2D HQFTs and Frobenius (G,V)-categories

Abstract

Homotopy Quantum Field Theories as variants of Topological Quantum Field Theories are described by functors from some cobordism category, enriched with homotopical data, to a symmetric monoidal category V. A new notion of HQFTs is introduced using target pairs of spaces (X,Y) acounting for basepoints being sent to points in Y. Such (X,Y)-HQFTs are classified in dimension 1 by dualizable representations of G:=1(X,Y), the relative fundamental groupoid. For dimension 2, the notion of crossed loop Frobenius (G,V)-categories is introduced, generalizing crossed Frobenius G-algebras, where G is only a group. After stating generalities of these multi-object generalizations, a classification theorem of 2-dimensional (X,Y)-HQFTs via crossed loop Frobenius (G,V)-categories is proven.