When a fourier series has only finitely many terms, $f(x) := \sum_{n=-N}^N f_n e^{inx}$, then it is obvious that $f$ is smooth and periodic. Is the converse true aswell?
If we have a smooth periodic function, can we then conclude that the fourier series has finitely many terms?
There is a corollary that for a $2 \pi$-periodic function $f\in C^k(\mathbb{R}/2\pi)$ the fourier coefficients $f_n$ we have $|n|^k|f_n| \rightarrow 0$ as $k \rightarrow \infty$ but i am not sure how that helps and i can not think of any counter example.