One-point functions for C2-cofinite VOAs: pseudo-traces and trace spaces of projective modules

Abstract

We study the space of one-point functions on the torus for a possibly nonrational C2-cofinite vertex operator algebra V by relating it to a trace object of the subcategory of projective objects in the representation category of V. We identify the dual of the trace space with symmetric functions on the endomorphism algebra E of a projective generator. Motivated by the Gainutdinov-Runkel conjecture, recently established using different methods by Gui and Zhang, we present a complementary representation-theoretic approach based on Arike-Nagatomo pseudo-traces. In this framework, we prove surjectivity of the Gainutdinov-Runkel map from symmetric functions on E to one-point functions. Under the additional assumption of separated conformal weights modulo Z, we also prove injectivity, using projective-cover techniques inspired by Huang.