Hodge Theory, Higgs Bundles on Moduli Spaces of Manifolds and Hyperbolicity II
Offered By: IMSA via YouTube
Course Description
Overview
Explore complex geometry and Hodge theory in this 59-minute lecture by Kang Zuo from Johannes Gutenberg Universität Mainz. Delve into the study of complex quasi-projective manifolds and their smooth compactifications, focusing on the geometry of log spaces in relation to families of projective manifolds. Examine two types of graded Higgs bundles: the system of Hodge bundles arising from variation of Hodge structures, and the deformation Higgs bundle extending the Kodaira-Spencer map. Learn about the construction of a non-trivial Higgs map connecting these bundles, and discover how Griffiths' curvature formula can be applied to obtain insights into the structure of log differential forms, generalizing the Griffiths-Schmid theorem on strict negativity of horizontal period mappings.
Syllabus
Hodge Theory, Higgs Bundles on Moduli Spaces of Manifolds and Hyperbolicity II
Taught by
IMSA
Related Courses
Tame Geometry for Hodge TheoryJoint Mathematics Meetings via YouTube Applications of O-minimality to Hodge Theory - Lecture 4
Fields Institute via YouTube Applications of O-minimality to Hodge Theory - Lecture 2
Fields Institute via YouTube Introduction to Higgs Bundles - Lecture 1
International Centre for Theoretical Sciences via YouTube Robert Ghrist - Laplacians and Network Sheaves
Applied Algebraic Topology Network via YouTube