Deformations of Quotients of Nonclassical Flag Domains via Foliated Projective Structures
Instituto de Matemática Pura e Aplicada via YouTube
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Explore advanced mathematical concepts in this 49-minute conference talk delivered by Adolfo Guillot from UNAM, focusing on deformations of quotients of nonclassical flag domains via foliated projective structures. Delve into the intricate relationships between foliations, complex geometry, and Painlevé equations as part of a special celebration honoring Frank Loray's 60th birthday. Examine sophisticated mathematical frameworks that connect differential geometry, complex analysis, and algebraic geometry through the lens of foliated structures. Learn about the theoretical foundations and applications of foliated projective structures in understanding geometric deformations. Discover how these mathematical tools contribute to the broader understanding of complex geometric systems and their behavior under various transformations. Gain insights into cutting-edge research in pure mathematics from leading experts in the field, presented as part of a comprehensive conference organized by the Instituto de Matemática Pura e Aplicada with an international scientific and organizing committee.
Syllabus
Foliations, Complex Geometry, and Painlevé Equations - PT - Adolfo Guillot (UNAM)
Taught by
Instituto de Matemática Pura e Aplicada