Intersections and the B\'ezout Range: Abelian Varieties
Abstract
Given subvarieties of a complex algebraic variety of complementary dimension, must they intersect? When is projective space, this is a consequence of the classical B\'ezout theorem, and an analogue for simple abelian varieties was established by Barth in 1968. Moreover, the moving lemma suggests that, after suitable translations, one may arrange for intersections of the expected dimension. In this work, we obtain variants for simple abelian varieties in the spirit of the completed Zilber--Pink philosophy. When and have complementary dimension, we show that the intersections are zero-dimensional for all but finitely many integers , and that these intersections collectively give rise to an analytically dense subset of as varies. We moreover control those for which has a positive dimensional component uniformly in and . When , we show that for a set of integers of asymptotic density one, except in the presence of intersections at torsion points.
Cite
@article{arxiv.2604.02186,
title = {Intersections and the B\'ezout Range: Abelian Varieties},
author = {Gregorio Baldi and David Urbanik},
journal= {arXiv preprint arXiv:2604.02186},
year = {2026}
}