o-minimal GAGA and applications to Hodge theory

Algebraic Geometry Seminar

Benjamin Bakker (University of Georgia)

Friday, November 9, 2018 -
3:15pm to 4:15pm
Location: 
119 Physics

Hodge structures on cohomology groups are fundamental invariants of algebraic varieties; they are parametrized by quotients $D/\Gamma$ of period domains by arithmetic groups. Except for a few very special cases, such quotients are never algebraic varieties, and this leads to many difficulties in the general theory. We explain how to partially remedy this situation by equipping $D/\Gamma$ with an o-minimal structure in which any period map is definable. The algebraicity of Hodge loci is an immediate consequence via a theorem of Peterzil--Starchenko. We further prove a general GAGA type theorem in the definable category, and deduce some finer algebraization results. This is joint work with Y. Brunebarbe, B. Klingler, and J.Tsimerman.

Last updated: 2018/12/16 - 10:21pm