A Hochschild-Kostant-Rosenberg theorem for cyclic homology

Abstract

Let A be a commutative algebra over the field F2 = Z/2. We show that there is a natural algebra homomorphism (A) HC-*(A) which is an isomorphism when A is a smooth algebra. Thus, the functor can be viewed as an approximation of negative cyclic homology and ordinary cyclic homology HC*(A) is a natural (A)-module. In general, there is a spectral sequence E2 = L*( )(A) ⇒ HC*- (A). We find associated approximation functors + and per for ordinary cyclic homology and periodic cyclic homology, and set up their spectral sequences. Finally, we discuss universality of the approximations.