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Main Author: Wang, Xinxuan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2506.16566
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author Wang, Xinxuan
author_facet Wang, Xinxuan
contents A sequence of representations \(V_n\) of the symmetric group \(S_n\) is called representation (multiplicity) stable if, after some \(n\), the irreducible decomposition of \(V_n\) stabilizes. In particular, Church, Ellenburg and Farb (2015) showed that for fixed \(a\) and \(b\), the space of diagonal harmonics \(DH_n^{a,b}\) exhibits this behavior, with its dimension eventually stabilizing to a polynomial in \(n\). Building on this result, we use the Schedules Formula by Haglund and Loehr (2005) to obtain an explicit combinatorial polynomial for the dimension of the bigraded spaces \(DH_n^{a,b}\). This derivation not only yields the dimension formula but also produces a new sharp stability bound of \(a + b\), and determines the exact degree of the dimension polynomial, which is also \(a + b\).
format Preprint
id arxiv_https___arxiv_org_abs_2506_16566
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Polynomiality of Subdimensions of Diagonal Harmonics and a Sharp Stability Bound
Wang, Xinxuan
Combinatorics
A sequence of representations \(V_n\) of the symmetric group \(S_n\) is called representation (multiplicity) stable if, after some \(n\), the irreducible decomposition of \(V_n\) stabilizes. In particular, Church, Ellenburg and Farb (2015) showed that for fixed \(a\) and \(b\), the space of diagonal harmonics \(DH_n^{a,b}\) exhibits this behavior, with its dimension eventually stabilizing to a polynomial in \(n\). Building on this result, we use the Schedules Formula by Haglund and Loehr (2005) to obtain an explicit combinatorial polynomial for the dimension of the bigraded spaces \(DH_n^{a,b}\). This derivation not only yields the dimension formula but also produces a new sharp stability bound of \(a + b\), and determines the exact degree of the dimension polynomial, which is also \(a + b\).
title Polynomiality of Subdimensions of Diagonal Harmonics and a Sharp Stability Bound
topic Combinatorics
url https://arxiv.org/abs/2506.16566