Proofs of some conjectures of Keith and Zanello on t-regular partition

Abstract

For a positive integer t, let bt(n) denote the number of t-regular partitions of a nonnegative integer n. In a recent paper, Keith and Zanello established infinite families of congruences and self-similarity results modulo 2 for bt(n) for certain values of t. Further, they proposed some conjectures on self-similarities of bt(n) modulo 2 for certain values of t. In this paper, we prove their conjectures on b3(n) and b25(n). We also prove a self-similarity result for b21(n) modulo 2.