An Approximate Counting Version of the Multidimensional Szemer\'edi Theorem

Abstract

For any fixed d≥1 and subset X of Nd, let rX(n) be the maximum cardinality of a subset A of \1,…,n\d which does not contain a subset of the form b + rX for r>0 and b ∈ Rd. Such a set A is said to be X-free. The Multidimensional Szemer\'edi Theorem of Furstenberg and Katznelson states that rX(n)=o(nd). We show that, for |X|≥ 3 and infinitely many n∈N, the number of X-free subsets of \1,…,n\d is at most 2O(rX(n)). The proof involves using a known multidimensional extension of Behrend's construction to obtain a supersaturation theorem for copies of X in dense subsets of [n]d for infinitely many values of n and then applying the powerful hypergraph container lemma. Our result generalizes work of Balogh, Liu, and Sharifzadeh on k-AP-free sets and Kim on corner-free sets.

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