Arithmetic properties of cubic and overcubic partition pairs

Abstract

Let b(n) denote the number of cubic partition pairs of n. We give affirmative answer to a conjecture of Lin, namely, we prove that b(49n+37) 0 49. We also prove two congruences modulo 256 satisfied by b(n), the number of overcubic partition pairs of n. Let a(n) denote the number of overcubic partition of n. For a fixed positive integer k, we further show that b(n) and a(n) are divisible by 2k for almost all n. We use arithmetic properties of modular forms to prove our results.