>>> x = np.array([1,2,3,4])
>>> x.base is None
True

Slicing creates a view, whose memory is shared with x:

>>> y = x[2:]
>>> y.base is x
True
cgs

Returns a copy of the current Quantity instance with CGS units. The value of the resulting object will be scaled.

channel

Instrumental channel associated with these data

Type:Channel
ctypes

An object to simplify the interaction of the array with the ctypes module.

This attribute creates an object that makes it easier to use arrays when calling shared libraries with the ctypes module. The returned object has, among others, data, shape, and strides attributes (see Notes below) which themselves return ctypes objects that can be used as arguments to a shared library.

Parameters:

None :

Returns:

c : Python object

Possessing attributes data, shape, strides, etc.

See also

numpy.ctypeslib

Notes

Below are the public attributes of this object which were documented in “Guide to NumPy” (we have omitted undocumented public attributes, as well as documented private attributes):

  • data: A pointer to the memory area of the array as a Python integer. This memory area may contain data that is not aligned, or not in correct byte-order. The memory area may not even be writeable. The array flags and data-type of this array should be respected when passing this attribute to arbitrary C-code to avoid trouble that can include Python crashing. User Beware! The value of this attribute is exactly the same as self._array_interface_[‘data’][0].
  • shape (c_intp*self.ndim): A ctypes array of length self.ndim where the basetype is the C-integer corresponding to dtype(‘p’) on this platform. This base-type could be c_int, c_long, or c_longlong depending on the platform. The c_intp type is defined accordingly in numpy.ctypeslib. The ctypes array contains the shape of the underlying array.
  • strides (c_intp*self.ndim): A ctypes array of length self.ndim where the basetype is the same as for the shape attribute. This ctypes array contains the strides information from the underlying array. This strides information is important for showing how many bytes must be jumped to get to the next element in the array.
  • data_as(obj): Return the data pointer cast to a particular c-types object. For example, calling self._as_parameter_ is equivalent to self.data_as(ctypes.c_void_p). Perhaps you want to use the data as a pointer to a ctypes array of floating-point data: self.data_as(ctypes.POINTER(ctypes.c_double)).
  • shape_as(obj): Return the shape tuple as an array of some other c-types type. For example: self.shape_as(ctypes.c_short).
  • strides_as(obj): Return the strides tuple as an array of some other c-types type. For example: self.strides_as(ctypes.c_longlong).

Be careful using the ctypes attribute - especially on temporary arrays or arrays constructed on the fly. For example, calling (a+b).ctypes.data_as(ctypes.c_void_p) returns a pointer to memory that is invalid because the array created as (a+b) is deallocated before the next Python statement. You can avoid this problem using either c=a+b or ct=(a+b).ctypes. In the latter case, ct will hold a reference to the array until ct is deleted or re-assigned.

If the ctypes module is not available, then the ctypes attribute of array objects still returns something useful, but ctypes objects are not returned and errors may be raised instead. In particular, the object will still have the as parameter attribute which will return an integer equal to the data attribute.

Examples

>>> import ctypes
>>> x
array([[0, 1],
       [2, 3]])
>>> x.ctypes.data
30439712
>>> x.ctypes.data_as(ctypes.POINTER(ctypes.c_long))
<ctypes.LP_c_long object at 0x01F01300>
>>> x.ctypes.data_as(ctypes.POINTER(ctypes.c_long)).contents
c_long(0)
>>> x.ctypes.data_as(ctypes.POINTER(ctypes.c_longlong)).contents
c_longlong(4294967296L)
>>> x.ctypes.shape
<numpy.core._internal.c_long_Array_2 object at 0x01FFD580>
>>> x.ctypes.shape_as(ctypes.c_long)
<numpy.core._internal.c_long_Array_2 object at 0x01FCE620>
>>> x.ctypes.strides
<numpy.core._internal.c_long_Array_2 object at 0x01FCE620>
>>> x.ctypes.strides_as(ctypes.c_longlong)
<numpy.core._internal.c_longlong_Array_2 object at 0x01F01300>
data
dt

X-axis sample separation

Type:Quantity scalar
dtype

Data-type of the array’s elements.

Parameters:None :
Returns:d : numpy dtype object

See also

numpy.dtype

Examples

>>> x
array([[0, 1],
       [2, 3]])
>>> x.dtype
dtype('int32')
>>> type(x.dtype)
<type 'numpy.dtype'>
duration

Duration of this series in seconds

dx

X-axis sample separation

Type:Quantity scalar
epoch

GPS epoch for these data.

This attribute is stored internally by the x0 attribute

Type:Time
equivalencies

A list of equivalencies that will be applied by default during unit conversions.

flags

Information about the memory layout of the array.

Notes

The flags object can be accessed dictionary-like (as in a.flags['WRITEABLE']), or by using lowercased attribute names (as in a.flags.writeable). Short flag names are only supported in dictionary access.

Only the UPDATEIFCOPY, WRITEABLE, and ALIGNED flags can be changed by the user, via direct assignment to the attribute or dictionary entry, or by calling ndarray.setflags.

The array flags cannot be set arbitrarily:

  • UPDATEIFCOPY can only be set False.
  • ALIGNED can only be set True if the data is truly aligned.
  • WRITEABLE can only be set True if the array owns its own memory or the ultimate owner of the memory exposes a writeable buffer interface or is a string.

Arrays can be both C-style and Fortran-style contiguous simultaneously. This is clear for 1-dimensional arrays, but can also be true for higher dimensional arrays.

Even for contiguous arrays a stride for a given dimension arr.strides[dim] may be arbitrary if arr.shape[dim] == 1 or the array has no elements. It does not generally hold that self.strides[-1] == self.itemsize for C-style contiguous arrays or self.strides[0] == self.itemsize for Fortran-style contiguous arrays is true.

Attributes

flat

A 1-D iterator over the Quantity array.

This returns a QuantityIterator instance, which behaves the same as the flatiter instance returned by flat, and is similar to, but not a subclass of, Python’s built-in iterator object.

imag

The imaginary part of the array.

Examples

>>> x = np.sqrt([1+0j, 0+1j])
>>> x.imag
array([ 0.        ,  0.70710678])
>>> x.imag.dtype
dtype('float64')
info

Container for meta information like name, description, format. This is required when the object is used as a mixin column within a table, but can be used as a general way to store meta information.

isscalar

True if the value of this quantity is a scalar, or False if it is an array-like object.

Note

This is subtly different from numpy.isscalar in that numpy.isscalar returns False for a zero-dimensional array (e.g. np.array(1)), while this is True for quantities, since quantities cannot represent true numpy scalars.

itemsize

Length of one array element in bytes.

Examples

>>> x = np.array([1,2,3], dtype=np.float64)
>>> x.itemsize
8
>>> x = np.array([1,2,3], dtype=np.complex128)
>>> x.itemsize
16
name

Name for this data set

Type:str
nbytes

Total bytes consumed by the elements of the array.

Notes

Does not include memory consumed by non-element attributes of the array object.

Examples

>>> x = np.zeros((3,5,2), dtype=np.complex128)
>>> x.nbytes
480
>>> np.prod(x.shape) * x.itemsize
480
ndim

Number of array dimensions.

Examples

>>> x = np.array([1, 2, 3])
>>> x.ndim
1
>>> y = np.zeros((2, 3, 4))
>>> y.ndim
3
real

The real part of the array.

See also

numpy.real
equivalent function

Examples

>>> x = np.sqrt([1+0j, 0+1j])
>>> x.real
array([ 1.        ,  0.70710678])
>>> x.real.dtype
dtype('float64')
sample_rate

Data rate for this TimeSeries in samples per second (Hertz).

This attribute is stored internally by the dx attribute

Type:Quantity scalar
shape

Tuple of array dimensions.

Notes

May be used to “reshape” the array, as long as this would not require a change in the total number of elements

Examples

>>> x = np.array([1, 2, 3, 4])
>>> x.shape
(4,)
>>> y = np.zeros((2, 3, 4))
>>> y.shape
(2, 3, 4)
>>> y.shape = (3, 8)
>>> y
array([[ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.],
       [ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.],
       [ 0.,  0.,  0.,  0.,  0.,  0.,  0.,  0.]])
>>> y.shape = (3, 6)
Traceback (most recent call last):
  File "<stdin>", line 1, in <module>
ValueError: total size of new array must be unchanged
si

Returns a copy of the current Quantity instance with SI units. The value of the resulting object will be scaled.

size

Number of elements in the array.

Equivalent to np.prod(a.shape), i.e., the product of the array’s dimensions.

Examples

>>> x = np.zeros((3, 5, 2), dtype=np.complex128)
>>> x.size
30
>>> np.prod(x.shape)
30
span

X-axis [low, high) segment encompassed by these data

Type:Segment
strides

Tuple of bytes to step in each dimension when traversing an array.

The byte offset of element (i[0], i[1], ..., i[n]) in an array a is:

offset = sum(np.array(i) * a.strides)

A more detailed explanation of strides can be found in the “ndarray.rst” file in the NumPy reference guide.

See also

numpy.lib.stride_tricks.as_strided

Notes

Imagine an array of 32-bit integers (each 4 bytes):

x = np.array([[0, 1, 2, 3, 4],
              [5, 6, 7, 8, 9]], dtype=np.int32)

This array is stored in memory as 40 bytes, one after the other (known as a contiguous block of memory). The strides of an array tell us how many bytes we have to skip in memory to move to the next position along a certain axis. For example, we have to skip 4 bytes (1 value) to move to the next column, but 20 bytes (5 values) to get to the same position in the next row. As such, the strides for the array x will be (20, 4).

Examples

>>> y = np.reshape(np.arange(2*3*4), (2,3,4))
>>> y
array([[[ 0,  1,  2,  3],
        [ 4,  5,  6,  7],
        [ 8,  9, 10, 11]],
       [[12, 13, 14, 15],
        [16, 17, 18, 19],
        [20, 21, 22, 23]]])
>>> y.strides
(48, 16, 4)
>>> y[1,1,1]
17
>>> offset=sum(y.strides * np.array((1,1,1)))
>>> offset/y.itemsize
17
>>> x = np.reshape(np.arange(5*6*7*8), (5,6,7,8)).transpose(2,3,1,0)
>>> x.strides
(32, 4, 224, 1344)
>>> i = np.array([3,5,2,2])
>>> offset = sum(i * x.strides)
>>> x[3,5,2,2]
813
>>> offset / x.itemsize
813
times

Series of GPS times for each sample

unit

The physical unit of these data

Type:UnitBase
value

The numerical value of this quantity.

x0

X-axis value of the first data point

Type:Quantity scalar
xindex

Positions of the data on the x-axis

Type:Quantity array
xspan

X-axis [low, high) segment encompassed by these data

Type:Segment
xunit

Unit of x-axis index

Type:Unit

Methods Documentation

all(axis=None, out=None, keepdims=False)

Returns True if all elements evaluate to True.

