Pairings in Hopf-cyclic cohomology of algebras and coalgebras with coefficients

This paper is concerned with the theory of cup-products in Hopf-type cyclic cohomology of algebras and coalgebras. Here we give detailed proofs of the statements, announced in our previous paper [21]. We show that the cyclic cohomology of a coalgebra can be obtained from a construction involving noncommutative Weil algebra. Then we use a generalization of Quillen and Crainic’s construction (see [18] and [7]) to define the cupproduct. We discuss the relation of the introduced cup-product and S-operations on cyclic cohomology. After this we describe the relation of this type of product and bivariant cyclic cohomology. In the last section we briefly discuss the relation of our constructions with that of [15].