Pointwise Convergence of Fourier Series on the Ring of Integers of Local Fields with an Application to Gabor Systems

Abstract

We construct a simple example of an integrable function on the ring of integers of the p-adic field p having an almost everywhere divergent Fourier series. On the other hand, we prove the pointwise convergence of the Fourier series of functions in Lp(,w), 1<p<∞, where is the ring of integers of a local field K and w is a weight in the Muckenhoupt Ap class. This result includes, as special cases, when is the ring of integers of p or the field Fq((X)) of formal Laurent series over a finite field Fq, and in particular, when is the Walsh-Paley or dyadic group 2ω. To achieve this, we establish a weighted estimate for the maximal operator corresponding to the Fourier partial sum operators for functions in Lp(,w). As an application, we characterize the Schauder basis property of the Gabor systems in a local field K of positive characteristic in terms of the A2 weights on × and the Zak transform Zg of the window function g that generates the Gabor system. Some examples are given to illustrate this result. In particular, we construct an example of a Gabor system which is complete and minimal, but fails to be a Schauder basis for L2(K).