Associativity of fusion products of C1-cofinite N-gradable modules of vertex operator algebra

Abstract

We prove an associative law of the fusion products of C1-cofinite N-gradable modules for a vertex operator algebra V. To be more precise, for C1-cofinite N-gradable V-modules A,B,C and their fusion products (A\!\! B, YAB), ((A\!\! B)\!\! C, Y(AB)C), (B\!\! C, YBC), (A\!\! (B\!\! C), YA(BC)) with logarithmic intertwining operators YAB,…, YA(BC) satisfying the universal properties for N-gradable modules, we prove that four-point correlation functions θ, YA(BC)(v,x) YBC(u,y)w and θ', Y(AB)C( YAB(v,x-y)u,y)w are locally normally convergent over \(x,y)∈ C2 0\!<\!|x\!-\!y|\!<\!|y|\!<\!|x|\. We then take their respective principal branches F( θ, YA(BC)(v,x) YBC(u,y)w) and F( θ, Y(AB)C( YAB)(v,x-y)u,y)w) on D2\!=\!\(x,y)∈ C2 0\!<\!|x\!-\!y|\!<\!|y|\!<\!|x|, and x,y,x\!-\!y∈ R≤ 0\ and then show that there is an isomorphism φ[AB]C:(A B) C A (B C) such that F( θ, YA(BC)(v,x) YBC(u,y)w) =F( φ[AB]C(θ), Y(AB)C( YAB(v,x-y)u,y)w) on D2 for θ∈ (A (B C)), v∈ A, u∈ B, and w∈ C, where W denotes the contragredient module of W and φ[AB]C denotes the dual of φ[AB]C. We also prove the pentagon identity.