Joint distribution of the cokernels of random p-adic matrices II

Abstract

In this paper, we study the combinatorial relations between the cokernels cok(An+pxiIn) (1 i m) where An is an n × n matrix over the ring of p-adic integers Zp, In is the n × n identity matrix and x1, ·s, xm are elements of Zp whose reductions modulo p are distinct. For a positive integer m 4 and given x1, ·s, xm ∈ Zp, we determine the set of m-tuples of finitely generated Zp-modules (H1, ·s, Hm) for which (cok(An+px1In), ·s, cok(An+pxmIn)) = (H1, ·s, Hm) for some matrix An. We also prove that if An is an n × n Haar random matrix over Zp for each positive integer n, then the joint distribution of cok(An+pxiIn) (1 i m) converges as n → ∞.