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Main Authors: Huh, JiSun, Kim, Jang Soo, Krattenthaler, Christian, Okada, Soichi
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2301.13117
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author Huh, JiSun
Kim, Jang Soo
Krattenthaler, Christian
Okada, Soichi
author_facet Huh, JiSun
Kim, Jang Soo
Krattenthaler, Christian
Okada, Soichi
contents The identities which are in the literature often called ``bounded Littlewood identities" are determinantal formulas for the sum of Schur functions indexed by partitions with bounded height. They have interesting combinatorial consequences such as connections between standard Young tableaux of bounded height, lattice walks in a Weyl chamber, and noncrossing matchings. In this paper we prove affine analogs of the bounded Littlewood identities. These are determinantal formulas for sums of cylindric Schur functions. We also study combinatorial aspects of these identities. As a consequence we obtain an unexpected connection between cylindric standard Young tableaux and \( r \)-noncrossing and \( s \)-nonnesting matchings.
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id arxiv_https___arxiv_org_abs_2301_13117
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Bounded Littlewood identities for cylindric Schur functions
Huh, JiSun
Kim, Jang Soo
Krattenthaler, Christian
Okada, Soichi
Combinatorics
The identities which are in the literature often called ``bounded Littlewood identities" are determinantal formulas for the sum of Schur functions indexed by partitions with bounded height. They have interesting combinatorial consequences such as connections between standard Young tableaux of bounded height, lattice walks in a Weyl chamber, and noncrossing matchings. In this paper we prove affine analogs of the bounded Littlewood identities. These are determinantal formulas for sums of cylindric Schur functions. We also study combinatorial aspects of these identities. As a consequence we obtain an unexpected connection between cylindric standard Young tableaux and \( r \)-noncrossing and \( s \)-nonnesting matchings.
title Bounded Littlewood identities for cylindric Schur functions
topic Combinatorics
url https://arxiv.org/abs/2301.13117