[4] | 1 | from __future__ import absolute_import
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| 2 |
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| 3 | import collections
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| 4 | import numpy as np
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| 5 | import pp
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| 6 |
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| 7 | def test(nx=50, ny=50):
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| 8 | # NOT WORKING
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| 9 | # all wavenumbers are cm-1
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| 10 | wn_max = 100.0
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| 11 | wn_min = 50.0
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| 12 |
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| 13 | resolution_min = 300.0
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| 14 |
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| 15 | delta_wn = wn_min / resolution_min
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| 16 |
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| 17 | # spectra are evenly sampled from 0 to wn_max with spacing delta_wn
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| 18 | nfreq = np.ceil(wn_max / delta_wn)
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| 19 | wn_max = delta_wn * nfreq
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| 20 |
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| 21 | freqs = np.arange(nfreq)
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| 22 | freqs *= delta_wn
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| 23 |
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| 24 | # construct a dummy 'sky'
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| 25 | # numpy default indexing is C-style so that the rightmost index
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| 26 | # 'changes the fastest'.
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| 27 | sky_s = np.zeros([nfreq, ny, nx], np.float)
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| 28 | sky_s[:,ny/2,nx/2] = 1.0
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| 29 |
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| 30 | # x coords in radians
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| 31 | arcsec2rad = 1.0 / 206265
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| 32 | sky_x = (np.arange(nx) - nx/2) * 1.0 * arcsec2rad
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| 33 | sky_y = (np.arange(ny) - ny/2) * 1.0 * arcsec2rad
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| 34 |
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| 35 | # dummy baselines (each baseline entry is [u,v] in centimetres)
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| 36 | baselines = []
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| 37 | for i in range(500):
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| 38 | baselines.append([20000.0, 20000.0])
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| 39 |
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| 40 | df = DoubleFourier(sky_s=sky_s, freqs=freqs, sky_x=sky_x, sky_y=sky_y,
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| 41 | baselines=baselines)
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| 42 |
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| 43 | df.matlab_transform()
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| 44 |
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| 45 |
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| 46 | class DoubleFourier(object):
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| 47 | """Class to compute interferograms.
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| 48 | """
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| 49 |
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| 50 | def __init__(self, parameters, previous_results):
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| 51 | self.parameters = parameters
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| 52 | self.previous_results = previous_results
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| 53 |
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| 54 | # paralle processing stuff
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| 55 | ppservers = ()
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| 56 | self.job_server = pp.Server(ppservers=ppservers)
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| 57 | print 'DoubleFourier starting pp with %s workers' % \
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| 58 | self.job_server.get_ncpus()
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| 59 |
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| 60 | self.result = collections.OrderedDict()
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| 61 |
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| 62 | def run(self):
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| 63 | print 'DoubleFourier.run'
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| 64 |
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| 65 | fts = self.previous_results['fts']
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| 66 | frequency_axis = fts['fts_wn']
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| 67 | opd_max = fts['opd_max']
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| 68 | fts_nsample = fts['ftsnsample']
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| 69 | vdrive = fts['vdrive']
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| 70 | delta_opd = fts['delta_opd']
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| 71 |
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| 72 | times = np.arange(int(fts_nsample), dtype=np.float)
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| 73 | times *= (opd_max / vdrive) / float(fts_nsample-1)
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| 74 |
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| 75 | beamsgenerator = self.previous_results['beamsgenerator']
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| 76 |
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| 77 | uvmapgenerator = self.previous_results['uvmapgenerator']
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| 78 | bxby = uvmapgenerator['bxby']
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| 79 |
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| 80 | skygenerator = self.previous_results['skygenerator']
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| 81 | skymodel = skygenerator['sky model']
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| 82 | spatial_axis = self.result['spatial axis'] = skygenerator['spatial axis']
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| 83 | self.result['frequency axis'] = frequency_axis
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| 84 |
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| 85 | # assuming nx is even then transform has 0 freq at origin and [nx/2] is
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| 86 | # Nyquist frequency. Nyq freq = 0.5 * Nyquist sampling freq.
