Mirror flows and p-Laplacian eigenvalue problems on metric measure spaces

Abstract

We study mirror flows as Banach-space counterparts of Hilbertian gradient flows and show that they play an essential role in p-Laplacian eigenvalue problems on metric measure spaces. Under a Rellich--Kondrachov type compactness assumption and for p2, we establish a Ljusternik--Schnirelman type existence theorem without assuming C1-regularity of the associated energy. More precisely, we prove that every element λ of the Krasnoselskii spectrum is an eigenvalue of the p-Laplacian Δp; that is, there exists a nontrivial solution f to Δp f=-λ|f|p-2f.We also investigate the large time behavior of the corresponding mirror flow and prove its convergence to an eigenfunction when the eigenvalue is simple and isolated.