On the hook length biases of the 2- and 3-regular partitions

Abstract

Let bt,i(n) denote the total number of the i hooks in the t-regular partitions of n. Singh and Barman (J. Number Theory 264 (2024), 41--58) raised two conjectures on bt,i(n). The first conjecture is on the positivity of b3,2(n)-b3,1(n) for n 28. The second conjecture states that when k 3, b2,k(n) b2,k+1(n) for all n except for n= k+1. In this paper, we confirm the first conjecture. Moreover, we show that for any odd k 3, the second conjecture fails for infinitely many n. Furthermore, we verify that the second conjecture holds for k=4 and 6. We also propose a conjecture on the even case k, which is a modification of Singh and Barman's second conjecture.