Minimal Fourier majorants in Lp

Abstract

Denote the coefficients in the complex form of the Fourier series of a function f on the interval [-π, π) by f(n). It is known that if p = 2j/(2j-1) for some integer j>0, then for each function f in Lp there exists another function F in Lp that majorizes f in the sense that F(n) | f(n)| for all n, and for which \|F\|p \|f\|p. When j > 1, the existence proofs for such small majorants do not provide constructions of them, but there is a unique majorant of minimal Lp norm. We modify previous existence proofs to say more about the form of that majorant.

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