Representation theory of the vertex algebra W1 + ∞

Abstract

In our paper~KR we began a systematic study of representations of the universal central extension D\/ of the Lie algebra of differential operators on the circle. This study was continued in the paper~FKRW in the framework of vertex algebra theory. It was shown that the associated to D\/ simple vertex algebra W1+ ∞, N\/ with positive integral central charge N\/ is isomorphic to the classical vertex algebra W (glN), which led to a classification of modules over W1 + ∞, N. In the present paper we study the remaining non-trivial case, that of a negative central charge -N. The basic tool is the decomposition of N\/ pairs of free charged bosons with respect to glN\/ and the commuting with glN\/ Lie algebra of infinite matrices gl.

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