Rank fluctuations of matrix products and a moment method for growing groups

Abstract

We consider the cokernel Gn = Cok(Ak ·s A2 A1) of a product of independent n × n random integer matrices with iid entries from generic nondegenerate distributions, in the regime where both n and k are sent to ∞ simultaneously. In this regime we show that the cokernel statistics converge universally to the reflecting Poisson sea, an interacting particle system constructed in arXiv:2312.11702, at the level of 1-point marginals. In particular, corank(Ak ·s A2 A1 p) p k, and its fluctuations are O(1) and converge to a discrete random variable defined in arXiv:2310.12275. The main difference with previous works studying cokernels of random matrices is that Gn does not converge to a random finite group; for instance, the p-rank of Gn diverges. This means that the usual moment method for random groups does not apply. Instead, we proceed by proving a `rescaled moment method' theorem applicable to a general sequence of random groups of growing size. This result establishes that fluctuations of p-ranks and other statistics still converge to limit random variables, provided that certain rescaled moments E[\#Hom(Gn,H)]/C(n,H) converge.