Ramanujan-type Congruences for Overpartitions Modulo 16
Combinatorics
2014-08-08 v1 Number Theory
Abstract
Let p(n) denote the number of overpartitions of n. Recently, Fortin-Jacob-Mathieu and Hirschhorn-Sellers independently obtained 2-, 3- and 4-dissections of the generating function for p(n) and derived a number of congruences for p(n) modulo 4, 8 and 64 including p(5n+2)≡0(mod4), p(4n+3)≡0(mod8) and p(8n+7)≡0(mod64). By employing dissection techniques, Yao and Xia obtained congruences for p(n) modulo 8,16 and 32, such as p(48n+26)≡0(mod8), p(24n+17)≡0(mod16) and p(72n+69)≡0(mod32). In this paper, we give a 16-dissection of the generating function for p(n) modulo 16 and we show that p(16n+14)≡0(mod16) for n≥0. Moreover, by using the 2-adic expansion of the generating function of p(n) due to Mahlburg, we obtain that p(ℓ2n+rℓ)≡0(mod16), where n≥0, ℓ≡−1(mod8) is an odd prime and r is a positive integer with ℓ∤r. In particular, for ℓ=7, we get p(49n+7)≡0(mod16) and p(49n+14)≡0(mod16) for n≥0. We also find four congruence relations: p(4n)≡(−1)np(n)(mod16) for n≥0, p(4n)≡(−1)np(n)(mod32) for n being not a square of an odd positive integer, p(4n)≡(−1)np(n)(mod64) for n≡1,2,5(mod8) and p(4n)≡(−1)np(n)(mod128) for n≡0(mod4).
Cite
@article{arxiv.1408.1597,
title = {Ramanujan-type Congruences for Overpartitions Modulo 16},
author = {William Y. C. Chen and Qing-Hu Hou and Lisa H. Sun and Li Zhang},
journal= {arXiv preprint arXiv:1408.1597},
year = {2014}
}
Comments
12 pages