On hook length biases in t-regular partitions

Abstract

Let t≥2 and k≥1 be integers. A t-regular partition of a positive integer n is a partition of n such that none of its parts is divisible by t. Let bt,k(n) denote the number of hooks of length k in all the t-regular partitions of n. Recently, the first and the third authors proved that b3,2(n)≥ b2,2(n) for all n≥ 4, and conjectured that bt+1,2(n)≥ bt,2(n) for all t≥ 3 and n≥ 0. In this paper, we prove that the conjecture is true for t=3.

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