Distribution of the k-regular partition function modulo composite integers M

Abstract

Let bk(n) denote the k-regular partitons of a natural number n. In this paper, we study the behavior of bk(n) modulo composite integers M which are coprime to 6. Specially, we prove that for arbitrary k-regular partiton function bk(n) and integer M coprime to 6, there are infinitely many Ramanujan-type congruences of bk(n) modulo M.

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