Polydifferential Lie bialgebras and graph complexes

Abstract

We study the deformation complex of a canonical morphism i from the properad of (degree shifted) Lie bialgebras Liebc,d to its polydifferential version D(Liebc,d) and show that it is quasi-isomorphic to the oriented graph complex GCorc+d+1, up to one rescaling class. As the latter complex is quasi-isomorphic to the original graph complex GCc+d, we conclude that the space of homotopy non-trivial infinitesimal deformations of the canonical map i can be identified with the Grothendieck-Teichm\"uller Lie algebra grt; moreover, every such an infinitesimal deformation extends to a genuine deformation of the canonical morphism i from Liebc,d to D(Liebc,d). The full deformation complex is described with the help of a new graph complex of so called entangled graphs, whose suitable quotient complex is shown to contain the tensor product H(GCc) H(GCd) of cohomologies of Kontsevich graph complexes GCc GCd.