Entropy of Cohen-Lenstra measures: the u-aspect
Abstract
Let H(u CL) be the entropy of the Cohen-Lenstra measure on finite abelian p-groups associated to an integral unit-rank 0 u ∈ N. In this note, we show that 0 < H(u CL) < ∞ for all u, H(u CL) is a strictly decreasing function of u 0, and H(u CL) u ∞ 0. In particular, this shows that the groupoid measure is an entropy maximizer in the class of Cohen-Lenstra measures of varying integral unit-rank on finite abelian p-groups.
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