English

Character polynomials for two rows and hook partitions

Combinatorics 2018-12-27 v1

Abstract

Representation theory of the symmetric group Sn\mathfrak{S}_n has a very distinctive combinatorial flavor. The conjugacy classes as well as the irreducible characters are indexed by integer partitions λn\lambda \vdash n. We introduce class functions on Sn\mathfrak{S}_n that count the number of certain tilings of Young diagrams. The counting interpretation gives a uniform expression of these class functions in the ring of character polynomials, as defined by \cite{murnaghanfirst}. A modern treatment of character polynomials is given in \cite{orellana-zabrocki}. We prove a relation between these combinatorial class functions in the (virtual) character ring. From this relation, we were able to prove Goupil's generating function identity \cite{goupil}, which can then be used to derive Rosas' formula \cite{rosas} for Kronecker coefficients of hook shape partitions and two row partitions.

Keywords

Cite

@article{arxiv.1812.09377,
  title  = {Character polynomials for two rows and hook partitions},
  author = {Ahmed Umer Ashraf},
  journal= {arXiv preprint arXiv:1812.09377},
  year   = {2018}
}
R2 v1 2026-06-23T06:54:09.650Z