Bender-Knuth Involutions for Types B and C

Álvaro Gutiérrez

doi:10.37236/12571

Bender-Knuth Involutions for Types B and C

Álvaro Gutiérrez

Abstract

We show that the combinatorial definitions of King and Sundaram of the symmetric polynomials of types B and C are indeed symmetric, in the sense that they are invariant by the action of the Weyl groups. Our proof is combinatorial and inspired by Bender and Knuth's classic involutions for type A.

Published

2024-06-28

How to Cite

Gutiérrez, Álvaro. (2024). Bender-Knuth Involutions for Types B and C. The Electronic Journal of Combinatorics, 31(2), P2.59. https://doi.org/10.37236/12571

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Issue

Volume 31, Issue 2 (2024)

Article Number

P2.59