The classifying space of the 1+1 dimensional G-cobordism category

Abstract

For a finite group G, we define the G-cobordism category in dimension two. We show there is a one-to-one correspondence between the connected components of its classifying space and the abelianization of G. Also, we find an isomorphism of its fundamental group onto the direct sum Z 2SO(BG), where 2SO(BG) is the free oriented G-bordism group in dimension two, and we study the classifying space of some important subcategories. We obtain the classifying space has the homotopy type of the product G/[G,G]× S1× XG, where π1(XG)=2SO(BG). Finally, we present some results about the classification of G-topological quantum field theories in dimension two.