Mattila--Sj\"olin type functions: A finite field model

Abstract

Let φ(x, y) Rd× Rd R be a function. We say φ is a Mattila--Sj\"olin type function of index γ if γ is the smallest number satisfying the property that for any compact set E⊂ Rd, φ(E, E) has a non-empty interior whenever H(E)>γ. The usual distance function, φ(x, y)=|x-y|, is conjectured to be a Mattila--Sj\"olin type function of index d2. In the setting of finite fields Fq, this definition is equivalent to the statement that φ(E, E)=Fq whenever |E| qγ. The main purpose of this paper is to prove the existence of such functions with index d2 in the vector space Fqd.