Refer to numpy.all for full documentation.

See also

numpy.all
equivalent function
any(axis=None, out=None, keepdims=False)

Returns True if any of the elements of a evaluate to True.

Refer to numpy.any for full documentation.

See also

numpy.any
equivalent function
append(other, gap='raise', inplace=True, pad=0.0, resize=True)[source]

Connect another series onto the end of the current one.

Parameters:

other : Series

another series of the same type to connect to this one

gap : str, optional, default: 'raise'

action to perform if there’s a gap between the other series and this one. One of

  • 'raise' - raise an Exception
    • 'ignore' - remove gap and join data
  • 'pad' - pad gap with zeros

inplace : bool, optional, default: True

perform operation in-place, modifying current Series, otherwise copy data and return new Series

Warning

inplace append bypasses the reference check in numpy.ndarray.resize, so be carefully to only use this for arrays that haven’t been sharing their memory!

pad : float, optional, default: 0.0

value with which to pad discontiguous series

resize : bool, optional, default: True

resize this array to accommodate new data, otherwise shift the old data to the left (potentially falling off the start) and put the new data in at the end

Returns:

series : Series

a new series containing joined data sets

argmax(axis=None, out=None)

Return indices of the maximum values along the given axis.

Refer to numpy.argmax for full documentation.

See also

numpy.argmax
equivalent function
argmin(axis=None, out=None)

Return indices of the minimum values along the given axis of a.

Refer to numpy.argmin for detailed documentation.

See also

numpy.argmin
equivalent function
argpartition(kth, axis=-1, kind='introselect', order=None)

Returns the indices that would partition this array.

Refer to numpy.argpartition for full documentation.

New in version 1.8.0.

See also

numpy.argpartition
equivalent function
argsort(axis=-1, kind='quicksort', order=None)

Returns the indices that would sort this array.

Refer to numpy.argsort for full documentation.

See also

numpy.argsort
equivalent function
asd(fftlength=None, overlap=None, method='welch', **kwargs)[source]

Calculate the ASD FrequencySeries of this TimeSeries.

Parameters:

method : str, optional, default: ‘welch’

average spectrum method

fftlength : float, default: TimeSeries.duration

number of seconds in single FFT

overlap : float, optional, default: None

number of seconds of overlap between FFTs, defaults to that of the relevant method.

window : timeseries.Window, optional

window function to apply to timeseries prior to FFT

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

Returns:

psd : FrequencySeries

a data series containing the PSD.

Notes

The available methods are:

  • ‘welch’: gwpy.frequencyseries.scipy_.welch()
  • ‘bartlett’: gwpy.frequencyseries.scipy_.bartlett()
  • ‘rayleigh’: gwpy.frequencyseries.scipy_.rayleigh()
  • ‘csd’: gwpy.frequencyseries.scipy_.csd()
  • ‘welch’: gwpy.frequencyseries.lal_._spectrum()
  • ‘lal-welch’: gwpy.frequencyseries.lal_._spectrum()
  • ‘median-mean’: gwpy.frequencyseries.lal_._spectrum()
  • ‘median’: gwpy.frequencyseries.lal_._spectrum()
astype(dtype, order='K', casting='unsafe', subok=True, copy=True)

Copy of the array, cast to a specified type.

Parameters:

dtype : str or dtype

Typecode or data-type to which the array is cast.

order : {‘C’, ‘F’, ‘A’, ‘K’}, optional

Controls the memory layout order of the result. ‘C’ means C order, ‘F’ means Fortran order, ‘A’ means ‘F’ order if all the arrays are Fortran contiguous, ‘C’ order otherwise, and ‘K’ means as close to the order the array elements appear in memory as possible. Default is ‘K’.

casting : {‘no’, ‘equiv’, ‘safe’, ‘same_kind’, ‘unsafe’}, optional

Controls what kind of data casting may occur. Defaults to ‘unsafe’ for backwards compatibility.

  • ‘no’ means the data types should not be cast at all.
  • ‘equiv’ means only byte-order changes are allowed.
  • ‘safe’ means only casts which can preserve values are allowed.
  • ‘same_kind’ means only safe casts or casts within a kind, like float64 to float32, are allowed.
  • ‘unsafe’ means any data conversions may be done.

subok : bool, optional

If True, then sub-classes will be passed-through (default), otherwise the returned array will be forced to be a base-class array.

copy : bool, optional

By default, astype always returns a newly allocated array. If this is set to false, and the dtype, order, and subok requirements are satisfied, the input array is returned instead of a copy.

Returns:

arr_t : ndarray

Unless copy is False and the other conditions for returning the input array are satisfied (see description for copy input parameter), arr_t is a new array of the same shape as the input array, with dtype, order given by dtype, order.

Raises:

ComplexWarning :

When casting from complex to float or int. To avoid this, one should use a.real.astype(t).

Notes

Starting in NumPy 1.9, astype method now returns an error if the string dtype to cast to is not long enough in ‘safe’ casting mode to hold the max value of integer/float array that is being casted. Previously the casting was allowed even if the result was truncated.

Examples

>>> x = np.array([1, 2, 2.5])
>>> x
array([ 1. ,  2. ,  2.5])
>>> x.astype(int)
array([1, 2, 2])
auto_coherence(dt, fftlength=None, overlap=None, window=None, **kwargs)[source]

Calculate the frequency-coherence between this TimeSeries and a time-shifted copy of itself.

The standard TimeSeries.coherence() is calculated between the input TimeSeries and a cropped copy of itself. Since the cropped version will be shorter, the input series will be shortened to match.

Parameters:

dt : float

duration (in seconds) of time-shift

fftlength : float, optional, default: TimeSeries.duration

number of seconds in single FFT, defaults to a single FFT

overlap : int, optiona, default: fftlength

number of seconds of overlap between FFTs, defaults to no overlap

window : timeseries.window.Window, optional, default: HanningWindow

window function to apply to timeseries prior to FFT, default HanningWindow of the relevant size

**kwargs :

any other keyword arguments accepted by matplotlib.mlab.cohere() except NFFT, window, and noverlap which are superceded by the above keyword arguments

Returns:

coherence : FrequencySeries

the coherence FrequencySeries of this TimeSeries with the other

See also

matplotlib.mlab.cohere()
for details of the coherence calculator

Notes

The TimeSeries.auto_coherence() will perform best when dt is approximately fftlength / 2.

average_fft(fftlength=None, overlap=0, window=None)[source]

Compute the averaged one-dimensional DFT of this TimeSeries.

This method computes a number of FFTs of duration fftlength and overlap (both given in seconds), and returns the mean average. This method is analogous to the Welch average method for power spectra.

Parameters:

fftlength : float

number of seconds in single FFT, default, use whole TimeSeries

overlap : float

numbers of seconds by which to overlap neighbouring FFTs, by default, no overlap is used.

window : str, numpy.ndarray

name of the window function to use, or an array of length fftlength * TimeSeries.sample_rate to use as the window.

Returns:

out : complex-valued FrequencySeries

the transformed output, with populated frequencies array metadata

See also

scipy.fftpack, used.

bandpass(flow, fhigh, gpass=2, gstop=30, stops=(None, None))[source]

Filter this TimeSeries by applying low- and high-pass filters.

Parameters:

flow : float

band-pass lower corner frequency

fhigh : float

band-pass upper corner frequency

gpass : float

the maximum loss in the pass band (dB).

gstop : float

the minimum attenuation in the stop band (dB).

stops: 2-`tuple` of `float` :

stop-band edge frequencies, defaults to [flow/2., fhigh*1.5]

Returns:

bpseries : TimeSeries

a band-passed version of the input TimeSeries

See also

scipy.signal.buttord

scipy.signal.butter
for details on how the filter is designed
TimeSeries.filter
for details on how the filter is applied
When using scipy < 0.16.0 some higher-order filters may be unstable. With scipy >= 0.16.0 higher-order filters are decomposed into second-order-sections, and so are much more stable.
byteswap(inplace)

Swap the bytes of the array elements

Toggle between low-endian and big-endian data representation by returning a byteswapped array, optionally swapped in-place.

Parameters:

inplace : bool, optional

If True, swap bytes in-place, default is False.

Returns:

out : ndarray

The byteswapped array. If inplace is True, this is a view to self.

Examples

>>> A = np.array([1, 256, 8755], dtype=np.int16)
>>> map(hex, A)
['0x1', '0x100', '0x2233']
>>> A.byteswap(True)
array([  256,     1, 13090], dtype=int16)
>>> map(hex, A)
['0x100', '0x1', '0x3322']

Arrays of strings are not swapped

>>> A = np.array(['ceg', 'fac'])
>>> A.byteswap()
array(['ceg', 'fac'],
      dtype='|S3')
choose(choices, out=None, mode='raise')

Use an index array to construct a new array from a set of choices.

Refer to numpy.choose for full documentation.

See also

numpy.choose
equivalent function
clip(min=None, max=None, out=None)

Return an array whose values are limited to [min, max]. One of max or min must be given.

Refer to numpy.clip for full documentation.

See also

numpy.clip
equivalent function
coherence(other, fftlength=None, overlap=None, window=None, **kwargs)[source]

Calculate the frequency-coherence between this TimeSeries and another.

Parameters:

other : TimeSeries

TimeSeries signal to calculate coherence with

fftlength : float, optional, default: TimeSeries.duration

number of seconds in single FFT, defaults to a single FFT

overlap : float, optional, default: None

number of seconds of overlap between FFTs, defaults to no overlap

window : timeseries.window.Window, optional, default: HanningWindow

window function to apply to timeseries prior to FFT, default HanningWindow of the relevant size

**kwargs :

any other keyword arguments accepted by matplotlib.mlab.cohere() except NFFT, window, and noverlap which are superceded by the above keyword arguments

Returns:

coherence : FrequencySeries

the coherence FrequencySeries of this TimeSeries with the other

See also

matplotlib.mlab.cohere()
for details of the coherence calculator

Notes

If self and other have difference TimeSeries.sample_rate values, the higher sampled TimeSeries will be down-sampled to match the lower.

coherence_spectrogram(other, stride, fftlength=None, overlap=None, window=None, nproc=1)[source]

Calculate the coherence spectrogram between this TimeSeries and other.

