Let $ f $ be a function on $ \mathbb{T}=[0,1] $ ($ 1 $-periodic) with bounded variation. Prove that if $ \widehat{f}(k)=\int_0^1f(x)e^{-2\pi ikx}dx=o(1/|k|) $, then $ f\in C(\mathbb{T}) $. I do not know how to use the assumption that $ f $ is of bounded variation. Can you give me some hints?
2026-04-22 11:39:02.1776857942
The decay of Fourier coefficients and the continuity of functions.
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