On the existence of global solutions for the 3D chemorepulsion system

Abstract

In this paper, we give sufficient conditions for global-in-time existence of classical solutions for the fully parabolic chemorepulsion system posed on a convex, bounded three-dimensional domain. Our main result establishes global-in-time existence of regular nonnegative solutions provided that ∇u ∈ L4(0, T; L2()). Our method is related to the Bakry--\'Emery calculation and appears to be new in this context.