Dampening effect of logistic source in a two-dimensional haptotaxis system with nonlinear zero-order interaction

Abstract

This paper deals with the oncolytic virotherapy model equationsplit cases &ut = u - ∇ · (u∇ v)-uz +μ u(1-u),& \\[2ex] &vt = - (u+w)v,& \\[2ex] &wt = Dw w - w + uz,& \\[2ex] &zt = Dz z - z - uz + β w,& cases splitequation in a bounded domain ⊂ R2 with smooth boundary, where μ, Dw, Dz and β are prescribed positive parameters. For any given suitably regular initial data, the global existence of classical solution to the corresponding homogeneous Neumann initial-boundary problem for a more general model allowing μ=0 was previously verified in [Y. Tao \& M. Winkler, J. Differential Equations 268 (2020), 4973-4997]. This work further shows that whenever μ>0, the above-mentioned global classical solution to the above equation is uniformly bounded; and moreover, if β<1, then the solution (u, v, w, z) stabilizes to the constant equilibrium (1, 0, 0, 0) in the topology Lp()× (L∞())3 with any p>1 in a large time limit.