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| 87 | # Assume further that the fft is shifted so that 0 freq is at nx/2
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| 88 | nx = len(spatial_axis)
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| 89 | spatial_freq_axis = np.arange(-nx/2, nx/2, dtype=np.float)
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| 90 | sample_freq = (180.0 * 3600.0 / np.pi) / (spatial_axis[1] - spatial_axis[0])
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| 91 | spatial_freq_axis *= (sample_freq / nx)
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| 92 | self.result['spatial frequency axis'] = spatial_freq_axis
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| 93 |
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| 94 | self.result['baseline interferograms'] = collections.OrderedDict()
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| 95 | # for baseline in bxby:
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| 96 | for baseline in bxby[:3]:
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| 97 | print baseline
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| 98 | measurement = np.zeros(np.shape(times))
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| 99 |
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| 100 | # FTS path diff and possibly baseline itself vary with time
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| 101 | for tindex,t in enumerate(times):
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| 102 | # for tindex,t in enumerate(times[:1]):
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| 103 |
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| 104 | sky_now = skymodel
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| 105 |
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| 106 | # what is the system looking at?
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| 107 | # add 'errors' in order
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| 108 |
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| 109 | # 1. baseline should be perp to centre of field.
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| 110 | # If baseline is tilted then origin of sky map shifts.
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| 111 | # (I think effect could be corrected by changing
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| 112 | # FTS sample position to compensate.?)
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| 113 | # for now assume 0 error but do full calculation for timing
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| 114 | # purposes
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| 115 | baseline_dx = 0.0
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| 116 | baseline_dy = 0.0
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| 117 |
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| 118 | # calculate xpos, ypos in units of pixel - numpy arrays
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| 119 | # [row,col]
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| 120 | nx = len(spatial_axis)
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| 121 | colpos = float(nx-1) * float (baseline_dx - spatial_axis[0]) / \
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| 122 | (spatial_axis[-1] - spatial_axis[0])
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| 123 | rowpos = float(nx-1) * float (baseline_dy - spatial_axis[0]) / \
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| 124 | (spatial_axis[-1] - spatial_axis[0])
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| 125 |
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| 126 | if colpos < 0 or colpos > (nx-1) or rowpos < 0 or rowpos > \
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| 127 | (nx-1):
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| 128 | raise Exception, \
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| 129 | 'baseline centre outside limits of sky model'
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| 130 |
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| 131 | # calculate fourier phase shift to move point at [0,0] to
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| 132 | # [rowpos, colpos]
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| 133 | shiftx = np.zeros([nx], np.complex)
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| 134 | shiftx[:nx/2] = np.arange(nx/2, dtype=np.complex)
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| 135 | shiftx[nx/2:] = np.arange(-nx/2, 0, dtype=np.complex)
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| 136 | shiftx = np.exp((-2.0j * np.pi * colpos * shiftx) / float(nx))
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| 137 |
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| 138 | shifty = np.zeros([nx], np.complex)
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| 139 | shifty[:nx/2] = np.arange(nx/2, dtype=np.complex)
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| 140 | shifty[nx/2:] = np.arange(-nx/2, 0, dtype=np.complex)
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| 141 | shifty = np.exp((-2.0j * np.pi * rowpos * shifty) / float(nx))
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| 142 |
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| 143 | shift = np.ones([nx,nx], np.complex)
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| 144 | for j in range(nx):
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| 145 | shift[j,:] *= shiftx
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| 146 | for i in range(nx):
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| 147 | shift[:,i] *= shifty
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| 148 |
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| 149 | # go through freq planes and shift them
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| 150 | for iwn,wn in enumerate(frequency_axis):
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| 151 | # move centre of image to array origin
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| 152 | temp = np.fft.fftshift(sky_now[:,:,iwn])
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| 153 | # 2d fft
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| 154 | temp = np.fft.fft2(temp)
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| 155 | # apply phase shift
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| 156 | temp *= shift
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| 157 | # transform and shift back
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| 158 | temp = np.fft.ifft2(temp)
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| 159 | temp = np.fft.fftshift(temp)
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| 160 | # imag part should still be 0
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| 161 | # print 'max real', np.max(np.real(temp))
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| 162 | # print 'max imag', np.max(np.imag(temp))
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| 163 | temp = np.abs(temp)
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| 164 | sky_now[:,:,iwn] = np.fft.fftshift(temp)
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| 165 |
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| 166 | if t == times[0]:
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| 167 | self.result['sky at time 0'] = sky_now
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| 168 |
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| 169 | # 2. telescopes should be centred on centre of field
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| 170 | # Telescopes collect flux from the 'sky' and pass
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| 171 | # it to the FTS beam combiner. In doing this each
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| 172 | # telescope multiplies the sky emission by its
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| 173 | # amplitude beam response - always real but with
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| 174 | # negative areas. Is this correct? Gives right
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| 175 | # answer for 'no error' case.
