Cristian D. Gonzalez-Aviles
Published 2007-01-29Version 1
Let $k$ be a perfect field and let $p$ be a prime number different from the characteristic of $k$. Let $C$ be a smooth, projective and geometrically integral $k$-curve and let $X$ be a Severi-Brauer $C$-scheme of relative dimension $p-1$ . In this paper we show that $CH^{d}(X)_{{\rm{tors}}}$ contains a subgroup isomorphic to $CH_{0}(X/C)$ for every $d$ in the range $2\leq d\leq p$. We deduce that, if $k$ is a number field, then $CH^{d}(X)$ is finitely generated for every $d$ in the indicated range.
Finiteness theorems for algebraic cycles of small codimension on quadric fibrations over curves
Algebraic Cycles and values of Green's functions
On the symmetric determinantal representations of the Fermat curves of prime degree
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