Motives and filtrations on Chow groups

The aim of this paper is to show that a finitely generated module over a Noetherian ring defines a unique cycle class in the components with codimension zero and one of the Chow group of the ring. The main theorem generalizes a classical result over integrally closed domains and implies the isomorph

## Abstract In this paper, Lawson homology and morphic cohomology are defined for Chow motives. As consequences, we rederive the projective bundle formula proved by Friedlander and Gabber, the blowup formula for Lawson homology by the first author, and a formula for certain homogeneous projective v

## dedicated to meeyoung's parents We compute the Chow motive and the Chow groups with rational coefficients of the Hilbert scheme of points on a smooth algebraic surface.  2002 Elsevier Science (USA)

## Abstract Let __X__ be a projective algebraic manifold of dimension __n__ (over C), __CH__^1^(X) the Chow group of algebraic cycles of codimension __l__ on __X__, modulo rational equivalence, and __A__^1^(X) ⊂ __CH__^1^(X) the subgroup of cycles algebraically equivalent to zero. We say that __A__