Asymptotic behavior of a three-dimensional haptotactic cross-diffusion system modeling oncolytic virotherapy

Abstract

This paper deals with an initial-boundary value problem for a doubly haptotactic cross-diffusion system arising from the oncolytic virotherapy equation* \ arraylll ut= u-∇ ·(u∇ v)+μ u(1-u)-uz,\\ vt=-(u+w)v,\\ wt= w-∇ ·(w∇ v)-w+uz,\\ zt=Dz z-z-uz+β w, array . equation* in a smoothly bounded domain ⊂ R3 with β>0,~μ>0 and Dz>0. Based on a self-map argument, it is shown that under the assumption β \1,\|u0\|L∞()\< 1+ (1+1x∈ u0(x))-1, this problem possesses a uniquely determined global classical solution (u,v,w,z) for certain type of small data (u0,v0,w0,z0). Moreover, (u,v,w,z) is globally bounded and exponentially stabilizes towards its spatially homogeneous equilibrium %constant equilibrium (1,0,0,0) as t→ ∞.