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| 176 |
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| 177 | # multiply sky by amplitude beam 1 * amplitude beam 2
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| 178 | for iwn,wn in enumerate(frequency_axis):
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| 179 | # calculate shifted beams here
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| 180 | # for now assume no errors and just use beam
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| 181 | # calculated earlier
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| 182 |
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| 183 | amplitude_beam = beamsgenerator['primary amplitude beam']\
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| 184 | [wn]
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| 185 | amp_beam_1 = amplitude_beam.data
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| 186 | amp_beam_2 = amplitude_beam.data
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| 187 | sky_now[:,:,iwn] *= amp_beam_1 * amp_beam_2
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| 188 |
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| 189 | if t == times[0]:
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| 190 | self.result['sky*beams at time 0'] = sky_now
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| 191 |
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| 192 | # 3. baseline error revisited
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| 193 | # derive baseline at this time
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| 194 | baseline_error = 0.0
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| 195 | baseline_now = baseline + baseline_error
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| 196 | # print 'baseline_now', baseline_now
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| 197 |
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| 198 | # gamma_12[(baseline,t)] = 0.0
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| 199 | fft_now = np.zeros(np.shape(sky_now), np.complex)
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| 200 | spectrum = np.zeros(np.shape(frequency_axis), np.complex)
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| 201 | for iwn,wn in enumerate(frequency_axis):
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| 202 |
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| 203 | # derive shift needed to place baseline at one of FFT coords
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| 204 | # this depends on physical baseline and frequency
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| 205 | baseline_now_lambdas = baseline_now * wn * 100.0
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| 206 | # print 'baseline lambda', wn, baseline_now_lambdas
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| 207 |
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| 208 | # calculate baseline position in units of pixels of FFTed sky -
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| 209 | # numpy arrays [row,col]
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| 210 | colpos = float(nx-1) * float(baseline_now_lambdas[0] - spatial_freq_axis[0]) / \
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| 211 | (spatial_freq_axis[-1] - spatial_freq_axis[0])
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| 212 | rowpos = float(nx-1) * float(baseline_now_lambdas[1] - spatial_freq_axis[0]) / \
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| 213 | (spatial_freq_axis[-1] - spatial_freq_axis[0])
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| 214 | # print 'spatial colpos, rowpos', colpos, rowpos
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| 215 |
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| 216 | # calculate fourier phase shift to move point at [rowpos,colpos] to
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| 217 | # [0,0]
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| 218 | shiftx = np.zeros([nx], np.complex)
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| 219 | shiftx[:nx/2] = np.arange(nx/2, dtype=np.complex)
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| 220 | shiftx[nx/2:] = np.arange(-nx/2, 0, dtype=np.complex)
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| 221 | shiftx = np.exp((-2.0j * np.pi * colpos * shiftx) / float(nx))
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| 222 |
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| 223 | shifty = np.zeros([nx], np.complex)
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| 224 | shifty[:nx/2] = np.arange(nx/2, dtype=np.complex)
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| 225 | shifty[nx/2:] = np.arange(-nx/2, 0, dtype=np.complex)
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| 226 | shifty = np.exp((-2.0j * np.pi * rowpos * shifty) / float(nx))
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| 227 |
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| 228 | shift = np.ones([nx,nx], np.complex)
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| 229 | for j in range(nx):
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| 230 | shift[j,:] *= shiftx
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| 231 | for i in range(nx):
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| 232 | shift[:,i] *= shifty
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| 233 |
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| 234 | # move centre of sky image to origin
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| 235 | temp = np.fft.fftshift(sky_now[:,:,iwn])
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| 236 | # apply phase shift
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| 237 | temp *= shift
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| 238 | # 2d fft
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| 239 | temp = np.fft.fft2(temp)
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| 240 | # shift 0 freq to centre of array
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| 241 | fft_now[:,:,iwn] = np.fft.ifftshift(temp)
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| 242 |
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| 243 | spectrum[iwn] = temp[0,0]
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| 244 |
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| 245 | if t == times[0]:
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| 246 | self.result['skyfft at time 0'] = fft_now
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| 247 |
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| 248 | # 3. FTS sampling should be accurate
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| 249 | # derive lag due to FTS path difference
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| 250 | # 0 error for now
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| 251 | mirror_error = 0.0
