Analytic Conformal Blocks of C2-cofinite Vertex Operator Algebras III: The Sewing-Factorization Theorems

Abstract

Let V=n∈ N V(n) be a C2-cofinite VOA, not necessarily rational or self-dual. In this paper, we establish various versions of the sewing-factorization (SF) theorems for conformal blocks associated to grading-restricted generalized modules of V N (where N∈ N). In addition to the versions announced in the Introduction of [GZ23], we prove the following coend version of the SF theorem: Let F be a compact Riemann surface with N incoming and R outgoing marked points, and let G be another compact Riemann surface with K incoming and R outgoing marked points. Assign W∈Mod( V N) and X∈Mod( V K) to the incoming marked points of F and G respectively. For each M ∈ Mod(V R), assign M and its contragredient M' to the outgoing marked points of F and G respectively. Denote the corresponding spaces of conformal blocks by T F*( M W) and TG*( M' X). Let the X be the (N+K)-pointed surface obtained by sewing F, G along their outgoing marked points. Then the sewing of conformal blocks-proved to be convergent in [GZ25a]-yields an isomorphism of vector spaces ∫M∈Mod( V R) T F*( M) C T G*( M' X) T X*( W X) We also discuss the relationship between conformal blocks and the modular functors defined using Lyubashenko's coend/construction.

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