Ramanujan-type Congruences for Overpartitions Modulo 5
Combinatorics
2014-06-17 v1 Number Theory
Abstract
Let p(n) denote the number of overpartitions of n. Hirschhorn and Sellers showed that p(4n+3)≡0(mod8) for n≥0. They also conjectured that p(40n+35)≡0(mod40) for n≥0. Chen and Xia proved this conjecture by using the (p,k)-parametrization of theta functions given by Alaca, Alaca and Williams. In this paper, we show that p(5n)≡(−1)np(4⋅5n)(mod5) for n≥0 and p(n)≡(−1)np(4n)(mod8) for n≥0 by using the relation of the generating function of p(5n) modulo 5 found by Treneer and the 2-adic expansion of the generating function of p(n) due to Mahlburg. As a consequence, we deduce that p(4k(40n+35))≡0(mod40) for n,k≥0. Furthermore, applying the Hecke operator on ϕ(q)3 and the fact that ϕ(q)3 is a Hecke eigenform, we obtain an infinite family of congrences p(4k⋅5ℓ2n)≡0(mod5), where k≥0 and ℓ is a prime such that ℓ≡3(mod5) and (ℓ−n)=−1. Moreover, we show that p(52n)≡p(54n)(mod5) for n≥0. So we are led to the congruences p(4k52i+3(5n±1))≡0(mod5) for n,k,i≥0. In this way, we obtain various Ramanujan-type congruences for p(n) modulo 5 such as p(45(3n+1))≡0(mod5) and p(125(5n±1))≡0(mod5) for n≥0.
Cite
@article{arxiv.1406.3801,
title = {Ramanujan-type Congruences for Overpartitions Modulo 5},
author = {William Y. C. Chen and Lisa H. Sun and Rong-Hua Wang and Li Zhang},
journal= {arXiv preprint arXiv:1406.3801},
year = {2014}
}
Comments
11 pages