dorsal/arxiv
View SchemaVector bundles on elliptic curve and Sklyanin algebras
| Authors | B. L. Feigin, A. V. Odesskii |
|---|---|
| Categories | |
| ArXiv ID | q-alg/9509021 |
| URL | https://arxiv.org/abs/q-alg/9509021 |
Abstract
In [4] we introduce the associative algebras $Q_{n,k}(\CE,\tau)$. Recall the definition. These algebras are labeled by discrete parameters $n,k$; $n,k$ are integers $n>k>0$ and $n$ and $k$ have not common divisors. Then, $\CE$ is an elliptic curve and $\tau$ is a point in $\CE$. We identify $\CE$ with $\BC/\Gamma$, where $\Gamma$ is a lattice.
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"abstract": "In [4] we introduce the associative algebras $Q_{n,k}(\\CE,\\tau)$. Recall the\ndefinition. These algebras are labeled by discrete parameters $n,k$; $n,k$ are\nintegers $n\u003ek\u003e0$ and $n$ and $k$ have not common divisors. Then, $\\CE$ is an\nelliptic curve and $\\tau$ is a point in $\\CE$. We identify $\\CE$ with\n$\\BC/\\Gamma$, where $\\Gamma$ is a lattice.",
"arxiv_id": "q-alg/9509021",
"authors": [
"B. L. Feigin",
"A. V. Odesskii"
],
"categories": [
"q-alg",
"math.QA"
],
"title": "Vector bundles on elliptic curve and Sklyanin algebras",
"url": "https://arxiv.org/abs/q-alg/9509021"
},
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