Cofiniteness for Twisted Fusion Products in Vertex Operator Algebra Theory
Abstract
Let V be a vertex operator algebra equipped with two commuting finite-order automorphisms g1 and g2, and set g3 = g1 g2. For k = 1, 2, 3, let Wk be a gk-twisted V-module. Assuming that W1 and W2 are C1-cofinite and that there exists a surjective twisted logarithmic intertwining operator of type W3W1 \ W2, we prove that W3 is also C1-cofinite. The cofiniteness follows from the finite-dimensionality of the solution space of an associated complex-coefficient linear differential equation. As an application, under the condition of C1-cofiniteness, we establish the finiteness of the fusion rules and construct the fusion product.
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