Hairy graphs to ribbon graphs via a fixed source graph complex

Abstract

We show that the hairy graph complex (HGCn,n,d) appears as an associated graded complex of the oriented graph complex (OGCn+1,d), subject to the filtration on the number of targets, or equivalently sources, called the fixed source graph complex. The fixed source graph complex (OGC1,d0) maps into the ribbon graph complex RGC, which models the moduli space of Riemann surfaces with marked points. The full differential d on the oriented graph complex OGCn+1 corresponds to the deformed differential d+h on the hairy graph complex HGCn,n, where h adds a hair. This deformed complex (HGCn,n,d+h) is already known to be quasi-isomorphic to standard Kontsevich's graph complex GC2n. This gives a new connection between the standard and the oriented version of Kontsevich's graph complex.