Perturbations of Weyl sums

Abstract

Write fk( α;X)=Σx Xe(α1x+… +αkxk) (k 3). We show that there is a set B⊂eq [0,1)k-2 of full measure with the property that whenever (α2,… ,αk-1)∈ B and X is sufficiently large, then (α1,αk)∈ [0,1)2|fk( α;X)| X1/2+4/(2k-1). For k 5, this improves on work of Flaminio and Forni, in which a Diophantine condition is imposed on αk, and the exponent of X is 1-2/(3k(k-1)).