Explore the intricate connections between Liouville currents, complex structures, and Hitchin representations in this advanced mathematics lecture. Delve into key concepts such as parametrization, action of Gamma, functional representations, and the Hitchin component. Examine theorems related to symplectic manifolds, intersection currents, and closed jzuk. Investigate the Earthquake theorem and its implications for the vibration of modular space. Gain a deeper understanding of these complex mathematical topics through a comprehensive outline and in-depth analysis presented by F. Labourie.
The Liouville Current and Complex Structures for Hitchin Representations - F. Labourie
Overview
Syllabus
Introduction
Outline
Current
Parametrization
Action of Gamma
Form on L
Hitchin representations
Functional representations
Hitchin component
Theorem
symplectic manifold
intersection current
closed jzuk
Earthquake theorem
Vibration of modular space
Taught by
ICTP Mathematics
