The threshold for integer homology in random d-complexes
arXiv:1308.6232
Abstract
Let Y ~ Y_d(n,p) denote the Bernoulli random d-dimensional simplicial complex. We answer a question of Linial and Meshulam from 2003, showing that the threshold for vanishing of homology H_{d-1}(Y; Z) is less than 80d log n / n. This bound is tight, up to a constant factor.
12 pages, updated to include an additional torsion group bound