Parameters:

stride : float

number of seconds in single PSD (column of spectrogram)

fftlength : float

number of seconds in single FFT

overlap : int, optiona, default: fftlength

number of seconds of overlap between FFTs, defaults to no overlap

window : timeseries.window.Window, optional, default: None

window function to apply to timeseries prior to FFT

nproc : int, default: 1

number of parallel processes to use when calculating individual coherence spectra.

Returns:

spectrogram : Spectrogram

time-frequency coherence spectrogram as generated from the input time-series.

compress(condition, axis=None, out=None)

Return selected slices of this array along given axis.

Refer to numpy.compress for full documentation.

See also

numpy.compress
equivalent function
conj()

Complex-conjugate all elements.

Refer to numpy.conjugate for full documentation.

See also

numpy.conjugate
equivalent function
conjugate()

Return the complex conjugate, element-wise.

Refer to numpy.conjugate for full documentation.

See also

numpy.conjugate
equivalent function
copy(order='C')[source]

Return a copy of the array.

Parameters:

order : {‘C’, ‘F’, ‘A’, ‘K’}, optional

Controls the memory layout of the copy. ‘C’ means C-order, ‘F’ means F-order, ‘A’ means ‘F’ if a is Fortran contiguous, ‘C’ otherwise. ‘K’ means match the layout of a as closely as possible. (Note that this function and :func:numpy.copy are very similar, but have different default values for their order= arguments.)

Examples

>>> x = np.array([[1,2,3],[4,5,6]], order='F')
>>> y = x.copy()
>>> x.fill(0)
>>> x
array([[0, 0, 0],
       [0, 0, 0]])
>>> y
array([[1, 2, 3],
       [4, 5, 6]])
>>> y.flags['C_CONTIGUOUS']
True
copy_metadata()[source]

Return a deepcopy of the metadata for this array

crop(start=None, end=None, copy=False)[source]

Crop this series to the given x-axis extent.

Parameters:

start : float, optional

lower limit of x-axis to crop to, defaults to current x0

end : float, optional

upper limit of x-axis to crop to, defaults to current series end

copy : bool, optional, default: False

copy the input data to fresh memory, otherwise return a view

Returns:

series : Series

A new series with a sub-set of the input data

Notes

If either start or end are outside of the original Series span, warnings will be printed and the limits will be restricted to the xspan

csd(other, fftlength=None, overlap=None, **kwargs)[source]

Calculate the CSD FrequencySeries for two TimeSeries

Parameters:

fftlength : float, default: TimeSeries.duration

number of seconds in single FFT

overlap : float, optional, default: None

number of seconds of overlap between FFTs, defaults to that of the relevant method.

window : timeseries.Window, optional

window function to apply to timeseries prior to FFT

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

Returns:

csd : FrequencySeries

a data series containing the CSD.

csd_spectrogram(other, stride, fftlength=None, overlap=0, window=None, nproc=1, **kwargs)[source]
Calculate the cross spectral density spectrogram of this
TimeSeries with ‘other’.
Parameters:

timeseries : TimeSeries

input time-series to process.

other : TimeSeries

second time-series for cross spectral density calculation

stride : float

number of seconds in single PSD (column of spectrogram).

fftlength : float

number of seconds in single FFT.

overlap : int, optiona, default: fftlength

number of seconds between FFTs.

window : timeseries.window.Window, optional, default: None

window function to apply to timeseries prior to FFT.

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

nproc : int, default: 1

maximum number of independent frame reading processes, default is set to single-process file reading.

Returns:

spectrogram : Spectrogram

time-frequency cross spectrogram as generated from the two input time-series.

cumprod(axis=None, dtype=None, out=None)

Return the cumulative product of the elements along the given axis.

Refer to numpy.cumprod for full documentation.

See also

numpy.cumprod
equivalent function
cumsum(axis=None, dtype=None, out=None)

Return the cumulative sum of the elements along the given axis.

Refer to numpy.cumsum for full documentation.

See also

numpy.cumsum
equivalent function
decompose(bases=[])

Generates a new Quantity with the units decomposed. Decomposed units have only irreducible units in them (see astropy.units.UnitBase.decompose).

Parameters:

bases : sequence of UnitBase, optional

The bases to decompose into. When not provided, decomposes down to any irreducible units. When provided, the decomposed result will only contain the given units. This will raises a UnitsError if it’s not possible to do so.

Returns:

newq : Quantity

A new object equal to this quantity with units decomposed.

detrend(detrend='constant')[source]

Remove the trend from this TimeSeries

This method just wraps scipy.signal.detrend() to return an object of the same type as the input.

Parameters:

detrend : str, optional, default: constant

the type of detrending.

Returns:

detrended : TimeSeries

the detrended input series

See also

scipy.signal.detrend
for details on the options for the detrend argument, and how the operation is done
diagonal(offset=0, axis1=0, axis2=1)

Return specified diagonals. In NumPy 1.9 the returned array is a read-only view instead of a copy as in previous NumPy versions. In a future version the read-only restriction will be removed.

Refer to numpy.diagonal() for full documentation.

See also

numpy.diagonal
equivalent function
diff(n=1, axis=-1)[source]

Calculate the n-th discrete difference along given axis.

The first difference is given by out[n] = a[n+1] - a[n] along the given axis, higher differences are calculated by using diff recursively.

Parameters:

a : array_like

Input array

n
: int, optional

The number of times values are differenced.

axis
: int, optional

The axis along which the difference is taken, default is the last axis.

Returns:

diff : ndarray

The n-th differences. The shape of the output is the same as a except along axis where the dimension is smaller by n.

. :

Examples

>>> x = np.array([1, 2, 4, 7, 0])
>>> np.diff(x)
array([ 1,  2,  3, -7])
>>> np.diff(x, n=2)
array([  1,   1, -10])
>>> x = np.array([[1, 3, 6, 10], [0, 5, 6, 8]])
>>> np.diff(x)
array([[2, 3, 4],
       [5, 1, 2]])
>>> np.diff(x, axis=0)
array([[-1,  2,  0, -2]])
dot(b, out=None)

Dot product of two arrays.

Refer to numpy.dot for full documentation.

See also

numpy.dot
equivalent function

Examples

>>> a = np.eye(2)
>>> b = np.ones((2, 2)) * 2
>>> a.dot(b)
array([[ 2.,  2.],
       [ 2.,  2.]])

This array method can be conveniently chained:

>>> a.dot(b).dot(b)
array([[ 8.,  8.],
       [ 8.,  8.]])
dump(file)

Dump a pickle of the array to the specified file. The array can be read back with pickle.load or numpy.load.

Parameters:

file : str

A string naming the dump file.

dumps()[source]

Returns the pickle of the array as a string. pickle.loads or numpy.loads will convert the string back to an array.

Parameters:None :
ediff1d(to_end=None, to_begin=None)
fetch(*args, **kwargs)[source]

Fetch data from NDS into a TimeSeries.

Parameters:

channel : str, Channel

the name of the channel to read, or a Channel object.

start : LIGOTimeGPS, float, str

GPS start time of required data, any input parseable by to_gps is fine

end : LIGOTimeGPS, float, str

GPS end time of required data, any input parseable by to_gps is fine

host : str, optional

URL of NDS server to use, defaults to observatory site host

port : int, optional

port number for NDS server query, must be given with host

verify : bool, optional, default: True

check channels exist in database before asking for data

connection : NDS2Connection

open NDS connection to use

verbose : bool, optional

print verbose output about NDS progress

type : int, optional

NDS2 channel type integer

dtype : type, numpy.dtype, str, optional

identifier for desired output data type

fetch_open_data(ifo, start, end, name='strain/Strain', sample_rate=4096, host='https://losc.ligo.org')[source]

Fetch open-access data from the LIGO Open Science Center

Parameters:

ifo : str

the two-character prefix of the IFO in which you are interested, e.g. 'L1'

start : LIGOTimeGPS, float, str, optional

GPS start time of required data, defaults to start of data found; any input parseable by to_gps is fine

end : LIGOTimeGPS, float, str, optional

GPS end time of required data, defaults to end of data found; any input parseable by to_gps is fine

name : str, optional

the full name of HDF5 dataset that represents the data you want, e.g. 'strain/Strain' for _h(t)_ data, or 'quality/simple' for basic data-quality information

sample_rate : float, optional, default: 4096

the sample rate of desired data. Most data are stored by LOSC at 4096 Hz, however there may be event-related data releases with a 16384 Hz rate

host : str, optional

HTTP host name of LOSC server to access

fft(nfft=None)[source]

Compute the one-dimensional discrete Fourier transform of this TimeSeries.

Parameters:

nfft : int, optional

length of the desired Fourier transform. Input will be cropped or padded to match the desired length. If nfft is not given, the length of the TimeSeries will be used

Returns:

out : FrequencySeries

the normalised, complex-valued FFT FrequencySeries.

See also

scipy.fftpack, used.

Notes

This method, in constrast to the numpy.fft.rfft() method it calls, applies the necessary normalisation such that the amplitude of the output FrequencySeries is correct.

fftgram(stride)[source]

Calculate the Fourier-gram of this TimeSeries.

At every stride, a single, complex FFT is calculated.

Parameters:

stride : float

number of seconds in single PSD (column of spectrogram)

Returns:

fftgram : Spectrogram

a Fourier-gram

fill(value)

Fill the array with a scalar value.

Parameters:

value : scalar

All elements of a will be assigned this value.

Examples

>>> a = np.array([1, 2])
>>> a.fill(0)
>>> a
array([0, 0])
>>> a = np.empty(2)
>>> a.fill(1)
>>> a
array([ 1.,  1.])
filter(*filt)[source]

Apply the given filter to this TimeSeries.

All recognised filter arguments are converted either into cascading second-order sections (if scipy >= 0.16 is installed), or into the (numerator, denominator) representation before being applied to this TimeSeries.

Note

All filters are presumed to be digital (Z-domain), if you have an analog ZPK (in Hertz or in rad/s) you should be using TimeSeries.zpk instead.

Note

When using scipy < 0.16 some higher-order filters may be unstable. With scipy >= 0.16 higher-order filters are decomposed into second-order-sections, and so are much more stable.

