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179 lines
6.2 KiB
179 lines
6.2 KiB
# $Id: fft.py,v 1.1 2010-02-24 14:27:23 wirawan Exp $
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#
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# wpylib.math.fft module
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# Created: 20100205
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# Wirawan Purwanto
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#
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"""
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wpylib.math.fft
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FFT support.
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"""
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import sys
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import numpy
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import numpy.fft
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from wpylib.text_tools import slice_str
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from wpylib.generators import all_combinations
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# The minimum and maximum grid coordinates for a given FFT grid size (Gsize).
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# In multidimensional FFT grid, Gsize should be a numpy array.
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fft_grid_bounds = lambda Gsize : ( -(Gsize // 2), -(Gsize // 2) + Gsize - 1 )
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"""
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Notes on FFT grid ranges:
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The fft_grid_ranges* functions define the negative and positive frequency
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domains on the FFT grid.
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Unfortunately we cannot copy an FFT grid onto another with a different grid
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size in single statement like:
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out_grid[gmin:gmax:gstep] = in_grid[:]
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The reason is: because gmin < gmax, python does not support such a
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wrapped-around array slice.
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The slice [gmin:gmax:gstep] will certainly result in an empty slice.
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To do this, we define two functions below.
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First, fft_grid_ranges1 generates the ranges for each dimension, then
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fft_grid_ranges itself generates all the combination of ranges (which cover
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all combinations of positive and ndgative frequency domains for all
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dimensions.)
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For a (5x8) FFT grid, we will have
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Gmin = (-2, -4)
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Gmax = (2, 3)
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Gstep = (1,1) for simplicity
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In this case, fft_grid_ranges1(Gmin, Gmax, Gstep) will yield
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[
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(-2::1, 0:3:1), # negative and frequency ranges for x dimension
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(-4::1, 0:4:1) # negative and frequency ranges for y dimension
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]
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[Here a:b:c is the slice(a,b,c) object in python.]
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All the quadrant combinations will be generated by fft_grid_ranges, which in
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this case is:
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[
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(-2::1, -4::1), # -x, -y
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(0:3:1, -4::1), # +x, -y
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(-2::1, 0:4:1), # -x, +y
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(0:3:1, 0:4:1), # +x, +y
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]
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"""
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fft_grid_ranges1 = lambda Gmin, Gmax, Gstep : \
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[
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(slice(gmin, None, gstep), slice(0, gmax+1, gstep))
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for (gmin, gmax, gstep) in zip(Gmin, Gmax, Gstep)
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]
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fft_grid_ranges = lambda Gmin, Gmax, Gstep : \
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all_combinations(fft_grid_ranges1(Gmin, Gmax, Gstep))
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def fft_r2g(dens):
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"""Do real-to-G space transformation.
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According to our covention, this transformation gets the 1/Vol prefactor."""
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dens_G = numpy.fft.fftn(dens)
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dens_G *= (1.0 / numpy.prod(dens.shape))
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return dens_G
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def fft_g2r(dens):
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"""Do G-to-real space transformation.
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According to our covention, this transformation does NOT get the 1/Vol
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prefactor."""
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dens_G = numpy.fft.ifftn(dens)
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dens_G *= numpy.prod(dens.shape)
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return dens_G
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def refit_grid(dens, gridsize, supercell=None, debug=0, debug_grid=False):
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"""Refit a given density (field) to a new grid size (`gridsize'), optionally
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replicating in each direction by `supercell'.
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This function is useful for refitting/interpolation (by specifying a larger
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grid), low-pass filter (by specifying a smaller grid), and/or replicating
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a given data to construct a supercell.
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The dens argument is the original data on a `ndim'-dimensional FFT grid.
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The gridsize is an ndim-integer tuple defining the size of the new FFT grid.
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The supercell is an ndim-integer tuple defining the multiplicity of the new
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data in each direction; default: (1, 1, ...).
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"""
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from numpy import array, ones, zeros
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from numpy import product, minimum
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#from numpy.fft import fftn, ifftn
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# Input grid
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LL = array(dens.shape)
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ndim = len(LL)
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if supercell == None:
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supercell = ones(1, dtype=int)
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elif ndim != len(supercell):
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raise ValueError, "Incorrect supercell dimension"
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if ndim != len(gridsize):
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raise ValueError, "Incorrect gridsize dimension"
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#Lmin = -(LL // 2)
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#Lmax = Lmin + LL - 1
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#Lstep = ones(LL.shape, dtype=int)
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# Output grid
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supercell = array(supercell)
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KK = array(gridsize)
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# Input grid specification for copying amplitudes:
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# Only this big of the subgrid from the original data will be copied:
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IG_size = minimum(KK // supercell, LL)
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(IG_min, IG_max) = fft_grid_bounds(IG_size)
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IG_step = ones(IG_size.shape, dtype=int)
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IG_ranges = fft_grid_ranges(IG_min, IG_max, IG_step)
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# FIXME: must check where the boundary of the nonzero G components and
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# warn user if we remove high frequency components
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# Output grid specification for copying amplitudes:
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# - grid stepping is identical to supercell multiplicity in each dimension
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# - the bounds must be commensurate to supercell steps and must the
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# steps must pass through (0,0,0)
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OG_min = IG_min * supercell
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OG_max = IG_max * supercell
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OG_step = supercell
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OG_ranges = fft_grid_ranges(OG_min, OG_max, OG_step)
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# Now form the density in G space, and copy the amplitudes to the new
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# grid (still in G space)
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if debug_grid:
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global dens_G
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global newdens_G
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dens_G = fft_r2g(dens)
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newdens_G = zeros(gridsize, dtype=dens_G.dtype)
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for (in_range, out_range) in zip(IG_ranges, OG_ranges):
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# Copies the data to the new grid, in `quadrant-by-quadrant' manner:
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if debug >= 1:
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print "G[%s] = oldG[%s]" % (slice_str(out_range), slice_str(in_range))
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if debug >= 10:
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print dens_G[in_range]
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newdens_G[out_range] = dens_G[in_range]
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# Special case: if input size is even and the output grid is larger,
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# we will have to split the center bin (i.e. the highest frequency)
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# because it stands for both the exp(-i phi_max) and exp(+i phi_max)
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# (Nyquist) terms.
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# See: http://www.elisanet.fi/~d635415/webroot/MatlabOctaveBlocks/mn_FFT_interpolation.m
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select_slice = lambda X, dim : \
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tuple([ slice(None) ] * dim + [ X ] + [ slice(None) ] * (ndim-dim-1))
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for dim in xrange(ndim):
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if IG_size[dim] % 2 == 0 \
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and KK[dim] > IG_size[dim] * supercell[dim]:
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Ny_ipos = select_slice(OG_max[dim]+1, dim)
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Ny_ineg = select_slice(OG_min[dim], dim)
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if debug > 1:
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print "dim", dim, ": insize=", IG_size[dim], ", outsize=", KK[dim]
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print "ipos = ", Ny_ipos
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print "ineg = ", Ny_ineg
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if debug > 10:
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print "orig dens value @ +Nyquist freq:\n"
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print newdens_G[Ny_ipos]
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newdens_G[Ny_ipos] += newdens_G[Ny_ineg] * 0.5
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newdens_G[Ny_ineg] *= 0.5
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return fft_g2r(newdens_G)
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