mirror of
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193 lines
5.4 KiB
Python
193 lines
5.4 KiB
Python
# vim: fdm=indent ts=4
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"""
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Library for this simulation
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"""
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import numpy as np
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from numpy.polynomial import Polynomial
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from earsim import Antenna
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""" Beacon utils """
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def sine_beacon(f, t, t0=0, amplitude=1, baseline=0, phase=0):
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"""
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Return a sine appropriate as a beacon
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"""
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return amplitude * np.sin(2*np.pi*f*(t+t0) + phase) + baseline
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def phase_mod(phase, low=np.pi):
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"""
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Modulo phase such that it falls within the
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interval $[-low, 2\pi - low)$.
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"""
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return (phase + low) % (2*np.pi) - low
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def distance(x1, x2):
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"""
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Calculate the Euclidean distance between two locations x1 and x2
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"""
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assert type(x1) in [Antenna]
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x1 = np.array([x1.x, x1.y, x1.z])
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assert type(x2) in [Antenna]
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x2 = np.array([x2.x, x2.y, x2.z])
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return np.sqrt( np.sum( (x1-x2)**2 ) )
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def beacon_from(tx, rx, f, t=0, t0=0, c_light=3e8, radiate_rsq=True, amplitude=1,**kwargs):
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dist = distance(tx,rx)
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t0 = t0 + dist/c_light
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if radiate_rsq:
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if np.isclose(dist, 0):
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dist = 1
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amplitude *= 1/(dist**2)
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return sine_beacon(f, t, t0=t0, amplitude=amplitude,**kwargs)
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""" Fourier """
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def ft_corr_vectors(freqs, time):
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"""
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Get the cosine and sine terms for freqs at time.
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Takes the outer product of freqs and time.
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"""
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freqtime = np.outer(freqs, time)
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c_k = np.cos(2*np.pi*freqtime)
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s_k = np.sin(2*np.pi*freqtime)
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return c_k, s_k
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def direct_fourier_transform(freqs, time, samplesets_iterable):
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"""
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Determine the fourier transform of each sampleset in samplesets_iterable at freqs.
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The samplesets are expected to have the same time vector.
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Returns either a generator to return the fourier transform for each sampleset
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if samplesets_iterable is a generator
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or a numpy array.
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"""
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c_k, s_k = ft_corr_vectors(freqs, time)
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if not hasattr(samplesets_iterable, '__len__') and hasattr(samplesets_iterable, '__iter__'):
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# samplesets_iterable is an iterator
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# return a generator containing (real, imag) amplitudes
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return ( (np.dot(c_k, samples), np.dot(s_k, samples)) for samples in samplesets_iterable )
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# Numpy array
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return np.dot(c_k, samplesets_iterable), np.dot(s_k, samplesets_iterable)
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def phase_field_from_tx(x, y, tx, f_beacon, c_light=3e8, t0=0, wrap_phase=True, return_meshgrid=True):
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assert type(tx) in [Antenna]
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xs, ys = np.meshgrid(x, y, sparse=True)
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x_distances = (tx.x - xs)**2
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y_distances = (tx.y - ys)**2
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dist = np.sqrt( x_distances + y_distances )
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phase = (dist/c_light + t0) * f_beacon*2*np.pi
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if wrap_phase:
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phase = phase_mod(phase)
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if return_meshgrid:
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return phase, (xs, ys)
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else:
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return phase, (np.repeat(xs, len(ys), axis=0), np.repeat(ys, len(xs[0]), axis=1))
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def find_beacon_in_traces(
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traces,
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t_trace,
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f_beacon_estimate = 50e6,
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frequency_fit = False,
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N_test_freqs = 5e2,
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f_beacon_estimate_band = 0.01,
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amp_cut = 0.8
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):
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"""
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f_beacon_band is inclusive
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traces is [trace, trace, trace, .. ]
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"""
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amplitudes = np.zeros(len(traces))
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phases = np.zeros(len(traces))
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frequencies = np.zeros(len(traces))
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if frequency_fit: # fit frequency
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test_freqs = f_beacon_estimate + f_beacon_estimate_band * np.linspace(-1, 1, int(N_test_freqs)+1)
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ft_amp_gen = direct_fourier_transform(test_freqs, t_trace, (x for x in traces))
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n_samples = len(t_trace)
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for i, ft_amp in enumerate(ft_amp_gen):
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real, imag = ft_amp
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amps = 1/n_samples * ( real**2 + imag**2)**0.5
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# find frequency peak and surrounding bins
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# that are valid for the parabola fit
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max_amp_idx = np.argmax(amps)
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max_amp = amps[max_amp_idx]
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if True:
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frequencies[i] = test_freqs[max_amp_idx]
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continue
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valid_mask = amps >= amp_cut*max_amp
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if True: # make sure not to use other peaks
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lower_mask = valid_mask[0:max_amp_idx]
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upper_mask = valid_mask[max_amp_idx:]
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if any(lower_mask):
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lower_end = np.argmin(lower_mask[::-1])
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else:
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lower_end = max_amp_idx
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if any(upper_mask):
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upper_end = np.argmin(upper_mask)
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else:
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upper_end = 0
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valid_mask[0:(max_amp_idx - lower_end)] = False
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valid_mask[(max_amp_idx + upper_end):] = False
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if all(~valid_mask):
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frequencies[i] = np.nan
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continue
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# fit Parabola
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parafit = Polynomial.fit(test_freqs[valid_mask], amps[valid_mask], 2)
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func = parafit.convert()
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# find frequency where derivative is 0
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deriv = func.deriv(1)
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freq = deriv.roots()[0]
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frequencies[i] = freq
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else: # no frequency finding
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frequencies[:] = f_beacon_estimate
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n_samples = len(t_trace)
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# evaluate fourier transform at freq for each trace
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for i, freq in enumerate(frequencies):
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if freq is np.nan:
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phases[i] = np.nan
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amplitudes[i] = np.nan
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continue
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real, imag = direct_fourier_transform(freq, t_trace, traces[i])
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phases[i] = np.arctan2(real, imag)
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amplitudes[i] = 2/n_samples * (real**2 + imag**2)**0.5
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return frequencies, phases, amplitudes
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