System of Porous Medium Equations

Abstract

We investigate the evolution of population density vector, u=(u1,·s,uk), of k-species whose diffusion is controlled by its absolute value |u|. More precisely we study the properties and asymptotic large time behaviour of solution u=(u1,·s,uk) of degenerate parabolic system equation* (ui)t=∇·(|u|m-1∇ ui) for m>1 and i=1,·s,k. equation* Under some regularity assumption, we prove that the function ui which describes the population density of i-th species with population Mi converges to Mi|M|B|M| in space with two different approaches where B|M| is the Barenblatt solution of the porous medium equation with L1-mass |M|=M12+·s+Mk2. ∈dent As an application of the asymptotic behaviour, we establish a suitable harnack type inequality which makes the spatial average of ui under control by the value of ui at one point. We also find an 1-directional travelling wave type solutions and the properties of solutions which has travelling wave behaviour at infinity.