(COLA) constraint is met. Parameters ---------- window : str or tuple or array_like Desired window to use. If `window` is a string or tuple, it is passed to `get_window` to generate the window values, which are DFT-even by default. See `get_window` for a list of windows and required parameters. If `window` is array_like it will be used directly as the window and its length must be nperseg. nperseg : int Length of each segment. noverlap : int Number of points to overlap between segments. tol : float, optional The allowed variance of a bin's weighted sum from the median bin sum. Returns ------- verdict : bool `True` if chosen combination satisfies COLA within `tol`, `False` otherwise See Also -------- check_NOLA: Check whether the Nonzero Overlap Add (NOLA) constraint is met stft: Short Time Fourier Transform istft: Inverse Short Time Fourier Transform Notes ----- In order to enable inversion of an STFT via the inverse STFT in `istft`, it is sufficient that the signal windowing obeys the constraint of "Constant OverLap Add" (COLA). This ensures that every point in the input data is equally weighted, thereby avoiding aliasing and allowing full reconstruction. Some examples of windows that satisfy COLA: - Rectangular window at overlap of 0, 1/2, 2/3, 3/4, ... - Bartlett window at overlap of 1/2, 3/4, 5/6, ... - Hann window at 1/2, 2/3, 3/4, ... - Any Blackman family window at 2/3 overlap - Any window with ``noverlap = nperseg-1`` A very comprehensive list of other windows may be found in [2]_, wherein the COLA condition is satisfied when the "Amplitude Flatness" is unity. .. versionadded:: 0.19.0 References ---------- .. [1] Julius O. Smith III, "Spectral Audio Signal Processing", W3K Publishing, 2011,ISBN 978-0-9745607-3-1. .. [2] G. Heinzel, A. Ruediger and R. Schilling, "Spectrum and spectral density estimation by the Discrete Fourier transform (DFT), including a comprehensive list of window functions and some new at-top windows", 2002, http://hdl.handle.net/11858/00-001M-0000-0013-557A-5 Examples -------- >>> from scipy import signal Confirm COLA condition for rectangular window of 75% (3/4) overlap: >>> signal.check_COLA(signal.windows.boxcar(100), 100, 75) True COLA is not true for 25% (1/4) overlap, though: >>> signal.check_COLA(signal.windows.boxcar(100), 100, 25) False "Symmetrical" Hann window (for filter design) is not COLA: >>> signal.check_COLA(signal.windows.hann(120, sym=True), 120, 60) False "Periodic" or "DFT-even" Hann window (for FFT analysis) is COLA for overlap of 1/2, 2/3, 3/4, etc.: >>> signal.check_COLA(signal.windows.hann(120, sym=False), 120, 60) True >>> signal.check_COLA(signal.windows.hann(120, sym=False), 120, 80) True >>> signal.check_COLA(signal.windows.hann(120, sym=False), 120, 90) True r