Distribution of the cokernels of determinantal row-sparse matrices
Abstract
We study the distribution of the cokernels of random row-sparse integral matrices An according to the determinantal measure from a structured matrix Bn with a parameter kn 3. Under a mild assumption on the growth rate of kn, we prove that the distribution of the p-Sylow subgroup of the cokernel of An converges to that of Cohen--Lenstra for every prime p. Our result extends the work of A. M\'esz\'aros which established convergence to the Cohen--Lenstra distribution when p 5 and kn=3 for all positive integers n.
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