On the strict majorant property in arbitrary dimensions

Abstract

In this work we study d-dimensional majorant properties. We prove that a set of frequencies in Zd satisfies the strict majorant property on Lp([0,1]d) for all p> 0 if and only if the set is affinely independent. We further construct three types of violations of the strict majorant property. Any set of at least d+2 frequencies in Zd violates the strict majorant property on Lp([0,1]d) for an open interval of p ∈ 2 N of length 2. Any infinite set of frequencies in Zd violates the strict majorant property on Lp([0,1]d) for an infinite sequence of open intervals of p ∈ 2 N of length 2. Finally, given any p>0 with p ∈ 2 N, we exhibit a set of d+2 frequencies on the moment curve in Rd that violate the strict majorant property on Lp([0,1]d).

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