Uniform boundedness of the Fourier partial sum operators on the weighted spaces of local fields

Abstract

Let Sn f be the nth partial sum of the Fourier series of a function f in L1(), where is the ring of integers of a local field K. For 1<p<∞, we characterize all weight functions w so that the partial sum operators Sn, n≥ 0, are uniformly bounded on the weighted space Lp(, w) and that Sn f converges to f in Lp(,w). This includes the case where K is a p-adic number field or a field of formal Laurent series Fq((X)) over a finite field Fq, and in particular, when is the Walsh-Paley or dyadic group 2ω. As an application, in a local field K of positive characteristic, we provide a necessary and sufficient condition on a function ∈ L2(K) for which the collection of translates of forms a Schauder basis for its closed linear span. Moreover, we establish sharp bounds for the Hardy-Littlewood maximal operator.