Global existence and boundedness in a chemotaxis-convection model with sensitivity functions for tumor angiogenesis

Abstract

This paper deals with the fully parabolic chemotaxis-convection model with sensitivity functions for tumor angiogenesis, align* cases ut= u-∇ · (u1(v)∇ v) +∇ · (u2(w)∇ w), &x ∈ ,\ t>0, \\[1.05mm] vt= v+∇ · (v(w)∇ w)+α u-β v, &x ∈ ,\ t>0, \\[1.05mm] wt= w+γ u-δ w, &x ∈ ,\ t>0 cases align* under homogeneous Neumann boundary conditions and initial conditions, where ⊂ Rn (n 3) is a bounded domain with smooth boundary, 1, 2, are functions satisfying some conditions and α, β, γ, δ>0 are constants. The purpose of this paper is to establish global existence and boundedness in this system.