Erik Lindgren: Infinity-Harmonic Potentials in Convex Rings
Offered By: Hausdorff Center for Mathematics via YouTube
Course Description
Overview
Explore the intricacies of Infinity-Laplace equation solutions in planar convex rings through this 58-minute lecture from the Hausdorff Trimester Program on Evolution of Interfaces. Delve into the behavior of streamlines, discovering the uniqueness of ascending streamlines and the potential bifurcation of descending ones. Examine the reasons behind bifurcation occurrences and their relationship to regularity issues. Gain insights into the solution for a punctured square as a specific case study. Enhance your understanding of infinity-harmonic potentials and their applications in convex ring geometries.
Syllabus
Erik Lindgren: Infinity-harmonic potentials in convex rings
Taught by
Hausdorff Center for Mathematics
Related Courses
Introduction to Dynamical Systems and ChaosSanta Fe Institute via Complexity Explorer Introduction to Differential Equations
Boston University via edX Introduction to Nonlinear Dynamics
Indian Institute of Technology Madras via Swayam Chaotic Dynamical Systems
Indian Institute of Technology Delhi via Swayam Chaotic Dynamical System
Indian Institute of Technology Delhi via Swayam