Geometric Positivity of the Fusion Products of Unitary Vertex Operator Algebra Modules

Abstract

A unitary and strongly rational vertex operator algebra (VOA) V is called strongly unitary if all irreducible V-modules are unitarizable. A strongly unitary VOA V is called completely unitary if for each unitary V-modules W1, W2 the canonical nondegenerate Hermitian form on the fusion product W1 W2 is positive. It is known that if V is completely unitary, then the modular category of unitary V-modules is unitary [Gui19b], and all simple VOA extensions of V are automatically unitary and moreover completely unitary [Gui22, CGGH23]. In this paper, we give a geometric characterization of the positivity of the Hermitian product on W1 and W2, which helps us prove that the positivity is always true when the fusion product W1 W2 is an irreducible and unitarizable V-module. We give several applications: (1) We show that if V is a unitary (strongly rational) holomorphic VOA with a finite cyclic unitary automorphism group G, and if VG is strongly unitary, then VG is completely unitary. This result applies to the cyclic permutation orbifolds of unitary holomophic VOAs. (2) We show that if V is unitary and strongly rational, and if U is a simple current extension which is unitarizable as a V-module, then U is a unitary VOA.