Instantaneous regularization of measure-valued population densities in a Keller--Segel system with flux limitation

Abstract

This paper is concerned with the Keller--Segel system with flux limitation, align cases ut= u - ∇ · (uf(|∇ v|2)∇ v), \\ vt= v - v + u cases align in bounded n-dimensional domains with homogeneous Neumann boundary conditions, where f generalizes the prototype obtained on letting \[ f() = kf(1 + )-α, 0, \] with kf > 0 and α > 0. In this framework, it is shown that if either n = 1 and α > 0 is arbitrary, or n 2 and α > n-22(n-1), then for any nonnegative initial data belonging to the space of Radon measures for the population density and to W1,q with q ∈ (\1, (1-2α)n\, nn-1) for the signal density, there exists a global classical solution of the Neumann problem for (), which is continuous at t = 0 in an appropriate sense.