How Topological Recursion Organises Quantum Fields on Noncommutative Geometries
Offered By: Fields Institute via YouTube
Course Description
Overview
Explore the intricate relationship between topological recursion and quantum fields on noncommutative geometries in this advanced tutorial presented by Alexander Hock from the University of Oxford. Delve into the complex mathematical concepts that underpin this fascinating area of study, as part of the Workshop on Noncommutative Geometry, Free Probability Theory and Random Matrix Theory. Gain insights into how topological recursion serves as an organizational framework for quantum fields in non-traditional geometric settings, expanding your understanding of cutting-edge research in mathematical physics.
Syllabus
Tutorial for ''How topological recursion organises quantum fields on noncommutative geometries''
Taught by
Fields Institute
Related Courses
Wold Decompositions for Representations of C-Algebras Associated with Noncommutative VarietiesFields Institute via YouTube Curvature of the Determinant Line Bundle for Noncommutative Tori
Hausdorff Center for Mathematics via YouTube Index Problem for Elliptic Operators Associated With Group Actions and NCG
Hausdorff Center for Mathematics via YouTube On the X Y Symmetry in Topological Recursion via Loop Insertion Operator
Fields Institute via YouTube Third Order Cumulants of Complex Wigner Matrices
Fields Institute via YouTube