Time: 10:00-11:00, Thursday, March 26 2026
Venue: E14-212
Speaker: Talimdjioski Filip
Title: Lipschitz-free spaces and approximation properties
Abstract: Lipschitz-free spaces are a relatively new area that lies at the intersection of Banach space theory, metric geometry and optimal transport. Given a complete metric space M, the Lipschitz-free space F(M) is a Banach space which canonically contains an isometric copy of M and satisfies a certain universal property, similar to the universal property of free groups. In this talk, we will introduce this class of Banach spaces and present recent results concerning their approximation properties.
