Distribution of cokernels of (n+u) × n matrices over Zp
Abstract
Let n, u ≥ 0, M be a (n+u) × n matrices over Zp, and G be a finite abelian p-group group. We find that the probability that the cokernel of M is isomorphic to Zpu G as n goes to infinity is exactly what is expected from Cohen-Lenstra heuristics for the classical case when u is negative.
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