Global existence of solutions to a parabolic–parabolic system for chemotaxis with weak degradation

We study a parabolic-elliptic system of partial differential equations, which describes the chemotactic feature of slime molds. It is known that the blowup solution forms singularities such as delta functions, referred to as the collapses. Here, we study the case that the domain is a flat torus and

## Communicated by Howard A. Levine The Neumann boundary value problem for the chemotaxis system ⎧ ⎨ ⎩ is considered in a smooth bounded domain X ⊂ R n , n 2, with initial data u 0 ∈ C 0 ( X) and v 0 ∈ W 1,∞ (X) satisfying u 0 0 and v 0 >0 in X. It is shown that if 0<v< √ 2 / n then for any such

The following degenerate parabolic system modelling chemotaxis is considered. where = 0 or 1. We show here that the system of (KS) with m > 1 has a time global weak solution (u, v) with a uniform bound in time when (u 0 , v 0 ) is a nonnegative function and

## Abstract In this paper, we study the existence of non‐constant steady solutions and the linear stability of constant solutions to nonlinear parabolic‐elliptic system, which actually is a simplified form of the Keller–Segel system modelling chemotaxis. (© 2006 WILEY‐VCH Verlag GmbH & Co. KGaA, We