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Applicable Analysis
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Research Article

Uniform stabilization of a variable coefficient wave equation with nonlinear damping and acoustic boundary

Yu-Xiang LiuSchool of the Science, Qingdao University of Technology, Qingdao, Shandong, People's Republic of ChinaCorrespondence[email protected]
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Pages 3347-3364 | Received 08 Aug 2019, Accepted 04 Nov 2020, Published online: 18 Nov 2020

References

  • Morse PM, Ingard KU, Beyer RT. Theoretical acoustics. Journal of Applied Mechanics. 1969;36(2):382–383.
  • Beale JT, Rosencrans SI. Acoustic boundary conditions. Bull Amer Math Soc. 1974;80(6):1276–1279.
  • Beale JT. Spectral properties of an acoustic boundary condition. Ind Univ Math J. 1976;25:895–917.
  • Beale JT. Acoustic scattering from locally reacting surfaces. Ind Univ Math J. 1977;26:199–222.
  • Cousin AT, Frota CL, Larkin NA. On a system of Klein–Gordon type equations with acoustic boundary conditions. J Math Anal Appl. 2004;293(1):293–309.
  • Frota CL, Goldstein JA. Some nonlinear wave equations with acoustic boundary conditions. J Differ Equ. 2000;164(1):92–109.
  • Frota CL, Larkin NA. Uniform stabilization for a hyperbolic equation with acoustic boundary conditions in simple connected domains. Prog Nonlinear Differ Equ Appl. 2005;66:297–312.
  • Gal CG, Gisèle RG, Goldstein JA. Oscillatory boundary conditions for acoustic wave equations. Nonlinear evolution equations and related topics. Basel: Birkh a¨user; 2003.
  • Jameson Graber P. Wave equation with porous nonlinear acoustic boundary conditions generates a well-posed dynamical system. Nonlinear Anal Theor Methods Appl. 2010;73(9):3058–3068.
  • Jameson Graber P. Strong stability and uniform decay of solutions to a wave equation with semilinear porous acoustic boundary conditions. Nonlinear Anal Theor Methods Appl. 2011;74(9):3137–3148.
  • Jameson Graber P, Said-Houari B. On the wave equation with semilinear porous acoustic boundary conditions. J Differ Equ. 2012;252:4898–4941.
  • Lasiecka I. Boundary stabilization of a 3–dimensional structural acoustic model. J De Mathe´matiques Pures Et Applique´s. 1999;78(2):203–232.
  • Mugnolo D. Abstract wave equations with acoustic boundary conditions. Mathematische Nachrichten. 2006;279(3):299–318.
  • Park JY, Kim JA. Some nonlinear wave equations with nonlinear memory source term and acoustic boundary conditions. Numer Funct Anal Optim. 2006;27:889–903.
  • Park JY, Ha TG. Well-posedness and uniform decay rates for the Klein–Gordon equation with damping term and acoustic boundary conditions. J Math Phys. 2009;50(1):895–312.
  • Park JY, Park SH. Decay rate estimates for wave equations of memory type with acoustic boundary conditions. Nonlinear Anal. 2011;74(3):993–998.
  • Rivera JEM, Qin Y. Polynomial decay for the energy with an acoustic boundary condition. Appl Math Lett. 2003;16(2):249–256.
  • Vicenté A. Wave equation with acoustic/memory boundary conditions. Boletim Da Sociedade Paranaense De Matemática. 2009;27(1):29–39.
  • Yao PF. Observability inequality for exact controllability of wave equations with variable coefficients. SIAM J Control Optim. 1999;37(5):1568–1599.
  • Yao PF. Energy decay for the Cauchy problem of the linear wave equation of variable coefficients with dissipation. Chin Ann Math Ser B. 2010;31(1):59–70.
  • Yao PF. Modeling and control in vibrational and structural dynamics. A differential geometric approach. CRC Press; 2011. (Chapman and Hall/CRC Applied Mathematics and Nonlinear Science Series).
  • Lasiecka I, Triggiani R, Yao PF. Inverse/observability estimates for second-order hyperbolic equations with variable coefficients. J Math Anal Appl. 1999;235(1):13–57.
  • Feng SJ, Feng DX. Boundary stabilization of wave equations with variable coefficients. Sci China Ser A. 2001;44(3):345–350.
  • Guo BZ, Shao ZC. On exponential stability of a semilinear wave equation with variable coefficients under the nonlinear boundary feedback. Nonlinear Anal Theor Methods Appl. 2009;71(12):5961–5978.
  • Wu J. Well–posedness for a variable-coefficient wave equation with nonlinear damped acoustic boundary conditions. Nonlinear Anal Theory Methods Appl. 2012;75(18):6562–6569.
  • Wu J. Uniform energy decay of a variably coefficient wave equation with nonlinear acoustic boundary conditions. J Math Anal Appl. 2013;399(1):369–377.
  • Wu J, Li S, Feng F. Energy decay of a variable-coefficient wave equation with memory type acoustic boundary conditions. J Math Anal Appl. 2016;434(1):882–893.
  • Liu Y, Li J, Yao P. Decay rates of the hyperbolic equation in an exterior domain with half-Linear and nonlinear boundary dissipations. J Syst Sci Complex. 2016;29(3):657–680.
  • Liu Y, Bin-Mohsin B, Hajaiej H, et al. Exact controllability of structural acoustic interactions with variable coefficients. SIAM J Control and Optim. 2016;54(4):2132–2153.
  • Liu Y. Exact controllability of the wave equation with time-dependent and variable coefficients. Nonlinear Anal Real World Appl. 2019;45:226–238.
  • Rebiai SE. Uniform energy decay of Schr o¨dinger equations with variable coefficients. IMA J Math Control Inf. 2003;20(3):335–345.
  • Zhang ZF. Periodic solutions for wave equations with variable coefficients with nonlinear localized damping. J Math Anal Appl. 2010;363:549–558.
  • Wu H, Shen CL, Yu YL. An introduction to Riemannian geometry (in Chinese). Beijing: Beijing University Press; 1989.
  • Liu K. Locally distributed control and damping for the conservative systems. SIAM J Control Optim. 1997;35:1574–1590.
  • Zhang ZF, Yao PF. Global smooth solutions of the quasi-linear wave equation with internal velocity feedback. SIAM J Control Optim. 2008;47(4):2044–2077.
  • Feng S, Feng D. Locally distributed control of wave equation with variable coefficients. Sci China Ser. 2001;44:309–315.
  • Prüss J. Evolutionary integral equations and applications. Basel: Birkh a¨user-Verlag; 1993.
  • Lasiecka I, Tartaru D. Uniform boundary stabilization of semilinear wave equation with nonlinear boundary damping. Differ Integr Equ. 1993;3:507–533.
  • Lasiecka I, Triggiani R. Uniform stabilization of the wave equation with Dirichlet or Neumann feedback control without geometrical conditions. Appl Math Optim. 1992;25(2):189–224.
  • Aubin JP. Un th e´or e`me de compacit e´. Comptes Rendus Hebdomadaires Des Sances De Lacade´mie Des Sciences. 1963;256(2):5042–5044.

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