Transition matrices and Pieri-type rules for polysymmetric functions
| Autor: | Khanna, Aditya, Loehr, Nicholas A. |
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| Rok vydání: | 2024 |
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| Druh dokumentu: | Working Paper |
| Popis: | Asvin G and Andrew O'Desky recently introduced the graded algebra P$\Lambda$ of polysymmetric functions as a generalization of the algebra $\Lambda$ of symmetric functions. This article develops combinatorial formulas for some multiplication rules and transition matrix entries for P$\Lambda$ that are analogous to well-known classical formulas for $\Lambda$. In more detail, we consider pure tensor bases $\{s^{\otimes}_{\tau}\}$, $\{p^{\otimes}_{\tau}\}$, and $\{m^{\otimes}_{\tau}\}$ for P$\Lambda$ that arise as tensor products of the classical Schur basis, power-sum basis, and monomial basis for $\Lambda$. We find expansions in these bases of the non-pure bases $\{P_{\delta}\}$, $\{H_{\delta}\}$, $\{E^+_{\delta}\}$, and $\{E_{\delta}\}$ studied by Asvin G and O'Desky. The answers involve tableau-like structures generalizing semistandard tableaux, rim-hook tableaux, and the brick tabloids of E\u{g}ecio\u{g}lu and Remmel. These objects arise by iteration of new Pieri-type rules that give expansions of products such as $s^{\otimes}_{\sigma}H_{\delta}$, $p^{\otimes}_{\sigma}E_{\delta}$, etc. Comment: 30 pages, multiple in-line figures |
| Databáze: | arXiv |
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