On the geometry of the p-Laplacian operator

Abstract

The p-Laplacian operator pu= div (|∇ u|p-2∇ u) is not uniformly elliptic for any p∈(1,2)(2,∞) and degenerates even more when p ∞ or p 1. In those two cases the Dirichlet and eigenvalue problems associated with the p-Laplacian lead to intriguing geometric questions, because their limits for p∞ or p 1 can be characterized by the geometry of . In this little survey we recall some well-known results on eigenfunctions of the classical 2-Laplacian and elaborate on their extensions to general p∈[1,∞]. We report also on results concerning the normalized or game-theoretic p-Laplacian pNu:=1p|∇ u|2-ppu=1p1Nu+p-1p∞Nu and its parabolic counterpart ut-pN u=0. These equations are homogeneous of degree 1 and pN is uniformly elliptic for any p∈ (1,∞). In this respect it is more benign than the p-Laplacian, but it is not of divergence type.