Twisted modules of 12Z-graded modular vertex superalgebras
Abstract
In this paper, we investigate the theory of g-twisted modules for modular 12Z-graded vertex superalgebras over an algebraically closed field F of prime characteristic p>2. For a 12Z-graded vertex superalgebra V and an automorphism g of V of finite order T relatively prime to p, we give a twisted version of Zhu's associative algebra, denoted by Ag(V). We prove that there is a one-to-one correspondence between the set of equivalence classes of simple Ag(V)-modules and the set of equivalence classes of simple 1T0N-graded g-twisted V-modules, where T0 is the order of the automorphism gσ with σ the parity automorphism. As an application, we study twisted modules for modular vertex superalgebras associated to the affine Lie superalgebras and determine the corresponding twisted Zhu algebra. We also compute the twisted Zhu algebra for the modular Neveu-Schwarz vertex superalgebra and classify its irreducible twisted modules.
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