Superlinear transmission in an indirect signal production chemotaxis system

Abstract: In this paper, the indirect signal production system with nonlinear transmission is considered [ \left{ \begin{array}{lll} & u_t = \Delta u-\nabla\cdot(u \nabla v), \ \displaystyle & v_t =\Delta v-v+w,\ \displaystyle & w_t =\Delta w-w+ f(u) \end{array} \right. ] in a bounded smooth domain $\Omega\subset \mathbb{R}^n$ associated with homogenous Neumann boundary conditions, where $f\in C^1([0,\infty))$ satisfies $0\le f(s) \le s^{\alpha}$ with $\alpha>0$. It is known that the system possesses a global bounded solution if $0<\alpha<\frac 4n$ when $n\ge 4$. In the case $n\le 3$ and if we consider superlinear transmission, no regularity of $w$ or $v$ can be derived directly. In this work, we show that if $0<\alpha< \min{\frac 4n,1+\frac 2n}$, the solution is global and bounded via an approach based on the maximal Sobolev regularity.