How are pseudo-q-traces related to (co)ends?

Abstract

Let V be an N-graded C2-cofinite vertex operator algebra (VOA), not necessarily rational or self-dual. Using a special case of the sewing-factorization theorem from [GZ25a], we show that the end E=∫ M∈Mod( V) M C M' in Mod(V2) (where M' is the contragredient module of M) admits a natural structure of associative C-algebra compatible with its V2-module structure. Moreover, we show that a suitable category CohL( E) of left E-modules is isomorphic, as a linear category, to Mod( V), and that the space of vacuum torus conformal blocks is isomorphic to the space SLF( E) of symmetric linear functionals on E. Combining these results with the main theorem of [GZ25b], we prove a conjecture of Gainutdinov-Runkel: For any projective generator G in Mod( V), the pseudo-q-trace construction yields a linear isomorphism from SLF(End V(G)opp) to the space of vacuum torus conformal blocks of V. In particular, if A is a unital finite-dimensional C-algebra such that the category of finite-dimensional left A-modules is equivalent to Mod( V), then SLF(A) is linearly isomorphic to the space of vacuum torus conformal blocks of V. This confirms a conjecture of Arike-Nagatomo.