On a comparison method for a parabolic-elliptic system of chemotaxis with density-suppressed motility and logistic growth

Abstract

We consider a parabolic-elliptic system of partial differential equations with chemotaxis and logistic growth given by the system \ arrayl ut - (u γ(v)= μ u(1-u), \\ - v +v=u, array . under Neumann boundary conditions and appropriate initial data in a bounded and regular domain of N (for N ≥ 1), where γ ∈ C3([0, ∞)) and satisfies the assumptions γ (s) > 0, γ(s) ≤ 0, γ (s) ≥ 0, γ (s) ≤ 0 for any s ≥ 0 -2 γ(s) + γ (s)s ≤ μ0< μ [γ(s)]2γ(s) ≤ c, for any s ∈ [0, ∞). We obtain the global existence and uniqueness of bounded in time solutions and the following asymptotic behavior \|u- 1\|L∞() +\|v- 1\|L∞() → 0, when t → +∞.