Product of simplices and sets of positive upper density in Rd

Abstract

We establish that any subset of Rd of positive upper Banach density necessarily contains an isometric copy of all sufficiently large dilates of any fixed two-dimensional rectangle provided d≥4. We further present an extension of this result to configurations that are the product of two non-degenerate simplices; specifically we show that if k1 and k2 are two fixed non-degenerate simplices of k1+1 and k2+1 points respectively, then any subset of Rd of positive upper Banach density with d≥ k1+k2+6 will necessarily contain an isometric copy of all sufficiently large dilates of k1×k2. A new direct proof of the fact that any subset of Rd of positive upper Banach density necessarily contains an isometric copy of all sufficiently large dilates of any fixed non-degenerate simplex of k+1 points provided d≥ k+1, a result originally due to Bourgain, is also presented.