Convergence of Sewing Conformal Blocks

Abstract

In recent work, Damiolini-Gibney-Tarasca showed that for a C2-cofinite rational CFT-type vertex operator algebra V, sheaves of conformal blocks are locally free and satisfy the factorization property. In this article, we use analytic methods to prove that sewing conformal blocks is convergent, solving a conjecture proposed by Zhu and Huang.