Parameters:

*filt :

one of:

  • scipy.signal.lti
  • MxN numpy.ndarray of second-order-sections (scipy >= 0.16 only)
  • (numerator, denominator) polynomials
  • (zeros, poles, gain)
  • (A, B, C, D) ‘state-space’ representation
Returns:

result : TimeSeries

the filtered version of the input TimeSeries

Raises:

ValueError :

If filt arguments cannot be interpreted properly

See also

TimeSeries.zpk
for instructions on how to filter using a ZPK with frequencies in Hertz
scipy.signal.sosfilter
for details on the second-order section filtering method (scipy >= 0.16 only)
scipy.signal.lfilter
for details on the filtering method
find(channel, start, end, frametype=None, pad=None, dtype=None, nproc=1, verbose=False, **readargs)[source]

Find and read data from frames for a channel

Parameters:

channel : str, Channel

the name of the channel to read, or a Channel object.

start : LIGOTimeGPS, float, str

GPS start time of required data, any input parseable by to_gps is fine

end : LIGOTimeGPS, float, str

GPS end time of required data, any input parseable by to_gps is fine

frametype : str, optional

name of frametype in which this channel is stored, will search for containing frame types if necessary

pad : float, optional

value with which to fill gaps in the source data, only used if gap is not given, or gap='pad' is given

nproc : int, optional, default: 1

number of parallel processes to use, serial process by default.

dtype : numpy.dtype, str, type, or dict

numeric data type for returned data, e.g. numpy.float, or dict of (channel, dtype) pairs

verbose : bool, optional

print verbose output about NDS progress.

**readargs :

any other keyword arguments to be passed to read()

flatten(order='C')

Return a copy of the array collapsed into one dimension.

Parameters:

order : {‘C’, ‘F’, ‘A’, ‘K’}, optional

‘C’ means to flatten in row-major (C-style) order. ‘F’ means to flatten in column-major (Fortran- style) order. ‘A’ means to flatten in column-major order if a is Fortran contiguous in memory, row-major order otherwise. ‘K’ means to flatten a in the order the elements occur in memory. The default is ‘C’.

Returns:

y : ndarray

A copy of the input array, flattened to one dimension.

See also

ravel
Return a flattened array.
flat
A 1-D flat iterator over the array.

Examples

>>> a = np.array([[1,2], [3,4]])
>>> a.flatten()
array([1, 2, 3, 4])
>>> a.flatten('F')
array([1, 3, 2, 4])
from_hdf5(*args, **kwargs)[source]

Read an array from the given HDF file.

This method has been deprecated in favour of the unified I/O method:

Class.write(..., format=’hdf5’)

from_lal(*args, **kwargs)[source]

Generate a new TimeSeries from a LAL TimeSeries of any type.

from_nds2_buffer(*args, **kwargs)[source]

Construct a new TimeSeries from an nds2.buffer object

Parameters:

buffer_ : nds2.buffer

the input NDS2-client buffer to read

**metadata :

any other metadata keyword arguments to pass to the TimeSeries constructor

Returns:

timeseries : TimeSeries

a new TimeSeries containing the data from the nds2.buffer, and the appropriate metadata

Notes

This classmethod requires the nds2-client package

from_pycbc(ts)[source]

Convert a pycbc.types.timeseries.TimeSeries into a TimeSeries

Parameters:

ts : pycbc.types.timeseries.TimeSeries

the input PyCBC TimeSeries array

Returns:

timeseries : TimeSeries

a GWpy version of the input timeseries

get(channel, start, end, pad=None, dtype=None, verbose=False, **kwargs)[source]

Get data for this channel from frames or NDS

This method dynamically accesses either frames on disk, or a remote NDS2 server to find and return data for the given interval

Parameters:

channel : str, Channel

the name of the channel to read, or a Channel object.

start : LIGOTimeGPS, float, str

GPS start time of required data, any input parseable by to_gps is fine

end : LIGOTimeGPS, float, str

GPS end time of required data, any input parseable by to_gps is fine

pad : float, optional

value with which to fill gaps in the source data, only used if gap is not given, or gap='pad' is given

dtype : numpy.dtype, str, type, or dict

numeric data type for returned data, e.g. numpy.float, or dict of (channel, dtype) pairs

nproc : int, optional, default: 1

number of parallel processes to use, serial process by default.

verbose : bool, optional

print verbose output about NDS progress.

**kwargs other keyword arguments to pass to either :

find() (for direct GWF file access) or fetch() for remote NDS2 access

See also

TimeSeries.fetch
for grabbing data from a remote NDS2 server
TimeSeries.find
for discovering and reading data from local GWF files
getfield(dtype, offset=0)

Returns a field of the given array as a certain type.

A field is a view of the array data with a given data-type. The values in the view are determined by the given type and the offset into the current array in bytes. The offset needs to be such that the view dtype fits in the array dtype; for example an array of dtype complex128 has 16-byte elements. If taking a view with a 32-bit integer (4 bytes), the offset needs to be between 0 and 12 bytes.

Parameters:

dtype : str or dtype

The data type of the view. The dtype size of the view can not be larger than that of the array itself.

offset : int

Number of bytes to skip before beginning the element view.

Examples

>>> x = np.diag([1.+1.j]*2)
>>> x[1, 1] = 2 + 4.j
>>> x
array([[ 1.+1.j,  0.+0.j],
       [ 0.+0.j,  2.+4.j]])
>>> x.getfield(np.float64)
array([[ 1.,  0.],
       [ 0.,  2.]])

By choosing an offset of 8 bytes we can select the complex part of the array for our view:

>>> x.getfield(np.float64, offset=8)
array([[ 1.,  0.],
   [ 0.,  4.]])
highpass(frequency, gpass=2, gstop=30, stop=None)[source]

Filter this TimeSeries with a Butterworth high-pass filter.

Parameters:

frequency : float

minimum frequency for high-pass

gpass : float

the maximum loss in the passband (dB).

gstop : float

the minimum attenuation in the stopband (dB).

stop : float

stop-band edge frequency, defaults to frequency/2

Returns:

hpseries : TimeSeries

a high-passed version of the input TimeSeries

See also

scipy.signal.buttord

scipy.signal.butter
for details on how the filter is designed
TimeSeries.filter
for details on how the filter is applied
When using scipy < 0.16.0 some higher-order filters may be unstable. With scipy >= 0.16.0 higher-order filters are decomposed into second-order-sections, and so are much more stable.
insert(obj, values, axis=None)

Insert values along the given axis before the given indices and return a new Quantity object.

This is a thin wrapper around the numpy.insert function.

Parameters:

obj : int, slice or sequence of ints

Object that defines the index or indices before which values is inserted.

values : array-like

Values to insert. If the type of values is different from that of quantity, values is converted to the matching type. values should be shaped so that it can be broadcast appropriately The unit of values must be consistent with this quantity.

axis : int, optional

Axis along which to insert values. If axis is None then the quantity array is flattened before insertion.

Returns:

out : Quantity

A copy of quantity with values inserted. Note that the insertion does not occur in-place: a new quantity array is returned.

Examples

>>> import astropy.units as u
>>> q = [1, 2] * u.m
>>> q.insert(0, 50 * u.cm)
<Quantity [ 0.5,  1.,  2.] m>
>>> q = [[1, 2], [3, 4]] * u.m
>>> q.insert(1, [10, 20] * u.m, axis=0)
<Quantity [[  1.,  2.],
           [ 10., 20.],
           [  3.,  4.]] m>
>>> q.insert(1, 10 * u.m, axis=1)
<Quantity [[  1., 10.,  2.],
           [  3., 10.,  4.]] m>
is_compatible(other)[source]

Check whether this series and other have compatible metadata

This method tests that the sample size, and the unit match.

is_contiguous(other, tol=3.814697265625e-06)[source]

Check whether other is contiguous with self.

Parameters:

other : Series, numpy.ndarray

another series of the same type to test for contiguity

tol : float, optional

the numerical tolerance of the test

Returns:

1 :

if other is contiguous with this series, i.e. would attach seamlessly onto the end

-1 :

if other is anti-contiguous with this seires, i.e. would attach seamlessly onto the start

0 :

if other is completely dis-contiguous with thie series

Notes

if a raw numpy.ndarray is passed as other, with no metadata, then the contiguity check will always pass

item(*args)

Copy an element of an array to a standard Python scalar and return it.

Parameters:

*args : Arguments (variable number and type)

  • none: in this case, the method only works for arrays with one element (a.size == 1), which element is copied into a standard Python scalar object and returned.
  • int_type: this argument is interpreted as a flat index into the array, specifying which element to copy and return.
  • tuple of int_types: functions as does a single int_type argument, except that the argument is interpreted as an nd-index into the array.
Returns:

z : Standard Python scalar object

A copy of the specified element of the array as a suitable Python scalar

Notes

When the data type of a is longdouble or clongdouble, item() returns a scalar array object because there is no available Python scalar that would not lose information. Void arrays return a buffer object for item(), unless fields are defined, in which case a tuple is returned.

item is very similar to a[args], except, instead of an array scalar, a standard Python scalar is returned. This can be useful for speeding up access to elements of the array and doing arithmetic on elements of the array using Python’s optimized math.

Examples

>>> x = np.random.randint(9, size=(3, 3))
>>> x
array([[3, 1, 7],
       [2, 8, 3],
       [8, 5, 3]])
>>> x.item(3)
2
>>> x.item(7)
5
>>> x.item((0, 1))
1
>>> x.item((2, 2))
3
itemset(*args)

Insert scalar into an array (scalar is cast to array’s dtype, if possible)

There must be at least 1 argument, and define the last argument as item. Then, a.itemset(*args) is equivalent to but faster than a[args] = item. The item should be a scalar value and args must select a single item in the array a.

Parameters:

*args : Arguments

If one argument: a scalar, only used in case a is of size 1. If two arguments: the last argument is the value to be set and must be a scalar, the first argument specifies a single array element location. It is either an int or a tuple.

Notes

Compared to indexing syntax, itemset provides some speed increase for placing a scalar into a particular location in an ndarray, if you must do this. However, generally this is discouraged: among other problems, it complicates the appearance of the code. Also, when using itemset (and item) inside a loop, be sure to assign the methods to a local variable to avoid the attribute look-up at each loop iteration.

