Qualitative properties of solutions to parabolic anisotropic equations: Part I -- Expansion of positivity

Abstract

We prove expansion of positivity and reduction of the oscillation results to the local weak solutions to a doubly nonlinear anisotropic class of parabolic differential equations with bounded and measurable coefficients, whose prototype is equation* ut-Σi=1N ( u(mi-1)(pi-1) \ |uxi|pi-2 \ uxi )xi=0 , equation* for a restricted range of pis and mis, that reflects their competition for the diffusion. The positivity expansion relies on an exponential shift and is presented separately for singular and degenerate cases. Finally we present a study of the local oscillation of the solution for some specific ranges of exponents, within the singular and degenerate cases.