Multi-linear forms, graphs, and Lp-improving measures in Fqd

Abstract

The purpose of this paper is to introduce and study the following graph theoretic paradigm. Let TKf(x)=∫ K(x,y) f(y) dμ(y), where f: X R, X a set, finite or infinite, and K and μ denote a suitable kernel and a measure, respectively. Given a connected ordered graph G on n vertices, consider the multi-linear form G(f1,f2, …, fn)=∫x1, …, xn ∈ X \ Π(i,j) ∈ E(G) K(xi,xj) Πl=1n fl(xl) dμ(xl), where E(G) is the edge set of G. Define G(p1, …, pn) as the smallest constant C>0 such that the inequality G(f1, …, fn) ≤ C Πi=1n ||fi||Lpi(X, μ) holds for all non-negative real-valued functions fi, 1 i n, on X. The basic question is, how does the structure of G and the mapping properties of the operator TK influence the sharp exponents. In this paper, this question is investigated mainly in the case X= Fqd, the d-dimensional vector space over the field with q elements, and K(xi,xj) is the indicator function of the sphere evaluated at xi-xj. This provides a connection with the study of Lp-improving measures and distance set problems.