Examples

>>> x = np.random.randint(9, size=(3, 3))
>>> x
array([[3, 1, 7],
       [2, 8, 3],
       [8, 5, 3]])
>>> x.itemset(4, 0)
>>> x.itemset((2, 2), 9)
>>> x
array([[3, 1, 7],
       [2, 0, 3],
       [8, 5, 9]])
lowpass(frequency, gpass=2, gstop=30, stop=None)[source]

Filter this TimeSeries with a Butterworth low-pass filter.

Parameters:

frequency : float

low-pass corner frequency

gpass : float

the maximum loss in the passband (dB).

gstop : float

the minimum attenuation in the stopband (dB).

stop: `float` :

stop-band edge frequency, defaults to frequency * 1.5

Returns:

lpseries : TimeSeries

a low-passed version of the input TimeSeries

See also

scipy.signal.buttord

scipy.signal.butter
for details on how the filter is designed
TimeSeries.filter
for details on how the filter is applied
When using scipy < 0.16.0 some higher-order filters may be unstable. With scipy >= 0.16.0 higher-order filters are decomposed into second-order-sections, and so are much more stable.
max(axis=None, out=None)

Return the maximum along a given axis.

Refer to numpy.amax for full documentation.

See also

numpy.amax
equivalent function
mean(axis=None, dtype=None, out=None, keepdims=False)

Returns the average of the array elements along given axis.

Refer to numpy.mean for full documentation.

See also

numpy.mean
equivalent function
median(axis=None, **kwargs)[source]

Compute the median along the specified axis.

Returns the median of the array elements.

Parameters:

a : array_like

Input array or object that can be converted to an array.

axis : {int, sequence of int, None}, optional

Axis or axes along which the medians are computed. The default is to compute the median along a flattened version of the array. A sequence of axes is supported since version 1.9.0.

out : ndarray, optional

Alternative output array in which to place the result. It must have the same shape and buffer length as the expected output, but the type (of the output) will be cast if necessary.

overwrite_input : bool, optional

If True, then allow use of memory of input array a for calculations. The input array will be modified by the call to median. This will save memory when you do not need to preserve the contents of the input array. Treat the input as undefined, but it will probably be fully or partially sorted. Default is False. If overwrite_input is True and a is not already an ndarray, an error will be raised.

keepdims : bool, optional

If this is set to True, the axes which are reduced are left in the result as dimensions with size one. With this option, the result will broadcast correctly against the original arr.

New in version 1.9.0.

Returns:

median : ndarray

A new array holding the result. If the input contains integers or floats smaller than float64, then the output data-type is np.float64. Otherwise, the data-type of the output is the same as that of the input. If out is specified, that array is returned instead.

See also

mean, percentile

Notes

Given a vector V of length N, the median of V is the middle value of a sorted copy of V, V_sorted - i e., V_sorted[(N-1)/2], when N is odd, and the average of the two middle values of V_sorted when N is even.

Examples

>>> a = np.array([[10, 7, 4], [3, 2, 1]])
>>> a
array([[10,  7,  4],
       [ 3,  2,  1]])
>>> np.median(a)
3.5
>>> np.median(a, axis=0)
array([ 6.5,  4.5,  2.5])
>>> np.median(a, axis=1)
array([ 7.,  2.])
>>> m = np.median(a, axis=0)
>>> out = np.zeros_like(m)
>>> np.median(a, axis=0, out=m)
array([ 6.5,  4.5,  2.5])
>>> m
array([ 6.5,  4.5,  2.5])
>>> b = a.copy()
>>> np.median(b, axis=1, overwrite_input=True)
array([ 7.,  2.])
>>> assert not np.all(a==b)
>>> b = a.copy()
>>> np.median(b, axis=None, overwrite_input=True)
3.5
>>> assert not np.all(a==b)
min(axis=None, out=None, keepdims=False)

Return the minimum along a given axis.

Refer to numpy.amin for full documentation.

See also

numpy.amin
equivalent function
nansum(axis=None, out=None, keepdims=False)
newbyteorder(new_order='S')

Return the array with the same data viewed with a different byte order.

Equivalent to:

arr.view(arr.dtype.newbytorder(new_order))

Changes are also made in all fields and sub-arrays of the array data type.

Parameters:

new_order : string, optional

Byte order to force; a value from the byte order specifications below. new_order codes can be any of:

  • ‘S’ - swap dtype from current to opposite endian
  • {‘<’, ‘L’} - little endian
  • {‘>’, ‘B’} - big endian
  • {‘=’, ‘N’} - native order
  • {‘|’, ‘I’} - ignore (no change to byte order)

The default value (‘S’) results in swapping the current byte order. The code does a case-insensitive check on the first letter of new_order for the alternatives above. For example, any of ‘B’ or ‘b’ or ‘biggish’ are valid to specify big-endian.

Returns:

new_arr : array

New array object with the dtype reflecting given change to the byte order.

nonzero()

Return the indices of the elements that are non-zero.

Refer to numpy.nonzero for full documentation.

See also

numpy.nonzero
equivalent function
notch(frequency, type='iir', **kwargs)[source]

Notch out a frequency in a TimeSeries

Parameters:

frequency : float, Quantity

frequency (default in Hertz) at which to apply the notch

type : str, optional, default: ‘iir’

type of filter to apply, currently only ‘iir’ is supported

**kwargs :

other keyword arguments to pass to scipy.signal.iirdesign

Returns:

notched : TimeSeries

a notch-filtered copy of the input TimeSeries

See also

TimeSeries.filter
for details on the filtering method
scipy.signal.iirdesign
for details on the IIR filter design method
override_unit(unit, parse_strict='raise')[source]

Forcefully reset the unit of these data

Use of this method is discouraged in favour of to(), which performs accurate conversions from one unit to another. The method should really only be used when the original unit of the array is plain wrong.

Parameters:

unit : Unit, str

the unit to force onto this array

Raises:

ValueError :

if a str cannot be parsed as a valid unit

pad(pad_width, **kwargs)[source]

Pad this series to a new size

Parameters:

pad_width : int, pair of ints

number of samples by which to pad each end of the array. Single int to pad both ends by the same amount, or (before, after) tuple to give uneven padding

**kwargs :

see numpy.pad() for kwarg documentation

Returns:

series : Series

the padded version of the input

See also

numpy.pad
for details on the underlying functionality
partition(kth, axis=-1, kind='introselect', order=None)

Rearranges the elements in the array in such a way that value of the element in kth position is in the position it would be in a sorted array. All elements smaller than the kth element are moved before this element and all equal or greater are moved behind it. The ordering of the elements in the two partitions is undefined.

New in version 1.8.0.

Parameters:

kth : int or sequence of ints

Element index to partition by. The kth element value will be in its final sorted position and all smaller elements will be moved before it and all equal or greater elements behind it. The order all elements in the partitions is undefined. If provided with a sequence of kth it will partition all elements indexed by kth of them into their sorted position at once.

axis : int, optional

Axis along which to sort. Default is -1, which means sort along the last axis.

kind : {‘introselect’}, optional

Selection algorithm. Default is ‘introselect’.

order : str or list of str, optional

When a is an array with fields defined, this argument specifies which fields to compare first, second, etc. A single field can be specified as a string, and not all fields need be specified, but unspecified fields will still be used, in the order in which they come up in the dtype, to break ties.

See also

numpy.partition
Return a parititioned copy of an array.
argpartition
Indirect partition.
sort
Full sort.

Notes

See np.partition for notes on the different algorithms.

Examples

>>> a = np.array([3, 4, 2, 1])
>>> a.partition(a, 3)
>>> a
array([2, 1, 3, 4])
>>> a.partition((1, 3))
array([1, 2, 3, 4])
plot(**kwargs)[source]

Plot the data for this TimeSeries.

prepend(other, gap='raise', inplace=True, pad=0.0, resize=True)[source]

Connect another series onto the start of the current one.

Parameters:

other : Series

another series of the same type as this one

gap : str, optional, default: 'raise'

action to perform if there’s a gap between the other series and this one. One of

  • 'raise' - raise an Exception
  • 'ignore' - remove gap and join data
  • 'pad' - pad gap with zeros

inplace : bool, optional, default: True

perform operation in-place, modifying current series, otherwise copy data and return new series

Warning

inplace prepend bypasses the reference check in numpy.ndarray.resize, so be carefully to only use this for arrays that haven’t been sharing their memory!

pad : float, optional, default: 0.0

value with which to pad discontiguous Series

resize : bool, optional, default: True

Returns:

series : TimeSeries

time-series containing joined data sets

prod(axis=None, dtype=None, out=None, keepdims=False)

Return the product of the array elements over the given axis

Refer to numpy.prod for full documentation.

See also

numpy.prod
equivalent function
psd(fftlength=None, overlap=None, method='welch', **kwargs)[source]

Calculate the PSD FrequencySeries for this TimeSeries.

Parameters:

method : str, optional, default: ‘welch’

average spectrum method

fftlength : float, default: TimeSeries.duration

number of seconds in single FFT

overlap : float, optional, default: None

number of seconds of overlap between FFTs, defaults to that of the relevant method.

window : timeseries.Window, optional

window function to apply to timeseries prior to FFT

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

Returns:

psd : FrequencySeries

a data series containing the PSD.

Notes

The available methods are:

  • ‘welch’: gwpy.frequencyseries.scipy_.welch()
  • ‘bartlett’: gwpy.frequencyseries.scipy_.bartlett()
  • ‘rayleigh’: gwpy.frequencyseries.scipy_.rayleigh()
  • ‘csd’: gwpy.frequencyseries.scipy_.csd()
  • ‘welch’: gwpy.frequencyseries.lal_._spectrum()
  • ‘lal-welch’: gwpy.frequencyseries.lal_._spectrum()
  • ‘median-mean’: gwpy.frequencyseries.lal_._spectrum()
  • ‘median’: gwpy.frequencyseries.lal_._spectrum()
ptp(axis=None, out=None)

Peak to peak (maximum - minimum) value along a given axis.

Refer to numpy.ptp for full documentation.

See also

numpy.ptp
equivalent function
put(indices, values, mode='raise')

Set a.flat[n] = values[n] for all n in indices.

Refer to numpy.put for full documentation.

