Bounds for the -torsion in class groups

Abstract

We prove for each integer ≥ 1 an unconditional upper bound for the size of the -torsion subgroup ClK[] of the class group of K, which holds for all but a zero density set of number fields K of degree d∈\4,5\ (with the additional restriction in the case d = 4 that the field be non-D4). For sufficiently large this improves recent results of Ellenberg, Matchett Wood, and Pierce, and is also stronger than the best currently known pointwise bounds under GRH. Conditional on GRH and on a weak conjecture on the distribution of number fields our bounds also hold for arbitrary degrees d.