Sigma involutions associated with parafermion vertex operator algebra K(sl2,k)

Abstract

An irreducible module for the parafermion vertex operator algebra K(sl2,k) is said to be of σ-type if an automorphism of the fusion algebra of K(sl2,k) of order k is trivial on it. For any integer k 3, we show that there exists an automorphism of order 2 of the subalgebra of the fusion algebra of K(sl2,k) θ spanned by the irreducible direct summands of σ-type irreducible K(sl2,k)-modules, where θ is an involution of K(sl2,k). We discuss some examples of such an automorphism as well.