Trace spectra of simplices in large sets

Abstract

Given an ordered tuple v=(v0,…,vd) of vectors in Rd, let A v=[\,v1-v0\ ·s\ vd-v0\,] be its edge matrix. We prove that, in every finite colouring of Rd, one colour class realizes every prescribed value of the higher characteristic coefficients \[ (c2(A v),…,cd(A v)). \] This extends Graham's theorem on volumes, which corresponds to the last coefficient cd(A v)=(A v). We also prove a discrete analogue: if E⊂eqZd has positive upper Banach density, then, for some q≥ 1, the set of coefficient tuples realized by ordered tuples in E contains \[ q2Z× q3Z×·s× qdZ. \] Finally, we show that the ordinary trace c1(A v) cannot be added to these conclusions. The proof combines a quantitative directional expansion result for ergodic actions of free abelian groups with a trace calculation for a family of model edge matrices.