Popular differences for right isosceles triangles
Abstract
For a subset A of \1,2,…,N\2 of size α N2 we show existence of (m,n)≠(0,0) such that the set A contains at least (α3 - o(1))N2 triples of points of the form (a,b), (a+m,b+n), (a-n,b+m). This answers a question by Ackelsberg, Bergelson, and Best from arXiv:2101.02811. The same approach also establishes the corresponding result for compact abelian groups. Furthermore, for a finite field Fq we comment on exponential smallness of subsets of (Fqn)2 that avoid the aforementioned configuration. The proofs are minor modifications of the existing proofs regarding three-term arithmetic progressions.
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