Indecomposable Higher Chow Cycles on Low Dimensional Jacobians
Abstract
Title: Indecomposable Higher Chow Cycles on Low Dimensional Jacobians Authors: Alberto Collino Comments: AMS-TeX, 10 pages Subj-class: Algebraic Geometry MSC-class: 14C30 ;19E15 There is a basic indecomposable higher cycle K in Bloch's higher Chow group CH^{g}(J(C),1) on the Jacobian J(C) of a general hyperelliptic curve C of genus g. Consider K(t) the translation of K associated with a point t in C, we prove that in general K - K(t) is indecomposable if the genus is at least 3. Our tool is Lewis' condition for indecomposability. We show next that on the jacobian J(C) of a general curve C of genus 3 there is a geometrically natural family of higher cycles, when C becomes hyperelliptic the family in the limit contains a component of indecomposable cycles of type K - K(t).
Cite
@article{arxiv.math/9909062,
title = {Indecomposable Higher Chow Cycles on Low Dimensional Jacobians},
author = {Alberto Collino},
journal= {arXiv preprint arXiv:math/9909062},
year = {2007}
}
Comments
10 pages