See also

numpy.put
equivalent function
q_transform(qrange=(4, 64), frange=(0, inf), gps=None, search=0.5, tres=0.001, fres=0.5, outseg=None, **psdkwargs)[source]

Scan a TimeSeries using a multi-Q transform

Parameters:

qrange : tuple of float, optional

(low, high) range of Qs to scan

frange : tuple of float, optional

(log, high) range of frequencies to scan

gps : float, optional

central time of interest for determine loudest Q-plane

search : float, optional

window around gps in which to find peak energies, only used if gps is given

tres : float, optional

desired time resolution (seconds) of output Spectrogram

fres : float, None, optional

desired frequency resolution (Hertz) of output Spectrogram, give None to skip this step and return the original resolution, e.g. if you’re going to do your own interpolation

outseg : Segment, optional

GPS [start, stop) segment for output Spectrogram

**psdkwargs :

keyword arguments to pass to TimeSeries.psd when whitening the input data

Returns:

specgram : Spectrogram

output Spectrogram of normalised Q energy

See also

TimeSeries.psd
for documentation on acceptable **psdkwargs
TimeSeries.whiten
for documentation on how the whitening is done
gwpy.signal.qtransform
for code and documentation on how the Q-transform is implemented
scipy.interpolate
for details on how the interpolation is implemented. This method uses InterpolatedUnivariateSpline to cast all frequency rows to the same time-axis, and then interpd to apply the desired frequency resolution across the band.

Notes

It is highly recommended to use the outseg keyword argument when only a small window around a given GPS time is of interest. This will speed up this method a little, but can greatly speed up rendering the resulting Spectrogram using pcolormesh.

If you aren’t going to use pcolormesh in the end, don’t worry.

ravel([order])

Return a flattened array.

Refer to numpy.ravel for full documentation.

See also

numpy.ravel
equivalent function
ndarray.flat
a flat iterator on the array.
rayleigh_spectrogram(stride, fftlength=None, overlap=0, window=None, nproc=1, **kwargs)[source]

Calculate the Rayleigh statistic spectrogram of this TimeSeries

Parameters:

timeseries : TimeSeries

input time-series to process.

stride : float

number of seconds in single PSD (column of spectrogram).

fftlength : float

number of seconds in single FFT.

overlap : int, optiona, default: fftlength

number of seconds between FFTs.

window : timeseries.window.Window, optional, default: None

window function to apply to timeseries prior to FFT.

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

nproc : int, default: 1

maximum number of independent frame reading processes, default is set to single-process file reading.

Returns:

spectrogram : Spectrogram

time-frequency Rayleigh spectrogram as generated from the input time-series.

rayleigh_spectrum(fftlength=None, overlap=None, **kwargs)[source]

Calculate the Rayleigh FrequencySeries for this TimeSeries.

Parameters:

fftlength : float, default: TimeSeries.duration

number of seconds in single FFT

overlap : float, optional, default: None

number of seconds of overlap between FFTs, defaults to that of the relevant method.

window : timeseries.Window, optional

window function to apply to timeseries prior to FFT

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate.

Returns:

psd : FrequencySeries

a data series containing the PSD.

Notes

The available methods are:

classmethod read(*args, **kwargs)

Read data into a TimeSeries

Parameters:

source : str, Cache

source of data, any of the following:

  • str path of single data file
  • str path of LAL-format cache file
  • Cache describing one or more data files,

channel : str, Channel

the name of the channel to read, or a Channel object.

start : LIGOTimeGPS, float, str, optional

GPS start time of required data, defaults to start of data found; any input parseable by to_gps is fine

end : LIGOTimeGPS, float, str, optional

GPS end time of required data, defaults to end of data found; any input parseable by to_gps is fine

format : str, optional

source format identifier. If not given, the format will be detected if possible. See below for list of acceptable formats.

nproc : int, optional, default: 1

number of parallel processes to use, serial process by default.

Note

Parallel frame reading, via the nproc keyword argument, is only available when giving a Cache of frames, or using the format='cache' keyword argument.

gap : str, optional

how to handle gaps in the cache, one of

  • ‘ignore’: do nothing, let the undelying reader method handle it
  • ‘warn’: do nothing except print a warning to the screen
  • ‘raise’: raise an exception upon finding a gap (default)
  • ‘pad’: insert a value to fill the gaps

pad : float, optional

value with which to fill gaps in the source data, only used if gap is not given, or gap='pad' is given

Notes

The available built-in formats are:

Format Read Write Auto-identify
csv Yes Yes Yes
framecpp Yes Yes No
gwf Yes No Yes
hdf Yes Yes No
hdf5 Yes Yes Yes
lalframe Yes No No
losc Yes No No
txt Yes Yes Yes
repeat(repeats, axis=None)

Repeat elements of an array.

Refer to numpy.repeat for full documentation.

See also

numpy.repeat
equivalent function
resample(rate, window='hamming', numtaps=61)[source]

Resample this Series to a new rate

Parameters:

rate : float

rate to which to resample this Series

window : array_like, callable, string, float, or tuple, optional

specifies the window applied to the signal in the Fourier domain.

numtaps : int, default: 61

length of the filter (number of coefficients, i.e. the filter order + 1). This option is only valid for an integer-scale downsampling.

Returns:

Series :

a new Series with the resampling applied, and the same metadata

reshape(shape, order='C')

Returns an array containing the same data with a new shape.

Refer to numpy.reshape for full documentation.

See also

numpy.reshape
equivalent function
resize(new_shape, refcheck=True)

Change shape and size of array in-place.

Parameters:

new_shape : tuple of ints, or n ints

Shape of resized array.

refcheck : bool, optional

If False, reference count will not be checked. Default is True.

Returns:

None :

Raises:

ValueError :

If a does not own its own data or references or views to it exist, and the data memory must be changed.

SystemError :

If the order keyword argument is specified. This behaviour is a bug in NumPy.

See also

resize
Return a new array with the specified shape.

Notes

This reallocates space for the data area if necessary.

Only contiguous arrays (data elements consecutive in memory) can be resized.

The purpose of the reference count check is to make sure you do not use this array as a buffer for another Python object and then reallocate the memory. However, reference counts can increase in other ways so if you are sure that you have not shared the memory for this array with another Python object, then you may safely set refcheck to False.

Examples

Shrinking an array: array is flattened (in the order that the data are stored in memory), resized, and reshaped:

>>> a = np.array([[0, 1], [2, 3]], order='C')
>>> a.resize((2, 1))
>>> a
array([[0],
       [1]])
>>> a = np.array([[0, 1], [2, 3]], order='F')
>>> a.resize((2, 1))
>>> a
array([[0],
       [2]])

Enlarging an array: as above, but missing entries are filled with zeros:

>>> b = np.array([[0, 1], [2, 3]])
>>> b.resize(2, 3) # new_shape parameter doesn't have to be a tuple
>>> b
array([[0, 1, 2],
       [3, 0, 0]])

Referencing an array prevents resizing...

>>> c = a
>>> a.resize((1, 1))
Traceback (most recent call last):
...
ValueError: cannot resize an array that has been referenced ...

Unless refcheck is False:

>>> a.resize((1, 1), refcheck=False)
>>> a
array([[0]])
>>> c
array([[0]])
rms(stride=1)[source]

Calculate the root-mean-square value of this TimeSeries once per stride.

Parameters:

stride : float

stride (seconds) between RMS calculations

Returns:

rms : TimeSeries

a new TimeSeries containing the RMS value with dt=stride

round(decimals=0, out=None)

Return a with each element rounded to the given number of decimals.

Refer to numpy.around for full documentation.

See also

numpy.around
equivalent function
searchsorted(v, side='left', sorter=None)

Find indices where elements of v should be inserted in a to maintain order.

For full documentation, see numpy.searchsorted

See also

numpy.searchsorted
equivalent function
setfield(val, dtype, offset=0)

Put a value into a specified place in a field defined by a data-type.

Place val into a‘s field defined by dtype and beginning offset bytes into the field.

Parameters:

val : object

Value to be placed in field.

dtype : dtype object

Data-type of the field in which to place val.

offset : int, optional

The number of bytes into the field at which to place val.

Returns:

None :

See also

getfield

Examples

>>> x = np.eye(3)
>>> x.getfield(np.float64)
array([[ 1.,  0.,  0.],
       [ 0.,  1.,  0.],
       [ 0.,  0.,  1.]])
>>> x.setfield(3, np.int32)
>>> x.getfield(np.int32)
array([[3, 3, 3],
       [3, 3, 3],
       [3, 3, 3]])
>>> x
array([[  1.00000000e+000,   1.48219694e-323,   1.48219694e-323],
       [  1.48219694e-323,   1.00000000e+000,   1.48219694e-323],
       [  1.48219694e-323,   1.48219694e-323,   1.00000000e+000]])
>>> x.setfield(np.eye(3), np.int32)
>>> x
array([[ 1.,  0.,  0.],
       [ 0.,  1.,  0.],
       [ 0.,  0.,  1.]])
setflags(write=None, align=None, uic=None)

Set array flags WRITEABLE, ALIGNED, and UPDATEIFCOPY, respectively.

These Boolean-valued flags affect how numpy interprets the memory area used by a (see Notes below). The ALIGNED flag can only be set to True if the data is actually aligned according to the type. The UPDATEIFCOPY flag can never be set to True. The flag WRITEABLE can only be set to True if the array owns its own memory, or the ultimate owner of the memory exposes a writeable buffer interface, or is a string. (The exception for string is made so that unpickling can be done without copying memory.)

Parameters:

write : bool, optional

Describes whether or not a can be written to.

align : bool, optional

Describes whether or not a is aligned properly for its type.

uic : bool, optional

Describes whether or not a is a copy of another “base” array.

Notes

Array flags provide information about how the memory area used for the array is to be interpreted. There are 6 Boolean flags in use, only three of which can be changed by the user: UPDATEIFCOPY, WRITEABLE, and ALIGNED.

WRITEABLE (W) the data area can be written to;

ALIGNED (A) the data and strides are aligned appropriately for the hardware (as determined by the compiler);

UPDATEIFCOPY (U) this array is a copy of some other array (referenced by .base). When this array is deallocated, the base array will be updated with the contents of this array.

All flags can be accessed using their first (upper case) letter as well as the full name.

Examples

>>> y
array([[3, 1, 7],
       [2, 0, 0],
       [8, 5, 9]])
>>> y.flags
  C_CONTIGUOUS : True
  F_CONTIGUOUS : False
  OWNDATA : True
  WRITEABLE : True
  ALIGNED : True
  UPDATEIFCOPY : False
>>> y.setflags(write=0, align=0)
>>> y.flags
  C_CONTIGUOUS : True
  F_CONTIGUOUS : False
  OWNDATA : True
  WRITEABLE : False
  ALIGNED : False
  UPDATEIFCOPY : False
>>> y.setflags(uic=1)
Traceback (most recent call last):
  File "<stdin>", line 1, in <module>
ValueError: cannot set UPDATEIFCOPY flag to True
sort(axis=-1, kind='quicksort', order=None)

Sort an array, in-place.

