Cohen-Lenstra flag universality for random matrix products

Abstract

For n × n random integer matrices M1,…,Mk, the cokernels of the partial products cok(M1 ·s Mi), 1 ≤ i ≤ k naturally define a random flag of abelian p-groups. We prove that as n ∞, this flag converges universally, for any nondegenerate entry distribution, to the Cohen-Lenstra type measure which weights each flag inversely proportional to the size of its automorphism group. As a corollary, we prove universality of certain formulas for the limiting conditional distribution of cok(M1M2) given cok(M1),cok(M2) in terms of Hall-Littlewood structure constants, which were previously obtained only for Haar matrices over Zp. Our proofs combine the general technology of Sawin-Wood, matrix product moment computations following those of Nguyen-Van Peski, and the computation done previously for Haar p-adic matrices by Huang.