A new result for boundedness of solutions to a quasilinear higher-dimensional chemotaxis -- haptotaxis model with nonlinear diffusion

Abstract

This paper deals with a boundary-value problem for a coupled quasilinear chemotaxis--haptotaxis model with nonlinear diffusion \arrayll ut=∇·(D(u)∇ u)-∇·(u∇ v)- ∇·(u∇ w)+μ u(1-u-w),\\ vt= v- v +u, \\ wt=- vw\\ array. in N-dimensional smoothly bounded domains, where the parameters ,> 0, μ> 0. The diffusivity D(u) is assumed to satisfy D(u)≥ CDum-1 for all u > 0 with some CD>0. Relying on a new energy inequality, in this paper, it is proved that under the conditions m>2NN+(s≥1λ01s+1 (+\|w0\|L∞())(s≥1λ01s+1(+\|w0\|L∞())-μ)++1) (N+s≥1λ01s+1(+\|w0\|L∞())(s≥1λ01s+1 (+\|w0\|L∞())-μ)+-1)N, and proper regularity hypotheses on the initial data, the corresponding initial-boundary problem possesses at least one global bounded classical solution when D(0) > 0 (the case of non-degenerate diffusion), while if, D(0)≥ 0 (the case of possibly degenerate diffusion), the existence of bounded weak solutions for system is shown. This extends some recent results by several authors.