Classification of irreducible modules for Bershadsky-Polyakov algebra at certain levels
Abstract
We study the representation theory of the Bershadsky-Polyakov algebra Wk = Wk(sl3,fθ). In particular, Zhu algebra of Wk is isomorphic to a certain quotient of the Smith algebra, after changing the Virasoro vector. We classify all modules in the category O for the Bershadsky-Polyakov algebra Wk when k=-5/3, -9/4, -1,0. In the case k=0 we show that the Zhu algebra A( Wk) has 2--dimensional indecomposable modules.
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