Nonlinear partial differential equations take a well-established place in the modern analysis. Anisotropic and inhomogeneous materials enjoy recently attention from the point of view of possible applications. At the same time, diffusion-type processes in media having nonstandard properties (including the motions of multiphased fluids in strongly inhomogeneous porous media) inspire a significant international mathematical community investigating variational models.
With the aim to encourage, and train young researchers to join the community we organize an intensive spring school on functional analysis of unconventional function spaces and applications to nonlinear PDEs. The courses will be delivered by
Andrea Cianchi (University of Florence),
Lars Diening (University of Bielefeld),
Piotr Gwiazda (IMPAN Warsaw),
and Juha Kinnunen (Aalto University, Helsinki, Finland),
Unfortunately lectures by Paolo Marcellini had to be cancelled.
Anna Kh. Balci (Bielefeld University),
Iwona Chlebicka (University of Warsaw),
Arttu Karppinen (University of Warsaw),
Aneta Wróblewska-Kamińska (IMPAN Warsaw),
Anna Zatorska-Goldstein (University of Warsaw).