On commuting integer matrices

Abstract

Given d, N ∈ N, we define Cd(N) to be the number of pairs of d× d matrices A,B with entries in [-N,N] Z such that AB = BA. We prove that N10 C3(N) N10, thus confirming a speculation of Browning-Sawin-Wang. We further establish that C2(N) = K(2N+1)5 (1 + o(1)), where K>0 is an explicit constant. Our methods are completely elementary and rely on upper bounds of the correct order for restricted divisor correlations with high uniformity.

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