Analytic Conformal Blocks of C2-cofinite Vertex Operator Algebras II: Convergence of Sewing and Higher Genus Pseudo-q-traces

Abstract

Let V=n∈ N V(n) be a C2-cofinite vertex operator algebra. We prove the convergence of Segal's sewing of conformal blocks associated to analytic families of pointed compact Riemann surfaces and grading-restricted generalized V N-modules (where N=1,2,…) that are not necessarily tensor products of V-modules, generalizing significantly the results on convergence in [Gui24]. We show that ``higher genus pseudo-q-traces" (called pseudo-sewing in this article) can be recovered from the above generalization of Segal's sewing to V N-modules. Therefore, our result on the convergence of the generalized Segal's sewing implies the convergence of pseudo-sewing, and hence covers both the convergence of genus-0 sewing in [Hua05a,HLZ12] and the convergence of pseudo-q-traces in [Miy04] and [Fio16]. Using a similar method, we also prove the convergence of Virasoro uniformization, i.e., the convergence of conformal blocks deformed by non-automomous meromorphic vector fields near the marked points. The local freeness of the analytic sheaves of conformal blocks is a consequence of this convergence. It will be used in the third paper of this series to prove the sewing-factorization theorem.

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