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| 252 | opd = 2.0 * (vdrive * t + mirror_error)
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| 253 | print 'opd', opd, vdrive, t, mirror_error
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| 254 | opd_ipos = opd / delta_opd
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| 255 |
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| 256 | # make spectrum symmetric
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| 257 | nfreq = len(frequency_axis)
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| 258 | symmetric_spectrum = np.zeros([2*nfreq])
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| 259 | symmetric_spectrum[:nfreq] = spectrum
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| 260 | symmetric_spectrum[nfreq:] = spectrum[::-1]
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| 261 |
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| 262 | # calculate shift needed to move point at opd to 0
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| 263 | shift = np.zeros([2*nfreq], dtype=np.complex)
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| 264 | shift[:nfreq] = np.arange(nfreq, dtype=np.complex)
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| 265 | shift[nfreq:] = np.arange(-nfreq, 0, dtype=np.complex)
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| 266 | shift = np.exp((-2.0j * np.pi * opd_ipos * shift) / float(nfreq))
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| 267 |
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| 268 | # apply phase shift and fft
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| 269 | symmetric_spectrum *= shift
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| 270 | spectrum_fft = np.fft.fft(symmetric_spectrum)
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| 271 | measurement[tindex] = spectrum_fft[0]
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| 272 |
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| 273 | self.result['baseline interferograms'][tuple(baseline)] = measurement
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| 274 |
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| 275 | return self.result
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| 276 |
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| 277 | def matlab_transform(self):
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| 278 | # readers should look at Izumi et al. 2006, Applied Optics, 45, 2576
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| 279 | # for theoretical background. Names of variables in the code correspond
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| 280 | # to that work.
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| 281 |
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| 282 | # For now, assume 2 light collectors giving one baseline at a time.
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| 283 | interferograms = {}
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| 284 |
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| 285 | for baseline in self.baselines:
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| 286 | interferogram = 0
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| 287 |
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| 288 | # baseline length (cm) and position angle
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| 289 | bu = baseline[0]
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| 290 | bv = baseline[1]
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| 291 | mod_b = np.sqrt(pow(bu,2) + pow(bv,2))
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| 292 | ang_b = np.arctan2(bv, bu)
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| 293 |
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| 294 | # loop over sky pixels covered by primary beam
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| 295 | nx = self.sky_s.shape[1]
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| 296 | ny = self.sky_s.shape[2]
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| 297 | for j in range(ny):
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| 298 | for i in range(nx):
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| 299 |
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| 300 | # inverse fft of emission spectrum at this point
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| 301 | temp = np.fft.ifft(self.sky_s[:,j,i])
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| 302 |
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| 303 | # move 0 frequency to centre of array
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| 304 | temp = np.fft.fftshift(temp)
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| 305 |
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| 306 | # length (radians) and position angle of theta vector
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| 307 | mod_theta = np.sqrt(pow(self.sky_x[i],2) + pow(self.sky_y[j],2))
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| 308 | ang_theta = np.arctan2(self.sky_y[j], self.sky_x[i])
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| 309 |
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| 310 | # calculate b.theta (the projection of b on theta)
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| 311 | # and the corresponding delay in units of wavelength at
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| 312 | # Nyquist frequency
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| 313 | delay = mod_theta * mod_b * np.cos(ang_b - ang_theta) * self.freqs[-1]
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| 314 |
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| 315 | # sampling is done at twice Nyquist freq so shift transformed
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| 316 | # spectrum by 2 * delay samples (approximated to nint)
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| 317 | # NOTE factor of 2 discrepency with matlab version! I think
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| 318 | # this is because there the variable 'Nyq' is the Nyquist
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| 319 | # sampling rate, not the Nyquist frequency.
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| 320 | temp = np.roll(temp, int(round(2.0 * delay)))
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| 321 |
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| 322 | # want only the real part of the result
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| 323 | interferogram += np.real(temp)
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| 324 |
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| 325 | def __repr__(self):
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| 326 | return 'DoubleFourier'
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| 327 |
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