Critical blow-up lines in a two-species quasilinear chemotaxis system with two chemicals

Abstract

In this study, we explore the quasilinear two-species chemotaxis system with two chemicals align cases ut = ∇ ·(D(u)∇ u) - ∇ · (S(u) ∇ v), & x ∈ , \ t > 0, \\ 0 = v - μw + w, μw=w, & x ∈ , \ t > 0, \\ wt = w - ∇ · (w ∇ z), & x ∈ , \ t > 0, \\ 0 = z - μu + u, μu=u, & x ∈ , \ t > 0, \\ ∂ u∂ = ∂ v∂ = ∂ w∂ = ∂ z∂ = 0, & x ∈ ∂ , \ t > 0, \\ u(x, 0) = u0(x), w(x, 0) = w0(x), & x ∈ , cases align where ⊂ Rn (n ≥3) is a smooth bounded domain. The functions D(s) and S(s) exhibit asymptotic behavior of the form align* D(s) kD sp \ and \ S(s) kS sq, s 1 align* with p,q ∈ R. We prove that itemize when is a ball, if q-p>2-n2 and q>1-n2, there exist radially symmetric initial data u0 and w0, such that the corresponding solutions blow up in finite time; for any general smooth bounded domain ⊂ Rn, if q-p<2-n2, all solutions are globally bounded; for any general smooth bounded domain ⊂ Rn, if q<1-n2, all solutions are global. itemize We point out that our results implies that the system () possess two critical lines q-p=2-n2 and q=1-n2 to classify three dynamics among global boundedness, finite-time blow-up, and global existence of solutions to system ().