Parameters:

axis : int, optional

Axis along which to sort. Default is -1, which means sort along the last axis.

kind : {‘quicksort’, ‘mergesort’, ‘heapsort’}, optional

Sorting algorithm. Default is ‘quicksort’.

order : str or list of str, optional

When a is an array with fields defined, this argument specifies which fields to compare first, second, etc. A single field can be specified as a string, and not all fields need be specified, but unspecified fields will still be used, in the order in which they come up in the dtype, to break ties.

See also

numpy.sort
Return a sorted copy of an array.
argsort
Indirect sort.
lexsort
Indirect stable sort on multiple keys.
searchsorted
Find elements in sorted array.
partition
Partial sort.

Notes

See sort for notes on the different sorting algorithms.

Examples

>>> a = np.array([[1,4], [3,1]])
>>> a.sort(axis=1)
>>> a
array([[1, 4],
       [1, 3]])
>>> a.sort(axis=0)
>>> a
array([[1, 3],
       [1, 4]])

Use the order keyword to specify a field to use when sorting a structured array:

>>> a = np.array([('a', 2), ('c', 1)], dtype=[('x', 'S1'), ('y', int)])
>>> a.sort(order='y')
>>> a
array([('c', 1), ('a', 2)],
      dtype=[('x', '|S1'), ('y', '<i4')])
spectral_variance(stride, fftlength=None, overlap=None, method='welch', window=None, nproc=1, filter=None, bins=None, low=None, high=None, nbins=500, log=False, norm=False, density=False)[source]

Calculate the SpectralVariance of this TimeSeries.

Parameters:

stride : float

number of seconds in single PSD (column of spectrogram)

fftlength : float

number of seconds in single FFT

method : str, optional, default: ‘welch’

average spectrum method

overlap : int, optiona, default: fftlength

number of seconds between FFTs

window : timeseries.window.Window, optional, default: None

window function to apply to timeseries prior to FFT

nproc : int, default: 1

maximum number of independent frame reading processes, default is set to single-process file reading.

bins : ndarray, optional, default None

array of histogram bin edges, including the rightmost edge

low : float, optional, default: None

left edge of lowest amplitude bin, only read if bins is not given

high : float, optional, default: None

right edge of highest amplitude bin, only read if bins is not given

nbins : int, optional, default: 500

number of bins to generate, only read if bins is not given

log : bool, optional, default: False

calculate amplitude bins over a logarithmic scale, only read if bins is not given

norm : bool, optional, default: False

normalise bin counts to a unit sum

density : bool, optional, default: False

normalise bin counts to a unit integral

Returns:

specvar : SpectralVariance

2D-array of spectral frequency-amplitude counts

See also

numpy.histogram()
for details on specifying bins and weights
spectrogram(stride, fftlength=None, overlap=0, method='welch', window=None, nproc=1, **kwargs)[source]

Calculate the average power spectrogram of this TimeSeries using the specified average spectrum method.

Each time-bin of the output Spectrogram is calculated by taking a chunk of the TimeSeries in the segment [t - overlap/2., t + stride + overlap/2.) and calculating the psd() of those data.

As a result, each time-bin is calculated using stride + overlap seconds of data.

Parameters:

timeseries : TimeSeries

input time-series to process.

stride : float

number of seconds in single PSD (column of spectrogram).

fftlength : float

number of seconds in single FFT.

overlap : int, optional, default: 0

number of seconds between FFTs.

method : str, optional, default: ‘welch’

average spectrum method.

window : str, numpy.ndarray, optional, default: None

window function to apply to timeseries prior to FFT, see scipy.signal.get_window for details on acceptable formats

plan : REAL8FFTPlan, optional

LAL FFT plan to use when generating average spectrum, substitute type ‘REAL8’ as appropriate. This is only accepted if you select method as one of ‘median-mean’, ‘median’, or ‘lal-welch’

nproc : int, default: 1

number of CPUs to use in parallel processing of FFTs

cross : TimeSeries

optional keyword argument time-series for calculating CSD spectrogram if None, then calculates PSD spectrogram

Returns:

spectrogram : Spectrogram

time-frequency power spectrogram as generated from the input time-series.

spectrogram2(fftlength, overlap=0, window='hanning', scaling='density', **kwargs)[source]

Calculate the non-averaged power Spectrogram of this TimeSeries

Parameters:

fftlength : float

number of seconds in single FFT.

overlap : float, optional

number of seconds between FFTs.

window : str or tuple or array-like, optional

desired window to use. See get_window for a list of windows and required parameters. If window is array_like it will be used directly as the window.

scaling : [ ‘density’ | ‘spectrum’ ], optional

selects between computing the power spectral density (‘density’) where the Spectrogram has units of V**2/Hz if the input is measured in V and computing the power spectrum (‘spectrum’) where the Spectrogram has units of V**2 if the input is measured in V. Defaults to ‘density’.

**kwargs :

other parameters to be passed to scipy.signal.periodogram for each column of the Spectrogram

Returns:

spectrogram: `~gwpy.spectrogram.Spectrogram` :

a power Spectrogram with 1/fftlength frequency resolution and (fftlength - overlap) time resolution.

See also

scipy.signal.periodogram
for documentation on the Fourier methods used in this calculation

Notes

This method calculates overlapping periodograms for all possible chunks of data entirely containing within the span of the input TimeSeries, then normalises the power in overlapping chunks using a triangular window centred on that chunk which most overlaps the given Spectrogram time sample.

squeeze(axis=None)

Remove single-dimensional entries from the shape of a.

Refer to numpy.squeeze for full documentation.

See also

numpy.squeeze
equivalent function
std(axis=None, dtype=None, out=None, ddof=0, keepdims=False)

Returns the standard deviation of the array elements along given axis.

Refer to numpy.std for full documentation.

See also

numpy.std
equivalent function
sum(axis=None, dtype=None, out=None, keepdims=False)

Return the sum of the array elements over the given axis.

Refer to numpy.sum for full documentation.

See also

numpy.sum
equivalent function
swapaxes(axis1, axis2)

Return a view of the array with axis1 and axis2 interchanged.

Refer to numpy.swapaxes for full documentation.

See also

numpy.swapaxes
equivalent function
take(indices, axis=None, out=None, mode='raise')

Return an array formed from the elements of a at the given indices.

Refer to numpy.take for full documentation.

See also

numpy.take
equivalent function
to(unit, equivalencies=[])

Returns a new Quantity object with the specified units.

Parameters:

unit : UnitBase instance, str

An object that represents the unit to convert to. Must be an UnitBase object or a string parseable by the units package.

equivalencies : list of equivalence pairs, optional

A list of equivalence pairs to try if the units are not directly convertible. See Equivalencies. If not provided or [], class default equivalencies will be used (none for Quantity, but may be set for subclasses) If None, no equivalencies will be applied at all, not even any set globally or within a context.

to_hdf5(*args, **kwargs)[source]

Convert this array to a h5py.Dataset.

This method has been deprecated in favour of the unified I/O method:

Class.write(..., format=’hdf5’)

to_lal(*args, **kwargs)[source]

Convert this TimeSeries into a LAL TimeSeries.

to_pycbc(*args, **kwargs)[source]

Convert this TimeSeries into a PyCBC TimeSeries

Parameters:

copy : bool, optional, default: True

if True, copy these data to a new array

Returns:

timeseries : TimeSeries

a PyCBC representation of this TimeSeries

tobytes(order='C')

Construct Python bytes containing the raw data bytes in the array.

Constructs Python bytes showing a copy of the raw contents of data memory. The bytes object can be produced in either ‘C’ or ‘Fortran’, or ‘Any’ order (the default is ‘C’-order). ‘Any’ order means C-order unless the F_CONTIGUOUS flag in the array is set, in which case it means ‘Fortran’ order.

New in version 1.9.0.

Parameters:

order : {‘C’, ‘F’, None}, optional

Order of the data for multidimensional arrays: C, Fortran, or the same as for the original array.

Returns:

s : bytes

Python bytes exhibiting a copy of a‘s raw data.

Examples

>>> x = np.array([[0, 1], [2, 3]])
>>> x.tobytes()
b'\x00\x00\x00\x00\x01\x00\x00\x00\x02\x00\x00\x00\x03\x00\x00\x00'
>>> x.tobytes('C') == x.tobytes()
True
>>> x.tobytes('F')
b'\x00\x00\x00\x00\x02\x00\x00\x00\x01\x00\x00\x00\x03\x00\x00\x00'
tofile(fid, sep="", format="%s")

Write array to a file as text or binary (default).

Data is always written in ‘C’ order, independent of the order of a. The data produced by this method can be recovered using the function fromfile().

Parameters:

fid : file or str

An open file object, or a string containing a filename.

sep : str

Separator between array items for text output. If “” (empty), a binary file is written, equivalent to file.write(a.tobytes()).

format : str

Format string for text file output. Each entry in the array is formatted to text by first converting it to the closest Python type, and then using “format” % item.

Notes

This is a convenience function for quick storage of array data. Information on endianness and precision is lost, so this method is not a good choice for files intended to archive data or transport data between machines with different endianness. Some of these problems can be overcome by outputting the data as text files, at the expense of speed and file size.

tolist()

Return the array as a (possibly nested) list.

Return a copy of the array data as a (nested) Python list. Data items are converted to the nearest compatible Python type.

Parameters:

none :

Returns:

y : list

The possibly nested list of array elements.

Notes

The array may be recreated, a = np.array(a.tolist()).

Examples

>>> a = np.array([1, 2])
>>> a.tolist()
[1, 2]
>>> a = np.array([[1, 2], [3, 4]])
>>> list(a)
[array([1, 2]), array([3, 4])]
>>> a.tolist()
[[1, 2], [3, 4]]
tostring(order='C')[source]

Construct Python bytes containing the raw data bytes in the array.

Constructs Python bytes showing a copy of the raw contents of data memory. The bytes object can be produced in either ‘C’ or ‘Fortran’, or ‘Any’ order (the default is ‘C’-order). ‘Any’ order means C-order unless the F_CONTIGUOUS flag in the array is set, in which case it means ‘Fortran’ order.

