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Asymptotic behavior of small-data solutions to a Keller-Segel-Navier-Stokes system with indirect signal production

Lu Yang; Xi Liu; Zhibo Hou — 2023

Czechoslovak Mathematical Journal

We consider the Keller-Segel-Navier-Stokes system $\{\begin{matrix} n_{t} + 𝐮 \cdot \nabla n = Δ n - \nabla \cdot (n \nabla v), & x \in Ω, t > 0, \\ v_{t} + 𝐮 \cdot \nabla v = Δ v - v + w, & x \in Ω, t > 0, \\ w_{t} + 𝐮 \cdot \nabla w = Δ w - w + n, & x \in Ω, t > 0, \\ 𝐮_{t} + (𝐮 \cdot \nabla) 𝐮 = Δ 𝐮 + \nabla P + n \nabla φ, \nabla \cdot 𝐮 = 0, & x \in Ω, t > 0, \end{matrix}$ which is considered in bounded domain $Ω \subset ℝ^{N}$ $(N \in {2, 3})$ with smooth boundary, where $φ \in C^{1 + δ} (\bar{Ω})$ with $δ \in (0, 1)$ . We show that if the initial data $∥ n_{0} ∥_{L^{N / 2} (Ω)}$ , $∥ \nabla v_{0} ∥_{L^{N} (Ω)}$ , $∥ \nabla w_{0} ∥_{L^{N} (Ω)}$ and $∥ 𝐮_{0} ∥_{L^{N} (Ω)}$ is small enough, an associated initial-boundary value problem possesses a global classical solution which decays to the constant state $({\bar{n}}_{0}, {\bar{n}}_{0}, {\bar{n}}_{0}, 0)$ exponentially with ${\bar{n}}_{0} : = (1 / | Ω |) \int_{Ω} n_{0} (x) d x$ .

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Asymptotic behavior of small-data solutions to a Keller-Segel-Navier-Stokes system with indirect signal production

Uniqueness and multiplicity of solutions for a second-order discrete boundary value problem with a parameter.

Existence of triple positive periodic solutions of a functional differential equation depending on a parameter.