Quantization of parafermion vertex algebras
Abstract
Let g be a finite dimensional simple Lie algebra over C, and let be a positive integer. In this paper, we construct the quantization K g, of the parafermion vertex algebra K g as an -adic quantum vertex subalgebra inside the simple quantum affine vertex algebra L g,. We show that L g, contains an -adic quantum vertex subalgebra isomorphic to the quantum lattice vertex algebra V QLη, where QL is the lattice generated by the long roots of g. Moreover, we prove the double commutant property of K g, and V QLη in L g,.
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