Global solutions near homogeneous steady states in a multi-dimensional population model with both predator- and prey-taxis

Abstract

We study the system align*prob:star cases ut = D1 u - 1 ∇ · (u ∇ v) + u(λ1 - μ1 u + a1 v) \\ vt = D2 v + 2 ∇ · (v ∇ u) + v(λ2 - μ2 v - a2 u) cases align* (inter alia) for D1, D2, 1, 2, λ1, λ2, μ1, μ2, a1, a2 > 0 in smooth, bounded domains ⊂ Rn, n ∈ \1, 2, 3\. Without any further restrictions on these parameters, we prove that there exists a constant stable steady state (u, v) ∈ [0, ∞)2, meaning that there is > 0 such that, if u0, v0 ∈ W2, 2() are nonnegative with ∂ u0 = ∂ v0 = 0 in the sense of traces and align* \|u0 - u\|W2,2() + \|v0 - v\|W2,2() < , align* then there exists a global classical solution (u, v) of prob:star with initial data u0, v0 converging to (u, v) in W2, 2(). Moreover, the convergence rate is exponential, except for the case λ2 μ1 = λ1 a2, where it is is only algebraical.