English

Kronecker Coefficients For Some Near-Rectangular Partitions

Combinatorics 2014-03-24 v1

Abstract

We give formulae for computing Kronecker coefficients occurring in the expansion of sμsνs_{\mu}*s_{\nu}, where both μ\mu and ν\nu are nearly rectangular, and have smallest parts equal to either 1 or 2. In particular, we study s(n,n1,1)s(n,n)s_{(n,n-1,1)}*s_{(n,n)}, s(n1,n1,1)s(n,n1)s_{(n-1,n-1,1)}*s_{(n,n-1)}, s(n1,n1,2)s(n,n)s_{(n-1,n-1,2)}*s_{(n,n)}, s(n1,n1,1,1)s(n,n)s_{(n-1,n-1,1,1)}*s_{(n,n)} and s(n,n,1)s(n,n,1)s_{(n,n,1)}*s_{(n,n,1)}. Our approach relies on the interplay between manipulation of symmetric functions and the representation theory of the symmetric group, mainly employing the Pieri rule and a useful identity of Littlewood. As a consequence of these formulae, we also derive an expression enumerating certain standard Young tableaux of bounded height, in terms of the Motzkin and Catalan numbers.

Keywords

Cite

@article{arxiv.1403.5327,
  title  = {Kronecker Coefficients For Some Near-Rectangular Partitions},
  author = {Vasu V. Tewari},
  journal= {arXiv preprint arXiv:1403.5327},
  year   = {2014}
}
R2 v1 2026-06-22T03:31:16.553Z