Superlinear transmission in an indirect signal production chemotaxis system
Abstract
In this paper, the indirect signal production system with nonlinear transmission is considered \[ \ arraylll & ut = u-∇·(u ∇ v), \\ & vt = v-v+w,\\ & wt = w-w+ f(u) array . \] in a bounded smooth domain ⊂ Rn associated with homogenous Neumann boundary conditions, where f∈ C1([0,∞)) satisfies 0 f(s) sα with α>0. It is known that the system possesses a global bounded solution if 0<α< 4n when n 4. In the case n 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<α< \ 4n,1+ 2n\, the solution is global and bounded via an approach based on the maximal Sobolev regularity.
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