dorsal/arxiv
View SchemaSome Rational Vertex Algebras
| Authors | Drazen Adamovic |
|---|---|
| Categories | |
| ArXiv ID | q-alg/9502015 |
| URL | https://arxiv.org/abs/q-alg/9502015 |
| Journal | Glasnik Matemati\v cki Vol.29(49) (1994), 25-40 |
Abstract
Let $L((n-\tfrac 3 2)\Lambda_0)$, $n \in \Bbb N$, be a vertex operator algebra associated to the irreducible highest weight module $L((n-\tfrac 3 2)\Lambda_0)$ for a symplectic affine Lie algebra. We find a complete set of irreducible modules for $L((n-\tfrac 3 2)\Lambda_0)$ and show that every module for $L((n-\tfrac 3 2)\Lambda_0)$ from the category $\Cal O$ is completely reducible.
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"abstract": "Let $L((n-\\tfrac 3 2)\\Lambda_0)$, $n \\in \\Bbb N$, be a vertex operator\nalgebra associated to the irreducible highest weight module $L((n-\\tfrac 3\n2)\\Lambda_0)$ for a symplectic affine Lie algebra. We find a complete set of\nirreducible modules for $L((n-\\tfrac 3 2)\\Lambda_0)$ and show that every module\nfor $L((n-\\tfrac 3 2)\\Lambda_0)$ from the category $\\Cal O$ is completely\nreducible.",
"arxiv_id": "q-alg/9502015",
"authors": [
"Drazen Adamovic"
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"journal_ref": "Glasnik Matemati\\v cki Vol.29(49) (1994), 25-40",
"title": "Some Rational Vertex Algebras",
"url": "https://arxiv.org/abs/q-alg/9502015"
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