The B∞-structure on the derived endomorphism algebra of the unit in a monoidal category

Abstract

Consider a monoidal category which is at the same time abelian with enough projectives and such that projectives are flat on the right. We show that there is a B∞-algebra which is A∞-quasi-isomorphic to the derived endomorphism algebra of the tensor unit. This B∞-algebra is obtained as the co-Hochschild complex of a projective resolution of the tensor unit, endowed with a lifted A∞-coalgebra structure. We show that in the classical situation of the category of bimodules over an algebra, this newly defined B∞-algebra is isomorphic to the Hochschild complex of the algebra in the homotopy category of B∞-algebras.