Nearly self-conjugate integer partitions

Authors

  • John Campbell York University
  • Shane Chern Dalhousie University,

DOI:

https://doi.org/10.53733/217

Keywords:

Nearly self-conjugate integer partition, symplectic partition, generating function, combinatorial telescoping, partition rank

Abstract

We investigate integer partitions $\lambda$ of $n$ that are nearly self-conjugate in the sense that there are $n - 1$ overlapping cells among the Ferrers diagram of $\lambda$ and its transpose, by establishing a correspondence, through the method of combinatorial telescoping, to partitions of $n$ in which (i).~there exists at least one even part; (ii).~any even part is of size $2$; (iii).~the odd parts are distinct; and (iv).~no odd part is of size $1$. In particular, this correspondence confirms a conjecture that had been given in the OEIS.

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Author Biographies

John Campbell, York University

John M. Campbell
Department of Mathematics and Statistics,
York University,
Toronto, Ontario, M3J 1P3,
Canada
jmaxwellcampbell@gmail.com

Shane Chern, Dalhousie University,

Shane Chern
Department of Mathematics and Statistics,
Dalhousie University,
Halifax, Nova Scotia, B3H 4R2,
Canada
chenxiaohang92@gmail.com

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Published

25-06-2023

How to Cite

Campbell, J., & Chern, S. (2023). Nearly self-conjugate integer partitions. New Zealand Journal of Mathematics, 54, 1–7. https://doi.org/10.53733/217

Issue

Vol. 54 (2023)

Section

Articles