peacock-data-public-datasets-idc-cronscript
/
venv
/lib
/python3.10
/site-packages
/scipy
/signal
/tests
/mpsig.py
| """ | |
| Some signal functions implemented using mpmath. | |
| """ | |
| try: | |
| import mpmath | |
| except ImportError: | |
| mpmath = None | |
| def _prod(seq): | |
| """Returns the product of the elements in the sequence `seq`.""" | |
| p = 1 | |
| for elem in seq: | |
| p *= elem | |
| return p | |
| def _relative_degree(z, p): | |
| """ | |
| Return relative degree of transfer function from zeros and poles. | |
| This is simply len(p) - len(z), which must be nonnegative. | |
| A ValueError is raised if len(p) < len(z). | |
| """ | |
| degree = len(p) - len(z) | |
| if degree < 0: | |
| raise ValueError("Improper transfer function. " | |
| "Must have at least as many poles as zeros.") | |
| return degree | |
| def _zpkbilinear(z, p, k, fs): | |
| """Bilinear transformation to convert a filter from analog to digital.""" | |
| degree = _relative_degree(z, p) | |
| fs2 = 2*fs | |
| # Bilinear transform the poles and zeros | |
| z_z = [(fs2 + z1) / (fs2 - z1) for z1 in z] | |
| p_z = [(fs2 + p1) / (fs2 - p1) for p1 in p] | |
| # Any zeros that were at infinity get moved to the Nyquist frequency | |
| z_z.extend([-1] * degree) | |
| # Compensate for gain change | |
| numer = _prod(fs2 - z1 for z1 in z) | |
| denom = _prod(fs2 - p1 for p1 in p) | |
| k_z = k * numer / denom | |
| return z_z, p_z, k_z.real | |
| def _zpklp2lp(z, p, k, wo=1): | |
| """Transform a lowpass filter to a different cutoff frequency.""" | |
| degree = _relative_degree(z, p) | |
| # Scale all points radially from origin to shift cutoff frequency | |
| z_lp = [wo * z1 for z1 in z] | |
| p_lp = [wo * p1 for p1 in p] | |
| # Each shifted pole decreases gain by wo, each shifted zero increases it. | |
| # Cancel out the net change to keep overall gain the same | |
| k_lp = k * wo**degree | |
| return z_lp, p_lp, k_lp | |
| def _butter_analog_poles(n): | |
| """ | |
| Poles of an analog Butterworth lowpass filter. | |
| This is the same calculation as scipy.signal.buttap(n) or | |
| scipy.signal.butter(n, 1, analog=True, output='zpk'), but mpmath is used, | |
| and only the poles are returned. | |
| """ | |
| poles = [-mpmath.exp(1j*mpmath.pi*k/(2*n)) for k in range(-n+1, n, 2)] | |
| return poles | |
| def butter_lp(n, Wn): | |
| """ | |
| Lowpass Butterworth digital filter design. | |
| This computes the same result as scipy.signal.butter(n, Wn, output='zpk'), | |
| but it uses mpmath, and the results are returned in lists instead of NumPy | |
| arrays. | |
| """ | |
| zeros = [] | |
| poles = _butter_analog_poles(n) | |
| k = 1 | |
| fs = 2 | |
| warped = 2 * fs * mpmath.tan(mpmath.pi * Wn / fs) | |
| z, p, k = _zpklp2lp(zeros, poles, k, wo=warped) | |
| z, p, k = _zpkbilinear(z, p, k, fs=fs) | |
| return z, p, k | |
| def zpkfreqz(z, p, k, worN=None): | |
| """ | |
| Frequency response of a filter in zpk format, using mpmath. | |
| This is the same calculation as scipy.signal.freqz, but the input is in | |
| zpk format, the calculation is performed using mpath, and the results are | |
| returned in lists instead of NumPy arrays. | |
| """ | |
| if worN is None or isinstance(worN, int): | |
| N = worN or 512 | |
| ws = [mpmath.pi * mpmath.mpf(j) / N for j in range(N)] | |
| else: | |
| ws = worN | |
| h = [] | |
| for wk in ws: | |
| zm1 = mpmath.exp(1j * wk) | |
| numer = _prod([zm1 - t for t in z]) | |
| denom = _prod([zm1 - t for t in p]) | |
| hk = k * numer / denom | |
| h.append(hk) | |
| return ws, h | |