System of Degenerate Parabolic p-Laplacian

Abstract

In this paper, we study the mathematical properties of the solution u=(u1,·s,uk) to the degenerate parabolic system equation* ut=∇·(|∇u|p-2∇ u), (p>2). equation* More precisely, we show the uniqueness and existence of solution u and investigate a priori L∞ boundedness of the gradient of the solution. Assuming that the solution decays quickly at infinity, we also prove that the component ul, (1≤ l≤ k), converges to the function clB in space as t∞. Here, the function B is the fundamental or Barenblatt solution of p-Laplacian equation and the constant cl is determined by the L1-mass of ul. The proof is based on the existence of entropy functional.\\ ∈dent As an application of the asymptotic large time behaviour, we establish a Harnack type inequality which makes the size of spatial average being controlled by the value of solution at one point.