English

Simultaneous core partitions: parameterizations and sums

Combinatorics 2023-04-21 v4 Number Theory

Abstract

Fix coprime s,t1s,t\ge1. We re-prove, without Ehrhart reciprocity, a conjecture of Armstrong (recently verified by Johnson) that the finitely many simultaneous (s,t)(s,t)-cores have average size 124(s1)(t1)(s+t+1)\frac{1}{24}(s-1)(t-1)(s+t+1), and that the subset of self-conjugate cores has the same average (first shown by Chen--Huang--Wang). We similarly prove a recent conjecture of Fayers that the average weighted by an inverse stabilizer---giving the "expected size of the tt-core of a random ss-core"---is 124(s1)(t21)\frac{1}{24}(s-1)(t^2-1). We also prove Fayers' conjecture that the analogous self-conjugate average is the same if tt is odd, but instead 124(s1)(t2+2)\frac{1}{24}(s-1)(t^2+2) if tt is even. In principle, our explicit methods---or implicit variants thereof---extend to averages of arbitrary powers. The main new observation is that the stabilizers appearing in Fayers' conjectures have simple formulas in Johnson's zz-coordinates parameterization of (s,t)(s,t)-cores. We also observe that the zz-coordinates extend to parameterize general tt-cores. As an example application with t:=s+dt := s+d, we count the number of (s,s+d,s+2d)(s,s+d,s+2d)-cores for coprime s,d1s,d\ge1, verifying a recent conjecture of Amdeberhan and Leven.

Cite

@article{arxiv.1507.04290,
  title  = {Simultaneous core partitions: parameterizations and sums},
  author = {Victor Y. Wang},
  journal= {arXiv preprint arXiv:1507.04290},
  year   = {2023}
}

Comments

v4: updated references to match final EJC version

R2 v1 2026-06-22T10:12:31.137Z