# Fourier integral/ Fourier transformation of an oscillatory function with FFT

`f(x) = cos(x^2)` and `g(k) = pi^0.5 cos((pi*k)^2 - pi/4)` are a Fourier pair.

I want to reproduce `g(k)` by Fourier integrating `f(x)` using FFT, i.e.

approximating `Integrate[ f(x) * exp(2 pi * ikx), {x, -inf, inf} ]`

with `Sum[ fn * exp(2 pi * ik x_n), {n, 0, N-1} ] * Delta_x`

However the result agrees with `g(k)` only on very small `k` ranges if it agrees at all (the same code works well for smooth Fourier pairs e.g. the Gaussian functions). I guess the problem is choosing appropriate values for `N` and `Delta_x`. Are there any established rules for how to choose them? Where can I find related topics in literature (I've read Numerical Recipe section 13.9 but it does not seem to solve my problem)?

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Interesting, but you want one of the math-focused Stack Exchange sites. math.stackexchange.com (for people studying mathematics at any level and professionals in related fields) or mathoverflow.com (research level math questions) –  Michael Petrotta May 9 '12 at 15:53
Thanks! I'll try that. –  user1342516 May 9 '12 at 16:17