Programmer Guide/Command Reference/EVAL/ifft: Difference between revisions
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:;<var>prange</var>: selects the range of phase values stored in ''x'' (default=0) | :;<var>prange</var>: selects the range of phase values stored in ''x'' (default=0) | ||
:::{|class="keinrahmen" | :::{|class="keinrahmen" | ||
|''prange''='''0'' ||-> <code>0 <= phase[i] < 2*pi</code> | |''prange''='''0''' ||-> <code>0 <= phase[i] < 2*pi</code> | ||
|- | |- | ||
|otherwise ||-> <code>-pi <= phase[i] < pi</code> | |otherwise ||-> <code>-pi <= phase[i] < pi</code> |
Revision as of 12:30, 12 April 2011
Compute the inverse discrete fourier transform of a (conj. sym.) complex spectrum using the inverse fft or dft algorithm.
- Usage
ifft(x, {, xtype, poffset, prange})
- x
- complex spectrum vector or matrix; if x is a matrix an inverse transform is computed for each column
- The spectra stored in x must be the 1st half of conj. sym. spectra, because a
complex->real
version of the inverse transformation is used and the results are real numbered signals. - Each spectrum consists of
N=nrow(x)/2
complex values. The transformation length is set toL=2*(N-1)
- If the transformation length
L
is a power of 2 (L=2^M
), the inverse fft algorithm is used, otherwise the inverse dft is used.
- The spectra stored in x must be the 1st half of conj. sym. spectra, because a
- xtype
- select the complex number format of x (default=0)
xtype=0 -> cartesian { re, im, .. }
otherwise -> polar { amp, phase, .. }
- poffset
- offset in samples to the signal begin or the selected zero phase position (default=0); If this value is not equal 0, the phase values stored in x are locked (see fft) and must be transformed to normal phase values before the inverse ft-transform is performed.
- prange
- selects the range of phase values stored in x (default=0)
prange=0 -> 0 <= phase[i] < 2*pi
otherwise -> -pi <= phase[i] < pi
- The arguments poffset and prange are ignored if xtype equals 0 (x in cartesian format).