Boundedness, Ultracontractive Bounds and Optimal Evolution of the Support for Doubly Nonlinear Anisotropic Diffusion

Abstract

We investigate some regularity properties of a class of doubly nonlinear anisotropic evolution equations whose model case is align* ∂t (|u|α -1u ) - ΣNi=1 ∂i ( |∂i u|pi - 2 ∂i u ) = 0, align* where α ∈ (0,1) and pi ∈ (1, ∞). We obtain super and ultracontractive bounds, and global boundedness in space for solutions to the Cauchy problem with initial data in Lα+1(RN), and show that the mass is nonincreasing over time. As a consequence, compactly supported evolution is shown for optimal exponents. We introduce a seemingly new paradigm, by showing that Caccioppoli estimates, local boundedness and semicontinuity are consequences of the membership to a suitable energy class. This membership is proved by first establishing the continuity of the map t |u|α-1u(·,t) ∈ L1+1/αloc() permitting us to use a suitable mollified weak formulation along with an appropriate test function.