A density version of the Carlson--Simpson theorem

Abstract

We prove a density version of the Carlson--Simpson Theorem. Specifically we show the following. For every integer k≥ 2 and every set A of words over k satisfying \[n∞ |A [k]n|kn>0\] there exist a word c over k and a sequence (wn) of left variable words over k such that the set \[\c\ \cw0(a0)...wn(an) : n∈N \ and \ a0,...,an∈ [k]\\] is contained in A. While the result is infinite-dimensional its proof is based on an appropriate finite and quantitative version, also obtained in the paper.