Ramanujan-type Congruences for Broken 2-Diamond Partitions Modulo 3

TL;DR

This paper establishes new infinite families of Ramanujan-type congruences modulo 3 for broken 2-diamond partition functions, expanding understanding of their arithmetic properties.

Contribution

It derives two new infinite families of congruences modulo 3 for broken 2-diamond partitions, complementing existing results and using advanced modular form techniques.

Findings

Proves that elta_2(243n+142) nd elta_2(243n+223) are divisible by 3.

Identifies two infinite families of congruences modulo 3 for elta_2(n).

Shows common congruences with previous results by Radu and Sellers.

Abstract

The notion of broken $k$-diamond partitions was introduced by Andrews and Paule. Let $\Delta_k(n)$ denote the number of broken k-diamond partitions of $n$. They also posed three conjectures on the congruences of $\Delta_2(n)$ modulo 2, 5 and 25. Hirschhorn and sellers proved the conjectures for modulo 2, and Chan proved cases of modulo 5. For the case of modulo 3, Radu and Sellers obtained an infinite family of congruences for $\Delta_2(n)$. In this paper, we obtain two infinite families of congruences for $\Delta_2(n)$ modulo 3 based on a formula of Radu and Sellers, the 3-dissection formula of the generating function of triangular number due to Berndt, and the properties of the $U$-operator, the $V$-operator, the Hecke operator and the Hecke eigenform. For example, we find that $\Delta_2(243n+142)\equiv \Delta_2(243n+223)\equiv0\pmod{3}$. The infinite family of Radu and Sellers and the two infinite families derived in this paper have two congruences in common, namely, $\Delta_2(27n+16)\equiv\Delta_2(27n+25)\equiv0 \pmod{3}$.