On the biases and asymptotics of partitions with finite choices of parts

Abstract

Biases in integer partitions have been studied recently. For three disjoint subsets R,S,I of positive integers, let pRSI(n) be the number of partitions of n with parts from R S I and pR>S,I(n) be the number of such partitions with more parts from R than that from S. In this paper, in the case that R,S,I are finite we obtain a concrete formula of the asymptotic ratio of pR>S,I(n) to pRSI(n). We also propose a conjecture in the case that R,S are certain infinite arithmetic progressions.

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