Quantum vertex representations via finite groups and the McKay correspondence
Abstract
We establish a q-analog of our recent work on vertex representations and the McKay correspondence. For each finite group we construct a Fock space and associated vertex operators in terms of wreath products of × C× and the symmetric groups. An important special case is obtained when is a finite subgroup of SU2, where our construction yields a group theoretic realization of the representations of the quantum affine and quantum toroidal algebras of ADE type.
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