Infinite families of congruences for 2 and 13-core partitions

Abstract

A partition of n is called a t-core partition if none of its hook number is divisible by t. In 2019, Hirschhorn and Sellers Hirs2019 obtained a parity result for 3-core partition function a3(n). Motivated by this result, both the authors MeherJindal2022 recently proved that for a non-negative integer α, a3α m(n) is almost always divisible by arbitrary power of 2 and 3 and at(n) is almost always divisible by arbitrary power of pij, where j is a fixed positive integer and t= p1a1p2a2… pmam with primes pi ≥ 5. In this article, by using Hecke eigenform theory, we obtain infinite families of congruences and multiplicative identities for a2(n) and a13(n) modulo 2 which generalizes some results of Das Das2016.