A detailed look on actions on Hochschild complexes especially the degree $1$ co-product and actions on loop spaces

Abstract: We explain our previous results about Hochschild actions [Kau07a, Kau08a] pertaining in particular to the coproduct which appeared in a different form in [GH09] and provide a fresh look at the results. We recall the general action, specialize to the aforementioned coproduct and prove that the assumption of commutativity, made for convenience in [Kau08a], is not needed. We give detailed background material on loop spaces, Hochschild complexes and dualizations, and discuss details and extensions of these techniques which work for all operations of [Kau07a, Kau08a]. With respect to loop spaces, we show that the co--product is well defined modulo constant loops and going one step further that in the case of a graded Gorenstein Frobenius algebra, the co--product is well defined on the reduced normalized Hochschild complex. We discuss several other aspects such as time reversal'' duality and several homotopies of operations induced by it. This provides a cohomology operation which is a homotopy of the anti--symmetrization of the coproduct. The obstruction again vanishes on the reduced normalized Hochschild complex if the Frobenius algebra is graded Gorenstein. Further structures such asanimation'' and the BV structure and a coloring for operations on chains and cochains and a Gerstenhaber double bracket are briefly treated.