On the extensions of the left modules for a meromorphic open-string vertex algebra, I
Abstract
We study the extensions of two left modules W1, W2 for a meromorphic open-string vertex algebra V. We show that the extensions satisfying some technical but natural convergence conditions are in bijective correspondence to the first cohomology classes associated to the V-bimodule HN(W1, W2) constructed in HQ-Red. When V is grading-restricted and contains a nice vertex subalgebra V0, those convergence conditions hold automatically. In addition, we show that the dimension of Ext1(W1, W2) is bounded above by the fusion rule NW2VW1 in the category of V0-modules. In particular, if the fusion rule is finite, then Ext1(W1, W2) is finite-dimensional. We also give an example of an abelian category consisting of certain modules of the Virasoro VOA that does not contain any nice subalgebras, while the convergence conditions hold for every object.
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