Homotopy BV-algebra structure on the double cobar construction

Abstract

We show that the double cobar construction, 2 C*(X), of a simplicial set X is a homotopy BV-algebra if X is a double suspension, or if X is 2-reduced and the coefficient ring contains the ring of rational numbers Q. Indeed, the Connes-Moscovici operator defines the desired homotopy BV-algebra structure on 2 C*(X) when the antipode S : C*(X) C*(X) is involutive. We proceed by defining a family of obstructions On : C*(X) C*(X) n, n≥ 2 measuring the difference S2 - Id. When X is a suspension, the only obstruction remaining is O2 := E1,1 - τ E1,1 where E1,1 is the dual of the 1-product. When X is a double suspension the obstructions vanish.