Additive and multiplicative Gower's Ramsey theorem

Abstract

W. T. Gower generalized Hindman's Finite sum theorem over Xk=\ (n1,n2,…,nk):n1≠0\ by showing that for any finite coloring of Xk there exists a sequence such that the Gower subspace generated by that sequence is monochromatic. For k=1, this immediately gives the finite sum theorem. In this article we will show that for any finite coloring of Xk there exist two sequences \ ni:i∈ I\ and \ mi:i∈ I\ such that the Gower subspace generated by \ ni:i∈ I\ and set of all finite products of \ mi:i∈ I\ are in a single color. This immediately generalize a result of V. Bergelson and N. Hindman which says that for any finite coloring of N, there exist two sequences (xn)n and (yn)n such that the finite sum and product generated by (xn)n and (yn)n are in a same color.