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This article is cited in 2 scientific papers (total in 2 papers)
Tilting Modules in Truncated Categories
Matthew Bennetta, Angelo Bianchib a Department of Mathematics, State University of Campinas, Brazil
b Institute of Science and Technology, Federal University of São Paulo, Brazil
Abstract:
We begin the study of a tilting theory in certain truncated categories of modules $\mathcal G(\Gamma)$ for the current Lie algebra associated to a finite-dimensional complex simple Lie algebra, where $\Gamma = P^+ \times J$, $J$ is an interval in $\mathbb Z$, and $P^+$ is the set of dominant integral weights of the simple Lie algebra. We use this to put a tilting theory on the category $\mathcal G(\Gamma')$ where $\Gamma' = P' \times J$, where $P'\subseteq P^+$ is saturated. Under certain natural conditions on $\Gamma'$, we note that $\mathcal G(\Gamma')$ admits full tilting modules.
Keywords:
current algebra; tilting module; Serre subcategory.
Received: September 5, 2013; in final form March 17, 2014; Published online March 26, 2014
Citation:
Matthew Bennett, Angelo Bianchi, “Tilting Modules in Truncated Categories”, SIGMA, 10 (2014), 030, 24 pp.
Linking options:
https://www.mathnet.ru/eng/sigma895 https://www.mathnet.ru/eng/sigma/v10/p30
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