- cupyx.scipy.signal.resample(x, num, t=None, axis=0, window=None, domain='time')#
Resample x to num samples using Fourier method along the given axis.
The resampled signal starts at the same value as x but is sampled with a spacing of
len(x) / num * (spacing of x). Because a Fourier method is used, the signal is assumed to be periodic.
x (array_like) – The data to be resampled.
num (int) – The number of samples in the resampled signal.
t (array_like, optional) – If t is given, it is assumed to be the sample positions associated with the signal data in x.
axis (int, optional) – The axis of x that is resampled. Default is 0.
domain (string, optional) –
A string indicating the domain of the input x:
Consider the input x as time-domain. (Default)
Consider the input x as frequency-domain.
Either the resampled array, or, if t was given, a tuple containing the resampled array and the corresponding resampled positions.
- Return type:
resampled_x or (resampled_x, resampled_t)
The argument window controls a Fourier-domain window that tapers the Fourier spectrum before zero-padding to alleviate ringing in the resampled values for sampled signals you didn’t intend to be interpreted as band-limited.
If window is a function, then it is called with a vector of inputs indicating the frequency bins (i.e. fftfreq(x.shape[axis]) ).
If window is an array of the same length as x.shape[axis] it is assumed to be the window to be applied directly in the Fourier domain (with dc and low-frequency first).
For any other type of window, the function cusignal.get_window is called to generate the window.
The first sample of the returned vector is the same as the first sample of the input vector. The spacing between samples is changed from
dx * len(x) / num.
If t is not None, then it represents the old sample positions, and the new sample positions will be returned as well as the new samples.
As noted, resample uses FFT transformations, which can be very slow if the number of input or output samples is large and prime; see scipy.fftpack.fft.
Note that the end of the resampled data rises to meet the first sample of the next cycle:
>>> import cupy as cp >>> import cupyx.scipy.signal import resample
>>> x = cupy.linspace(0, 10, 20, endpoint=False) >>> y = cupy.cos(-x**2/6.0) >>> f = resample(y, 100) >>> xnew = cupy.linspace(0, 10, 100, endpoint=False)
>>> import matplotlib.pyplot as plt >>> plt.plot(cupy.asnumpy(x), cupy.asnumpy(y), 'go-', cupy.asnumpy(xnew), cupy.asnumpy(f), '.-', 10, cupy.asnumpy(y), 'ro') >>> plt.legend(['data', 'resampled'], loc='best') >>> plt.show()