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

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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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