Lie superalgebras and irreducibility of A1(1)-modules at the critical level

Abstract

We introduce the infinite-dimensional Lie superalgebra A and construct a family of mappings from certain category of A-modules to the category of A1(1)-modules of critical level. Using this approach, we prove the irreducibility of a family of A1(1)-modules at the critical level. As a consequence, we present a new proof of irreducibility of certain Wakimoto modules. We also give a natural realizations of irreducible quotients of relaxed Verma modules and calculate characters of these representations.

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