How does doing a Fourier Transform affect a functions' power series representation?

Asked May 17 '20 at 10:43

Active May 17 '20 at 10:43

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Assume I have some function $t\to f(t)$ that is well behaved enough to have a Fourier Transform $w\to \mathcal F\{f(t)\}(w)$ as well as a power series expansion $$p(t) = \sum_{k\in \mathbb Z^+} c_kt^k$$ that converges everywhere. Furthermore assume that the Fourier Transform also has such a power series expansion. $$p_F(w) = \sum_{k\in \mathbb Z^+} d_kw^k$$

Can I derive some relationship between $\{c_k\}$ and $\{d_k\}$?

asked May 17 '20 at 10:43

mathreadler

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Possibly useful: (Question 7301). – Jam May 17 '20 at 10:49
No it's not the same. This regards the monomial power series in the frequency variable not the trigonometric power series which is the transform itself. – mathreadler May 17 '20 at 15:20

How does doing a Fourier Transform affect a functions' power series representation?

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