Boundary behavior and geometric properties of nonlocal minimal surfaces
We recall the notion of nonlocal minimal surfaces and we discuss their qualitative and quantitative interior and and boundary behavior. In particular, we present some optimal examples in which the surfaces stick at the boundary. This phenomenon is purely nonlocal, since classical minimal surfaces do not stick at the boundary of convex domains. We also discuss the graph properties of the nonlocal minimal surfaces. http://cvgmt.sns.it/seminar/501/
When
Wed Mar 23, 2016 4pm – 5pm Coordinated Universal Time
Where
Sala Seminari Dipartimento di Matematica di Pisa (map)