Configuration sets with nonempty interior

Abstract

A theorem of Steinhaus states that if E⊂ Rd has positive Lebesgue measure, then the difference set E-E contains a neighborhood of 0. Similarly, if E merely has Hausdorff dimension H(E)>(d+1)/2, a result of Mattila and Sj\"olin states that the distance set (E)⊂ R contains an open interval. In this work, we study such results from a general viewpoint, replacing E-E or (E) with more general \,-configurations for a class of : Rd× Rd Rk, and showing that, under suitable lower bounds on H(E) and a regularity assumption on the family of generalized Radon transforms associated with , it follows that the set (E) of -configurations in E has nonempty interior in Rk. Further extensions hold for \,-configurations generated by two sets, E and F, in spaces of possibly different dimensions and with suitable lower bounds on H(E)+ H(F).