Rademacher–Menchov theorem

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In mathematical analysis, the Rademacher–Menchov theorem, introduced by Template:Harvs and Template:Harvs, gives a sufficient condition for a series of orthogonal functions on an interval to converge almost everywhere.

Statement

If the coefficients c_ν of a series of bounded orthogonal functions on an interval satisfy

\sum | c_{ν} |^{2} \log (ν)^{2} < \infty

then the series converges almost everywhere.

References

Retrieved from "https://en.wiki.beta.math.wmflabs.org/w/index.php?title=Rademacher–Menchov_theorem&oldid=34955"

Theorems in analysis