Well-posedness and stability for Kirchhoff equation with non-porous acoustic boundary conditions
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Publication:2074430
DOI10.1016/j.jde.2022.01.002zbMath1483.35137OpenAlexW4205360021MaRDI QIDQ2074430
Publication date: 10 February 2022
Published in: Journal of Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jde.2022.01.002
Asymptotic behavior of solutions to PDEs (35B40) Initial-boundary value problems for second-order hyperbolic equations (35L20) Stability in context of PDEs (35B35) Second-order quasilinear hyperbolic equations (35L72)
Related Items (2)
Wave equation with viscoelastic acoustic boundary conditions and supercritical source term ⋮ Well‐posedness and exponential stability for a nonlinear wave equation with acoustic boundary conditions
Cites Work
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- General decay of solutions for Kirchhoff type containing Balakrishnan-Taylor damping with a delay and acoustic boundary conditions
- On the wave equation with semilinear porous acoustic boundary conditions
- Attractors for semilinear damped wave equations with an acoustic boundary condition
- Wave equation in domains with non locally reacting boundary.
- Existence and general decay for nondissipative distributed systems with boundary frictional and memory dampings and acoustic boundary conditions
- General stability for the Kirchhoff-type equation with memory boundary and acoustic boundary conditions
- Nonlinear wave equation with weak dissipative term in domains with non-locally reacting boundary
- Decay rate estimates for wave equations of memory type with acoustic boundary conditions
- Local solutions for a coupled system of Kirchhoff type
- Uniform stabilization of wave equation with localized internal damping and acoustic boundary condition with viscoelastic damping
- Existence and exponential decay for a Kirchhoff-Carrier model with viscosity
- Global existence, decay, and blowup of solutions for some mildly degenerate nonlinear Kirchhoff strings
- Some nonlinear wave equations with acoustic boundary conditions
- Global solutions for dissipative Kirchhoff strings with \(m(r)=r^p\) \((p<1)\)
- On a system of Klein-Gordon type equations with acoustic boundary conditions
- Existence problem for the Kirchhoff type wave equation with a localized weakly nonlinear dissipation in exterior domains
- Uniform energy decay of a variable coefficient wave equation with nonlinear acoustic boundary conditions
- Theoretical analysis and numerical simulation for a hyperbolic equation with Dirichlet and acoustic boundary conditions
- On a nonlinear problem with Dirichlet and acoustic boundary conditions
- Dynamic properties of a nonlinear viscoelastic Kirchhoff-type equation with acoustic control boundary conditions. I
- Arbitrary rate of decay for a viscoelastic equation with acoustic boundary conditions
- General decay of solutions for a weak viscoelastic equation with acoustic boundary conditions
- An application of semigroups of locally Lipschitz operators to Carrier equations with acoustic boundary conditions
- Some remarks on global solutions to nonlinear dissipative mildly degenerate Kirchhoff strings
- Uniform stabilization of wave equation with localized damping and acoustic boundary condition
- On Global Existence, Asymptotic Stability and Blowing Up of Solutions for Some Degenerate Non-linear Wave Equations of Kirchhoff Type with a Strong Dissipation
- General decay of solutions of a wave equation with memory term and acoustic boundary condition
- Wave Equation with Acoustic/Memory Boundary Conditions
- Existence of Solutions for the Kirchhoff-Type Wave Equation with Memory Term and Acoustic Boundary Conditions
- On an evolution equation with acoustic boundary conditions
- Well-posedness and uniform decay rates for the Klein–Gordon equation with damping term and acoustic boundary conditions
- On some quasilinear wave equations with dissipative terms
- Acoustic boundary conditions
- Existence and boundary stabilization of solutions for the kirchhoff equation
- Local uniform stability for the semilinear wave equation in inhomogeneous media with locally distributed Kelvin–Voigt damping
- Uniform decay rate estimates for the semilinear wave equation in inhomogeneous medium with locally distributed nonlinear damping
- A New Method to Obtain Uniform Decay Rates for Multidimensional Wave Equations with Nonlinear Acoustic Boundary Conditions
- Stability for Semilinear Wave Equation in an Inhomogeneous Medium with Frictional Localized Damping and Acoustic Boundary Conditions
- Blow‐up of solution of wave equation with internal and boundary source term and non‐porous viscoelastic acoustic boundary conditions
- General stability of solutions for a viscoelastic wave equations of Kirchhoff type with acoustic boundary conditions
- Existence and asymptotic behaviour for a degenerate Kirchhoff-Carrier model with viscosity and nonlinear boundary conditions
- Global existence and uniform decay rates for the Kirchhoff-Carrier equation with nonlinear dissipation
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