Dini criterion

Not to be confused with Dini–Lipschitz criterion.

In mathematics, Dini's criterion is a condition for the pointwise convergence of Fourier series, introduced by Dini (1880).

Statement

Dini's criterion states that if a periodic function $f$ has the property that $(f (t) + f (- t))/ t$ is locally integrable near $0$ , then the Fourier series of $f$ converges to 0 at $t$ = $0$ .

Dini's criterion is in some sense as strong as possible: if $g (t)$ is a positive continuous function such that $g (t)/ t$ is not locally integrable near $0$ , there is a continuous function $f$ with | $f (t)$ | ≤ $g (t)$ whose Fourier series does not converge at $0$ .

References

Dini, Ulisse (1880), Serie di Fourier e altre rappresentazioni analitiche delle funzioni di una variabile reale, Pisa: Nistri, ISBN 978-1429704083
Golubov, B. I. (2001), "Dini criterion", in Hazewinkel, Michiel, Encyclopedia of Mathematics, Springer, ISBN 978-1-55608-010-4

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