Some elementary theorems about divisibility of 0-cycles on abelian varieties defined over finite fields

Details Some elementary theorems about divisibility of 0-cycles on abelian varieties defined over finite fields Some elementary theorems about divisibility of 0-cycles on abelian varieties defined over finite fields

2003-11-03

arxiv.org/abs/math/0311023v1

Mathematics

Algebraic Geometry

7 pages

Scientific paper

If $X$ is an abelian variety over a field and $L$ is an invertible sheaf, we
know that the degree of the 0-cycle $L^g$ is divisible by $g!$. As a 0-cycle,
it is not, even over a field of cohomological dimension 1. But we show that
over a finite field there is perhaps some hope.

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