Local Continuity and Asymptotic Behaviour of Degenerate Parabolic Systems

Abstract

We study the local H\"older continuity and the asymptotic behaviour of solution, u=(u1,·s, uk), of the degenerate system equation* uit=∇·(m\,Um-1∇ ui) for m>1 and i=1,·s,k equation* which describes the populations density of k-species whose diffusion is determined by their total population density U=u1+·s+uk. For the local H\"older continuity, we adopt the intrinsic scaling and iteration arguments of DeGiorgi, Moser, and Dibenedetto. Under some regularity conditions, we also prove that the population density function of i-th species with the population Mi converges in Cs∞ to MiMBM(x,t) as t ∞ where BM is the Barenblatt profile of the standard porous medium equation with L1 mass M=M1+·s+Mk. As a consequence of asymptotic behaviour, it is shown that each density function becomes a concave function after a finite time.