Asymptotic behavior of a doubly haptotactic cross-diffusion model for oncolytic virotherapy

Abstract

This paper considers a model for oncolytic virotherapy given by the doubly haptotactic cross-diffusion system equation* \arrayll ut=Du u-u∇·(u∇ v)+μu u(1-u)- uz, vt=- (αu u+αw w)v,\\ wt=Dw w-w∇·(w∇ v)- w+ uz,\\ zt=Dz z-δz z- uz+β w, array. equation* with positive parameters Du,Dw,Dz,u,w,δz,, αu,αw,μu,β. When posed under no-flux boundary conditions in a smoothly bounded domain ⊂ R2, and along with initial conditions involving suitably regular data, the global existence of classical solution to this system was asserted in Tao and Winkler (2020). Based on the suitable quasi-Lyapunov functional, it is shown that when the virus replication rate β<1, the global classical solution (u,v,w,z) is uniformly bounded and exponentially stabilizes to the constant equilibrium (1, 0, 0, 0) in the topology (L∞())4 as t→ ∞.