Asymptotic primes and the Chow group

Abstract

In this paper we present an unexpected connection between the theory of asymptotic prime divisors and Chow groups. As an application we show that the Chow group A1(R) is a torsion group when R is any graded ring such that we have an inclusion of graded rings T ⊂eq R ⊂eq S where S = k[X1, X2, Y]/(X1m + X2m + Yn) where k is algebraically field, (m,n) = 1, (mn)-1 ∈ k, m, n ≥ 2. We consider S graded with deg \ X1 = deg \ X2 = n and deg \ Y = m. Also T = k[X1, X2] where deg \ X1 = deg \ X2 = n. We also consider higher dimensional analogues of this result.