The 2-torsion of determinantal hypertrees is not Cohen-Lenstra
Abstract
Let Tn be a 2-dimensional determinantal hypertree on n vertices. Kahle and Newman conjectured that the p-torsion of H1(Tn,Z) asymptotically follows the Cohen-Lenstra distribution. For p=2, we disprove this conjecture by showing that given a positive integer h, for all large enough n, we have \[P( H1(Tn,F2) h) e-200h(100h)5h.\] We also show that Tn is a bad cosystolic expander with positive probability.
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