Uniform in time solutions for a chemotaxis with potential consumption model

Abstract

In this work we investigate the following chemo-attraction with consumption model in bounded domains of \, RN (N=1,2,3): ∂t u - u = - ∇ · (u ∇ v), ∂t v - v = - us v where s 1, endowed with isolated boundary conditions and initial conditions for (u,v). The main novelty in the model is the nonlinear potential consumption term usv. Through the convergence of solutions of an adequate truncated model, two main results are established; existence of uniform in time weak solutions in 3D domains, and uniqueness and regularity in 2D (or 1D) domains. Both results are proved imposing minimal regularity assumptions on the boundary of the domain.