A Harnack inequality for solutions of elliptic-parabolic equations

Abstract

We want to prove a Harnack type inequality for solutions of strongly degenerate parabolic, or elliptic-parabolic, equations. To do that, we first define a De Giorgi class of order p = 2 that contains the solutions of evolution equations of the types (x,t) ut + A u = 0 and ( (x,t) u)t + A u = 0, where > 0 almost everywhere and A is a suitable elliptic operator. For functions belonging to this class we prove an inhomogeneous parabolic Harnack inequality, i.e. a Harnack inequality that takes into account the mean value of in different regions of × (0,T). \\ As a consequence, thanks to an approximation result and a delicate passage to the limit, we are able to get a Harnack inequality for solutions, and in these cases only for solutions, of strongly degenerating parabolic equations, i.e. when ≥slant 0. \\ As a byproduct one obtains H\"older continuity for solutions of a subclass of the first equation (i.e. (x,t) ut + A u = 0): in particular the solutions of this subclass are H\"older continuous in the interface where changes its sign, from positive to zero.