Global existence of solutions to the chemotaxis system with logistic source under nonlinear Neumann boundary condition

Abstract

We consider classical solutions to the chemotaxis system with logistic source f(u) := au-μ u2 under nonlinear Neumann boundary condition ∂ u ∂ = |u|p with p>1 in a smooth convex bounded domain ⊂ Rn where n ≥ 2. This paper aims to show that if p<32, and μ >0, n=2, or μ is sufficiently large when n≥ 3, then the parabolic-elliptic chemotaxis system admits a unique positive global-in-time classical solution that is bounded in × (0, ∞). The similar result is also true if p<32, n=2, and μ>0 or p<75, n=3, and μ is sufficiently large for the parabolic-parabolic chemotaxis system.

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