The Cohen--Lenstra moments over function fields via the stable homology of non-splitting Hurwitz spaces

Abstract

We compute the average number of surjections from class groups of quadratic function fields over Fq(t) onto finite odd order groups H, once q is sufficiently large. These yield the first known moments of these class groups, as predicted by the Cohen--Lenstra heuristics, apart from the case H = Z/3 Z. The key input to this result is a topological one, where we compute the stable rational homology groups of Hurwitz spaces associated to non-splitting conjugacy classes.

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