This function is a compatibility alias for tobytes. Despite its name it returns bytes not strings.

Parameters:

order : {‘C’, ‘F’, None}, optional

Order of the data for multidimensional arrays: C, Fortran, or the same as for the original array.

Returns:

s : bytes

Python bytes exhibiting a copy of a‘s raw data.

Examples

>>> x = np.array([[0, 1], [2, 3]])
>>> x.tobytes()
b'\x00\x00\x00\x00\x01\x00\x00\x00\x02\x00\x00\x00\x03\x00\x00\x00'
>>> x.tobytes('C') == x.tobytes()
True
>>> x.tobytes('F')
b'\x00\x00\x00\x00\x02\x00\x00\x00\x01\x00\x00\x00\x03\x00\x00\x00'
trace(offset=0, axis1=0, axis2=1, dtype=None, out=None)

Return the sum along diagonals of the array.

Refer to numpy.trace for full documentation.

See also

numpy.trace
equivalent function
transpose(*axes)

Returns a view of the array with axes transposed.

For a 1-D array, this has no effect. (To change between column and row vectors, first cast the 1-D array into a matrix object.) For a 2-D array, this is the usual matrix transpose. For an n-D array, if axes are given, their order indicates how the axes are permuted (see Examples). If axes are not provided and a.shape = (i[0], i[1], ... i[n-2], i[n-1]), then a.transpose().shape = (i[n-1], i[n-2], ... i[1], i[0]).

Parameters:

axes : None, tuple of ints, or n ints

  • None or no argument: reverses the order of the axes.
  • tuple of ints: i in the j-th place in the tuple means a‘s i-th axis becomes a.transpose()‘s j-th axis.
  • n ints: same as an n-tuple of the same ints (this form is intended simply as a “convenience” alternative to the tuple form)
Returns:

out : ndarray

View of a, with axes suitably permuted.

See also

ndarray.T
Array property returning the array transposed.

Examples

>>> a = np.array([[1, 2], [3, 4]])
>>> a
array([[1, 2],
       [3, 4]])
>>> a.transpose()
array([[1, 3],
       [2, 4]])
>>> a.transpose((1, 0))
array([[1, 3],
       [2, 4]])
>>> a.transpose(1, 0)
array([[1, 3],
       [2, 4]])
update(other, inplace=True)[source]

Update this series by appending new data from an other and dropping the same amount of data off the start.

This is a convenience method that just calls append with resize=False.

value_at(x)[source]

Return the value of this Series at the given xindex value

Parameters:

x : float, Quantity

the xindex value at which to search

Returns:

y : Quantity

the value of this Series at the given xindex value

var(axis=None, dtype=None, out=None, ddof=0, keepdims=False)

Returns the variance of the array elements, along given axis.

Refer to numpy.var for full documentation.

See also

numpy.var
equivalent function
view(dtype=None, type=None)

New view of array with the same data.

Parameters:

dtype : data-type or ndarray sub-class, optional

Data-type descriptor of the returned view, e.g., float32 or int16. The default, None, results in the view having the same data-type as a. This argument can also be specified as an ndarray sub-class, which then specifies the type of the returned object (this is equivalent to setting the type parameter).

type : Python type, optional

Type of the returned view, e.g., ndarray or matrix. Again, the default None results in type preservation.

Notes

a.view() is used two different ways:

a.view(some_dtype) or a.view(dtype=some_dtype) constructs a view of the array’s memory with a different data-type. This can cause a reinterpretation of the bytes of memory.

a.view(ndarray_subclass) or a.view(type=ndarray_subclass) just returns an instance of ndarray_subclass that looks at the same array (same shape, dtype, etc.) This does not cause a reinterpretation of the memory.

For a.view(some_dtype), if some_dtype has a different number of bytes per entry than the previous dtype (for example, converting a regular array to a structured array), then the behavior of the view cannot be predicted just from the superficial appearance of a (shown by print(a)). It also depends on exactly how a is stored in memory. Therefore if a is C-ordered versus fortran-ordered, versus defined as a slice or transpose, etc., the view may give different results.

Examples

>>> x = np.array([(1, 2)], dtype=[('a', np.int8), ('b', np.int8)])

Viewing array data using a different type and dtype:

>>> y = x.view(dtype=np.int16, type=np.matrix)
>>> y
matrix([[513]], dtype=int16)
>>> print(type(y))
<class 'numpy.matrixlib.defmatrix.matrix'>

Creating a view on a structured array so it can be used in calculations

>>> x = np.array([(1, 2),(3,4)], dtype=[('a', np.int8), ('b', np.int8)])
>>> xv = x.view(dtype=np.int8).reshape(-1,2)
>>> xv
array([[1, 2],
       [3, 4]], dtype=int8)
>>> xv.mean(0)
array([ 2.,  3.])

Making changes to the view changes the underlying array

>>> xv[0,1] = 20
>>> print(x)
[(1, 20) (3, 4)]

Using a view to convert an array to a recarray:

>>> z = x.view(np.recarray)
>>> z.a
array([1], dtype=int8)

Views share data:

>>> x[0] = (9, 10)
>>> z[0]
(9, 10)

Views that change the dtype size (bytes per entry) should normally be avoided on arrays defined by slices, transposes, fortran-ordering, etc.:

>>> x = np.array([[1,2,3],[4,5,6]], dtype=np.int16)
>>> y = x[:, 0:2]
>>> y
array([[1, 2],
       [4, 5]], dtype=int16)
>>> y.view(dtype=[('width', np.int16), ('length', np.int16)])
Traceback (most recent call last):
  File "<stdin>", line 1, in <module>
ValueError: new type not compatible with array.
>>> z = y.copy()
>>> z.view(dtype=[('width', np.int16), ('length', np.int16)])
array([[(1, 2)],
       [(4, 5)]], dtype=[('width', '<i2'), ('length', '<i2')])
whiten(fftlength, overlap=0, method='welch', window='hanning', detrend='constant', asd=None, **kwargs)[source]

White this TimeSeries against its own ASD

Parameters:

fftlength : float

number of seconds in single FFT

overlap : float, optional, default: 0

numbers of seconds by which to overlap neighbouring FFTs, by default, no overlap is used.

method : str, optional, default: welch

average spectrum method

window : str, numpy.ndarray

name of the window function to use, or an array of length fftlength * TimeSeries.sample_rate to use as the window.

asd : FrequencySeries

the amplitude-spectral density using which to whiten the data

**kwargs :

other keyword arguments are passed to the TimeSeries.asd method to estimate the amplitude spectral density FrequencySeries of this `TimeSeries.

Returns:

out : TimeSeries

a whitened version of the input data

See also

TimeSeries.asd
for details on the ASD calculation
numpy.fft
for details on the Fourier transform algorithm used her

scipy.signal

write(data, *args, **kwargs)

Write this TimeSeries to a file

Parameters:

outfile : str

path of output file

Notes

The available built-in formats are:

Format Read Write Auto-identify
csv Yes Yes Yes
framecpp Yes Yes No
hdf Yes Yes No
hdf5 Yes Yes Yes
txt Yes Yes Yes
zip()[source]

Zip the xindex and value arrays of this Series

Returns:

stacked : 2-d numpy.ndarray

The array formed by stacking the the xindex and value of this series

Examples

>>> a = Series([0, 2, 4, 6, 8], xindex=[-5, -4, -3, -2, -1])
>>> a.zip()
array([[-5.,  0.],
       [-4.,  2.],
       [-3.,  4.],
       [-2.,  6.],
       [-1.,  8.]])
zpk(zeros, poles, gain, digital=False, unit='Hz')[source]

Filter this TimeSeries by applying a zero-pole-gain filter

Parameters:

zeros : array-like

list of zero frequencies

poles : array-like

list of pole frequencies

gain : float

DC gain of filter

digital : bool, optional, default: False

give True if zeros, poles, and gain are already in Z-domain digital format, otherwise they will be converted

unit : str, Unit, optional, default: 'Hz'

unit of zeros and poles, either ‘Hz’ or ‘rad/s’

Returns:

timeseries : TimeSeries

the filtered version of the input data

See also

TimeSeries.filter
for details on how a digital ZPK-format filter is applied

Examples

To apply a zpk filter with file poles at 100 Hz, and five zeros at 1 Hz (giving an overall DC gain of 1e-10):

>>> data2 = data.zpk([100]*5, [1]*5, 1e-10)
class gwpy.timeseries.TimeSeriesList(*items)[source]

Bases: gwpy.timeseries.core.TimeSeriesBaseList

Ordered key-value mapping of named TimeSeries objects

This object is designed to hold data for many different sources (channels) for a single time span.

The main entry points for this object are the read() and fetch() data access methods.

class gwpy.timeseries.TimeSeriesDict(*args, **kwds)[source]

Bases: gwpy.timeseries.core.TimeSeriesBaseDict

Ordered key-value mapping of named TimeSeries objects

This object is designed to hold data for many different sources (channels) for a single time span.

The main entry points for this object are the read() and fetch() data access methods.

Methods Summary

read(*args, **kwargs) Read data into a TimeSeriesBaseDict.

Methods Documentation

classmethod read(*args, **kwargs)

Read data into a TimeSeriesBaseDict.

Parameters:

source : str, Cache

a single file path str, or a Cache containing a contiguous list of files.

channels : ChannelList, list

a list of channels to read from the source.

start : Time, float, optional

GPS start time of required data.

end : Time, float, optional

GPS end time of required data.

format : str, optional

source format identifier. If not given, the format will be detected if possible. See below for list of acceptable formats.

nproc : int, optional, default: 1

number of parallel processes to use, serial process by default.

Note

Parallel frame reading, via the nproc keyword argument, is only available when giving a Cache of frames, or using the format='cache' keyword argument.

gap : str, optional

how to handle gaps in the cache, one of

  • ‘ignore’: do nothing, let the undelying reader method handle it
  • ‘warn’: do nothing except print a warning to the screen
  • ‘raise’: raise an exception upon finding a gap (default)
  • ‘pad’: insert a value to fill the gaps

pad : float, optional

value with which to fill gaps in the source data, only used if gap is not given, or gap='pad' is given

Returns:

dict : TimeSeriesBaseDict

a new TimeSeriesBaseDict containing data for the given channel.

Raises:

Exception :

if no format could be automatically identified.

Notes

The available built-in formats are:

Format Read Write Auto-identify
framecpp Yes No No
gwf Yes No Yes
lalframe Yes No No