On a Parabolic-Elliptic system with gradient dependent chemotactic coefficient

Abstract

We consider a second order PDEs system of Parabolic-Elliptic type with chemotactic terms. The system describes the evolution of a biological species "u" moving towards a higher concentration of a chemical stimuli "v" in a bounded and open domain of RN. In the system considered, the chemotaxis sensitivity depends on the gradient of v, i.e., the chemotaxis term has the following expression - div ( u |∇ v|p-2∇ v ), where is a positive constant and p satisfies p ∈ (1, ∞), if N=1 and p∈ (1, NN-1), if N≥ 2. We obtain uniform bounds in time in L∞() of the solutions. For the one-dimensional case we prove the existence of infinitely many non-constant steady-states for p∈ (1,2) for any positive and a given positive mass.