A note on the zeroth products of Frenkel-Jing operators
Abstract
Quantum vertex algebra theory, developed by H.-S. Li, allows us to apply zeroth products of Frenkel-Jing operators, corresponding to Drinfeld realization of Uq (sln+1), on the extension of Koyama vertex operators. As a result, we obtain an infinite-dimensional space and describe its structure as a module for the associative algebra Uq (sln+1)z, a certain quantum analogue of U(sln+1) which we introduce in this paper.
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