Boundedness in a fully parabolic chemotaxis system with nonlinear diffusion and sensitivity, and logistic source

Abstract

In this paper we study the zero-flux chemotaxis-system equation* cases u t=∇ · ((u+1)m-1 ∇ u-(u+1)α (v)∇ v) + ku-μ u2 & x∈ , t>0, \\ vt = v-vu & x∈ , t>0,\\ cases equation* being a bounded and smooth domain of Rn, n≥ 1, and where m,k ∈ R, μ>0 and α < m+12. For any v≥ 0 the chemotactic sensitivity function is assumed to behave as the prototype (v) = 0(1+av)2, with a≥ 0 and 0>0. We prove that for nonnegative and sufficiently regular initial data u(x,0) and v(x,0), the corresponding initial-boundary value problem admits a global bounded classical solution provided μ is large enough.