Global existence and boundedness of solutions to a chemotaxis-consumption model with singular sensitivity

Abstract

In this paper we study the zero-flux chemotaxis-system equation* cases ut= u - ∇ · (uv ∇ v) \\ vt= v-f(u)v cases equation* in a smooth and bounded domain of R2, with >0 and f∈ C1(R) essentially behaving like uβ, 0<β<1. Precisely for <1 and any sufficiently regular initial data u(x,0)≥ 0 and v(x,0)>0 on , we show the existence of global classical solutions. Moreover, if additionally m:=∫ u(x,0) is sufficiently small, then also their boundedness is achieved.