Bounds on the mod 2 homology of random 2-dimensional determinantal hypertrees
Abstract
As a first step towards a conjecture of Kahle and Newman, we prove that if Tn is a random 2-dimensional determinantal hypertree on n vertices, then \[ H1(Tn,F2)n2\] converges to zero in probability. Confirming a conjecture of Linial and Peled, we also prove the analogous statement for the 1-out 2-complex. Our proof relies on the large deviation principle for the Erdos-R\'enyi random graph by Chatterjee and Varadhan.
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