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Stability of singularities of minimizing harmonic maps

Speaker(s)
Michał Miśkiewicz
Affiliation
doktorant MIM
Date
March 7, 2019, 12:30 p.m.
Room
room 5070
Seminar
Seminar of Mathematical Physics Equations Group

Minimizing harmonic maps - i.e., maps into a fixed manifold that minimize the Dirichlet energy - are known to be smooth outside a singular set of codimension 3. Here, we consider maps into the standard sphere S2 and investigate how the singular set is affected by small perturbations of the prescribed boundary map. We show a simple stability result in which the singularities of two minimizing maps are compared using the Wasserstein distance. The talk is based on joint work with Katarzyna Mazowiecka and Armin Schikorra.