Matrads, Biassociahedra and A∞-Bialgebras

Abstract

We introduce the notion of a matrad M = Mn,m whose submodules M*,1 and M1,* are non-Sigma operads. We define the free matrad H∞ generated by a singleton in each bidegree (m,n) and realize H∞ as the cellular chains on biassociahedra KKn,m = KKm,n, of which KKn,1 = KK1,n is the associahedron Kn. We construct the universal enveloping functor from matrads to PROPs and define an A∞-bialgebra as an algebra over H∞.

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