C. Robles
Published 2016-07-04Version 1
Two interesting questions in algebraic geometry are: (i) how can a smooth projective varieties degenerate? and (ii) given two such degenerations, when can we say that one is "more singular/degenerate" than the other? Schmid's Nilpotent Orbit Theorem yields Hodge-theoretic analogs of these questions, and the Hodge-theoretic answers in turn provide insight into the motivating algebro-geometric questions, sometimes with applications to the study of moduli. Recently the Hodge-theoretic questions have been completely answered. This is an expository survey of that work.
Comments: Expository notes for the Algebraic Geometry Summer Research Institute Graduate Student Bootcamp in Salt Lake City, Utah, July 06--10, 2015
Asymptotics of degenerations of mixed Hodge structures
Degenerations of Grassmannians via lattice configurations II
Characterization of Calabi--Yau variations of Hodge structure over tube domains by characteristic forms
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