Comparing fat graph models of moduli space

Abstract

Godin introduced the categories of open closed fat graphs Fatoc and admissible fat graphs Fatad as models of the mapping class group of open closed cobordism. We use the contractibility of the arc complex to give a new proof of Godin's result that Fatad is a model of the mapping class group of open-closed cobordisms. Similarly, Costello introduced a chain complex of black and white graphs BW-Graphs, as a rational homological model of mapping class groups. We use the result on admissible fat graphs to give a new integral proof of Costellos's result that BW-Graphs is a homological model of mapping class groups. The nature of this proof also provides a direct connection between both models which were previously only known to be abstractly equivalent. Furthermore, we endow Godin's model with a composition structure which models composition of cobordisms along their boundary and we use the connection between both models to give BW-Graphs a composition structure and show that BW-Graphs are actually a model for the open-closed cobordism category.