arXiv:2307.06603 Abstract | arXiv Analytics

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Representations of the rational Cherednik algebra $H_{t,c}(S_3,\h)$ in positive characteristic

Published 2023-07-13Version 1

We study the rational Cherednik algebra $H_{t,c}(S_3,\h)$ of type $A_2$ in positive characteristic $p$, and its irreducible category $\mathcal{O}$ representations $L_{t,c}(\tau)$. For every possible value of $p,t,c$, and $\tau$ we calculate the Hilbert polynomial and the character of $L_{t,c}(\tau)$, and give explicit generators of the maximal proper graded submodule of the Verma module.

Categories: math.RT

Keywords: rational cherednik algebra, positive characteristic, representations, maximal proper graded submodule, hilbert polynomial

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