Constructing new open-closed TQFTs from the interpolation of symmetric monoidal categories
Abstract
For any symmetric monoidal category D, Lauda and Pfeiffer showed the equivalence between the D-valued open-closed 2-dimensional TQFTs and the so-called knowledgeable Frobenius algebras (KFAs) in D. Each KFA in D=VecK provides a sequence of scalars indexed by the set N2 of diffeomorphism classes of connected endocobordisms of the empty set, given by evaluation by the associated TQFT on each such cobordism class. From an arbitrary sequence =(g,w)g,w∈N, we build a symmetric monoidal category C -- with unit object 1 satisfying EndC(1) K -- generated by a KFA object affording this sequence. We then determine which sequences produce semisimple abelian categories C with finite-dimensional hom-spaces. These form a family of categories interpolating the categories of representations of automorphism groups of certain KFAs in VecK.
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