Graded multiplications on iterated bar constructions

Abstract

We define a bar construction endofunctor on the category of commutative augmented monoids A of a symmetric monoidal category V endowed with a left adjoint monoidal functor F:sSet V. To do this, we need to carefully examine the monoidal properties of the well-known (reduced) simplicial bar construction B(1,A,1). We define a geometric realization |-| with respect to the image under F of the canonical cosimplicial simplicial set. This guarantees good monoidal properties of |-|: it is monoidal, and given a left adjoint monoidal functor G:V W, there is a monoidal transformation |G-|⇒ G|-|. We can then consider BA=|B A| and the iterations BnA. We establish the existence of a graded multiplication on these objects, provided the category V is cartesian and A is a ring object. The examples studied include simplicial sets and modules, topological spaces, chain complexes and spectra.