Algebraic Cycle Loci at the Integral Level
Abstract
Let be a smooth projective family defined over , where is a number field and is a finite set of primes. For each prime with residue field , we consider the algebraic loci in above which cohomological cycle conjectures predict the existence of non-trivial families of algebraic cycles, generalizing the Hodge loci of the generic fibre . We develop a technique for studying all such loci, together, at the integral level. As a consequence we give a non-Zariski density criterion for the union of non-trivial ordinary algebraic cycle loci in . The criterion is quite general, depending only on the level of the Hodge flag in a fixed cohomological degree and the Zariski density of the associated geometric monodromy representation.
Keywords
Cite
@article{arxiv.2206.11389,
title = {Algebraic Cycle Loci at the Integral Level},
author = {David Urbanik},
journal= {arXiv preprint arXiv:2206.11389},
year = {2023}
}
Comments
v2: Updated to thesis version + minor clarifications