Global solutions to a chemotaxis consumption model involving signal-dependent degenerate diffusion and logistic-type dampening

Abstract: This work considers the Keller-Segel consumption system \begin{eqnarray*} \left{ \begin{array}{llll} u_t=\Delta (u\phi(v))+au-bu^\gamma,\quad &x\in \Omega,\quad t>0,\ v_t=\Delta v-uv,\quad &x\in\Omega,\quad t>0 \end{array} \right. \end{eqnarray*} in a smoothly bounded domain $\Omega\subset \mathbb{R}^n,$ $n\geq1$, under no-flux boundary conditions, where the parameters $a,b>0$, $\gamma\geq2$, and the motility function $\phi$ suitably generalizes the prototype given by $\phi(s)=s^\alpha$ for all $s\geq0$ with $\alpha>0$. When $\phi$ is appropriately smooth with $\alpha\geq1$, it is shown that if one of the following cases holds: (i) $\gamma>2$; (ii) $\gamma=2$, either $n\leq2$ or $n\geq3$ and $b$ is sufficiently large, then for all suitably regular initial data global classical solutions can be constructed. Whereas when $\phi$ is considered to be with rather mild regularity properties and $\gamma=2$, for arbitrary $b>0$, this system admits at least one global weak solution in case $\alpha>0$. In addition, if $\phi$ is suitably smooth with $\alpha>1$, then the above weak solutions become eventually smooth.