Hodge theory and classical algebraic geometry / [edited by] Gary Kennedy...[et al.].

Includes bibliographical references.

The stability manifolds of P1 and local P1 / Aaron Bertram, Steffen Marcus, and Jie Wang --
Reduced limit period mappings and orbits in Mumford-Tate varieties / Mark Green and Phillip Griffiths --
The primitive cohomology of theta divisors / Elham Izadi and Jie Wang --
Neighborhoods of subvarieties in homogeneous spaces / Janos Kollar --
Unconditional noncommutative motivic Galois groups / Matilde Marcolli and Goncalo Tabuada --
Differential equations in Hilbert-Mumford Calculus / Ziv Ran --
Weak positivity via mixed Hodge modules / Christian Schnell.

This volume contains the proceedings of a conference on Hodge Theory and Classical Algebraic Geometry, held May 13-15, 2013, at The Ohio State University, Columbus, OH. Hodge theory is a powerful tool for the study and classification of algebraic varieties. This volume surveys recent progress in Hodge theory, its generalizations, and applications. The topics range from more classical aspects of Hodge theory to modern developments in compactifications of period domains, applications of Saito's theory of mixed Hodge modules, and connections with derived category theory and non-commutative motives.