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Mean Field Limit by Gamma Convergence

Offered By: Hausdorff Center for Mathematics via YouTube

Tags

Kinetic Theory Courses Mathematical Analysis Courses Variational Methods Courses Interacting Particle Systems Courses

Course Description

Overview

Explore a 30-minute lecture on the mean-field limit for λ-convex potentials using a variational approach. Delve into the proof that utilizes gradient flows of functionals at different levels and Γ-convergence tools. Examine how the λ-convexity of potentials is crucial for identifying limits and deriving Evolutionary Variational Inequalities (EVIs) in interacting particle systems. Learn about this joint work presented by Matias Delgadino as part of the Hausdorff Trimester Program on Kinetic Theory at the Hausdorff Center for Mathematics.

Syllabus

Matias Delgadino: Mean field limit by Gamma convergence


Taught by

Hausdorff Center for Mathematics

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