Blow up of solutions for a Parabolic-Elliptic Chemotaxis System with gradient dependent chemotactic coefficient

Abstract

We consider a Parabolic-Elliptic system of PDE's with a chemotactic term in a N-dimensional unit ball describing the behavior of the density of a biological species "u" and a chemical stimulus "v". The system includes a nonlinear chemotactic coefficient depending of ``∇ v", i.e. the chemotactic term is given in the form - div ( u |∇ v|p-2 ∇ v), for \ p ∈ ( NN-1,2), N >2 for a positive constant when v satisfies the poisson equation - v = u - 1|| ∫ u0dx. We study the radially symmetric solutions under the assumption in the initial mass 1|| ∫ u0dx>6. For large enough, we present conditions in the initial data, such that any regular solution of the problem blows up at finite time.