PARITY RESULTS FOR PARTITIONS WHEREIN EACH PART APPEARS AN ODD NUMBER OF TIMES

MICHAEL D. HIRSCHHORN; JAMES A. SELLERS

doi:10.1017/S0004972718001041

PARITY RESULTS FOR PARTITIONS WHEREIN EACH PART APPEARS AN ODD NUMBER OF TIMES

Part of: Additive number theory; partitions Combinatorics

Published online by Cambridge University Press: 12 November 2018

MICHAEL D. HIRSCHHORN and

JAMES A. SELLERS

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MICHAEL D. HIRSCHHORN: Affiliation:
School of Mathematics and Statistics, UNSW, Sydney 2052, Australia email m.hirschhorn@unsw.edu.au
JAMES A. SELLERS*: Affiliation:
Department of Mathematics, Penn State University, University Park, PA 16802, USA email sellersj@psu.edu
*: ✉sellersj@psu.edu

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Abstract

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We consider the function $f(n)$ that enumerates partitions of weight $n$ wherein each part appears an odd number of times. Chern [‘Unlimited parity alternating partitions’, Quaest. Math. (to appear)] noted that such partitions can be placed in one-to-one correspondence with the partitions of $n$ which he calls unlimited parity alternating partitions with smallest part odd. Our goal is to study the parity of $f(n)$ in detail. In particular, we prove a characterisation of $f(2n)$ modulo 2 which implies that there are infinitely many Ramanujan-like congruences modulo 2 satisfied by the function $f.$ The proof techniques are elementary and involve classical generating function dissection tools.