Proof of Singh and Barman's conjecture on hook length biases

Abstract

Let bt,i(n) denote the total number of i-hooks in t-regular partitions of n. Singh and Barman conjectured that bt+1,2(n) ≥ bt,2(n) holds for all t 3 and n 0. This conjecture was known to hold for t=3 due to work of Barman Mahanta and Singh. In this paper, we prove this conjecture.

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