Cardy condition for open-closed field algebras

Abstract

Let V be a vertex operator algebra satisfying certain reductivity and finiteness conditions such that CV, the category of V-modules, is a modular tensor category. We study open-closed field algebras over V equipped with nondegenerate invariant bilinear forms for both open and closed sectors. We show that they give algebras over certain -extension of the Swiss-cheese partial dioperad, and we obtain Ishibashi states easily in such algebras. We formulate Cardy condition algebraically in terms of the action of the modular transformation S: τ -1τ on the space of intertwining operators. We then derive a graphical representation of S in the modular tensor category CV. This result enables us to give a categorical formulation of Cardy condition and modular invariant conformal full field algebra over V V. Then we incorporate the modular invariance condition for genus-one closed theory, Cardy condition and the axioms for open-closed field algebra over V equipped with nondegenerate invariant bilinear forms into a tensor-categorical notion called Cardy CV|CV V-algebra. We also give a categorical construction of Cardy CV|CV V-algebra in Cardy case.

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