fft

Compute the discrete fourier transform of a real signal using the fft or the dft algorithm.

Usage 1

fft(n)

Usage 2

fft(x)

x: signal vector or matrix; if x is a matrix a spectrum of each column is computed

Result 2: A matrix y with ncol(x) columns and L+2 rows, where each column y[*,j] contains the complex spectrum of the column (channel) x[*,j]. The transformation length L is set to npow2(nrow(x)).

Usage 3

fft(x, n {, ytype, poffset, prange, aref})

x

signal vector or matrix; if x is a matrix a spectrum of each column is computed

n

desired length of analysis window;

If n < nrow(x), the analysis window length L is set to nrow(x), otherwise L is set to n.
If the analysis window length L is a power of 2 (L=2^M), the fft algorithm is used, otherwise the dft is used.
If L is greater than nrow(x), zero padding is applied to the signal.

ytype: select the type and format of the computed spectrum (default=0) → see Result 3
poffset: offset in samples to the signal begin or the selected zero phase position (default=0)

poffset=0	→ `phase[i] = atan2(im[i], re[i])`
otherwise	→ `phase[i] = (atan2(im[i], re[i]) - 2pii/L * poffset) % (2 * pi)`

prange=0	→ `0 ≤ phase[i] < 2*pi`
otherwise	→ `-pi ≤ phase[i] < pi`

aref: reference amplitude if the log. spectrum (ytype=4) is requested (default=1)

Result 3: A matrix y with ncol(x) columns, where each column y[*,j] contains the spectrum of the column (channel) x[*,j]. The type and the length of the spectra is selected by the argument ytype.

ytype	description	content of y[*,j]	nrow(y)
0	complex spectrum in cartesian format	`{ re₀, im₀, re₁, im₁, ... }`	L+2
1	complex spectrum in polar format	`{ amp₀, phase₀, amp₁, phase₁, ... } with: amp_i=sqrt(re_i² + im_i²), phase_i see poffset`	L+2
2	amplitude spectrum	`{ amp₀, amp₁, ... }`	L+1
3	power spectrum	`{ amp₀², amp₁², ... }`	L+1
4	logarithmic amplitude spectrum	`{ lev₀, lev₁, ... } with: lev_i=20*log₁₀(amp_i/aref)`	L+1

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