Arithmetic density and congruences of -regular bipartitions II

Abstract

Let B(n) denote the number of -regular bipartitions of n. In 2013, Lin Lin2013 proved a density result for B4(n). He showed that for any positive integer k, B4(n) is almost always divisible by 2k. In this article, we improved his result. We prove that B2αm(n) and B3αm(n) are almost always divisible by arbitrary power of 2 and 3 respectively. Further, we obtain an infinities families of congruences and multiplicative formulae for B2(n) and B4(n) by using Hecke eigenform theory. Next, by using a result of Ono and Taguchi on nilpotency of Hecke operator, we also find an infinite families of congruences modulo arbitrary power of 2 satisfied by B2α(n).