Decreasing filtrations, C2-algebra and twisted modules
Abstract
We investigate a question posed by Gaberdiel and Gannon concerning the relationship between C2-algebras and twisted modules. To each twisted module W of a vertex algebra V, we first associate a decreasing sequence of subspaces \EnT(W)\n∈Z and demonstrate that the associated graded vector space grET(W) is a twisted module of vertex Poisson algebra grET(V). We introduce another decreasing sequence of subspace \CnT(W)\n∈Z≥2 and establish a connection between \EnT(W)\n∈Z and \CnT(W)\n∈Z≥2. By utilizing the twisted module grET(W) of vertex Poisson algebra grET(V), we prove that for any twisted module W of a vertex algebra V, C2-cofiniteness implies Cn-cofiniteness for all n≥ 2. Furthermore, we employ grET(W) to study generating subspaces of 1TN-graded twisted modules of lower truncated Z-graded vertex algebras.
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