ELEMENTARY PROOFS OF PARITY RESULTS FOR 5-REGULAR PARTITIONS

MICHAEL D. HIRSCHHORN; JAMES A. SELLERS

doi:10.1017/S0004972709000525

Abstract

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In a recent paper, Calkin et al. [N. Calkin, N. Drake, K. James, S. Law, P. Lee, D. Penniston and J. Radder, ‘Divisibility properties of the 5-regular and 13-regular partition functions’, Integers8 (2008), #A60] used the theory of modular forms to examine 5-regular partitions modulo 2 and 13-regular partitions modulo 2 and 3; they obtained and conjectured various results. In this note, we use nothing more than Jacobi’s triple product identity to obtain results for 5-regular partitions that are stronger than those obtained by Calkin and his collaborators. We find infinitely many Ramanujan-type congruences for b5(n), and we prove the striking result that the number of 5-regular partitions of the number n is even for at least 75% of the positive integers n.

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ELEMENTARY PROOFS OF PARITY RESULTS FOR 5-REGULAR PARTITIONS

Abstract

Keywords

MSC classification

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

ELEMENTARY PROOFS OF PARITY RESULTS FOR 5-REGULAR PARTITIONS

Abstract

Keywords

MSC classification

References

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