The cokernel of a polynomial push-forward of a random integral matrix with concentrated residue
Abstract
We prove new statistical results about the distribution of the cokernel of a random integral matrix with a concentrated residue. Given a prime p and a positive integer n, consider a random n × n matrix Xn over the ring Zp of p-adic integers whose entries are independent. Previously, Wood showed that regardless of the distribution of Xn, as long as each entry of Xn is not too concentrated on a single residue modulo p, the distribution of the cokernel cok(Xn) of Xn, up to isomorphism, weakly converges to the Cohen--Lenstra distribution, as n → ∞. In this paper, we consider the case when Xn has a concentrated residue An so that Xn = An + pBn, where Bn is a random n × n matrix over Zp. We show that for every fixed n and a non-constant monic polynomial P(t) ∈ Zp[t], we can explicitly compute the distribution of cok(P(Xn)) when Bn is a Haar-random matrix. Using this, we also show that for specific choices of An a much wider class of random matrices Bn gives the same distribution of cok(P(Xn)). For the Haar-random Bn, we deduce our result from an interesting equidistribution result for matrices over Zp[t]/(P(t)), which we prove by establishing a version of the Weierstrass preparation theorem for the noncommutative ring Mn(Zp) of n × n matrices over Zp.
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