References
- Bukac M, Canic S, Muha B. A partitioned scheme for fluid-composite structure interaction problems. J Comput Phys. 2015;281:493–517.
- Muha B. A note on optimal regularity and regularizing effects of point mass coupling for a heat-wave system. J Math Anal Appl. 2015;425(2):1134–1147.
- Avalos G, Triggiani R. The coupled PDE system arising in fluid-structure interaction, Part I: explicit semigroup generator and its spectral properties. Contemp Math. 2007;440:15–54.
- Avalos G, Triggiani R. Semigroup well-posedness in the energy space of a parabolic-hyperbolic coupled Stokes-Lamé PDE system of fluid-structure interaction. Discrete Contin Dyn Syst Ser S. 2009;2(3):417–447.
- Barbu V, Grujic Z, Lasiecka I, et al. Existence of the energy level weak solutions for a nonlinear fluid-structure interaction model, fluids and waves. In: Contemporary mathematics Vol. 440. Providence (RI): American Mathematical Society; 2007. p. 55–82.
- Bodnár T, Galdi GP, Nečasová S. Fluid-structure interaction and biomedical applications. Basel: Birkhäuser/Springer; 2014.
- Čanić S. New mathematics for next-generation stent design. SIAM News. 2019 Apr.
- Chambolle A, Desjardins B, Esteban MJ, et al. Existence of weak solutions for the unsteady interaction of a viscous fluid with an elastic plate. J Math Fluid Mech. 2005;7(3):368–404.
- Coutand D, Shkoller S. Motion of an elastic solid inside an incompressible viscous fluid. Arch Ration Mech Anal. 2005;176:25–102.
- Du Q, Gunzburger MD, Hou LS, et al. Analysis of a linear fluid-structure interaction problem. Discrete Contin Dyn Syst. 2003 May;9(3):633–650.
- Gazzola F, Bonheure D, Sperone G. Eight(y) mathematical questions on fluids and structures. preprint, http://www1.mate.polimi.it/gazzola/turbulence.pdf.
- Lions J-L. Quelques méthodes de résolution des problemes aux limites non linéaires. Vol 31. Paris: Dunod; 1969.
- Richter T. Fluid-structure interactions. Lecture Notes in Computational Science and Engineering. Vol. 118. Springer, Cham; 2017.
- Levan N. The stabilizability problem: a Hilbert space operator decomposition approach. IEEE Trans Circuits Syst. 1978;CAS-25(9):721–727.
- Quinn J, Russell DL. Asymptotic stability and energy decay rates for solutions of hyperbolic equations with boundary damping. Proc R Soc Edinburgh Sec A. 1977;77:97–127.
- Triggiani R. Wave equation on a bounded domain with boundary dissipation: an operator approach. J Math Anal Appl. 1989;137:438–461.
- Slemrod M. Stabilization of boundary control systems. J Differ Equ. 1976;22:402–415.
- Lagnese J. Decay of solutions of wave equations in a bounded region with boundary dissipation. J. Differ Equ. 1983;50:163–182.
- Avalos G, Geredeli PG, Muha B. Wellposedness, spectral analysis and asymptotic stability of a multilayered heat-wave-wave system. J Differ Equ. 2020;269:7129–7156.
- Arendt W, Batty CJK. Tauberian theorems and stability of one-parameter semigroups. Trans Am Math Soc. 1988;306:837–852.
- Chen G. A note on the boundary stabilization of the wave equation. SIAM J Control Optim. 1981;19:106–113.
- Horn MA. Implications of sharp trace regularity results on boundary stabilization on the system of linear elasticity. J Math Anal Appl. 1998;223:126–150.
- Tomilov Y. A resolvent approach to stability of operator semigroups. J Operator Theory. 2001;46:63–98.
- Eller M, Toundykov D. A global Holmgren Theorem for multidimensional hyperbolic partial differential equations. Appl Anal. 2012;91(1):69–90.
- Grisvard P. Singularities in boundary value problems. New York: Springer-Verlag; 1992. (Research Notes in Applied Mathematics; 22).
- Rauch J, Zhang X, Zuazua E. Polynomial decay for a hyperbolic-parabolic coupled system. J Math Pures Appl (9). 2005;84(4):407–470.
- Duyckaerts T. Optimal decay rates of the energy of a hyperbolic-parabolic system coupled by an interface. Asymptot Anal. 2007;51(1):17–45.
- Avalos G, Triggiani R. Rational decay rates for a PDE heat-structure interaction: a frequency domain approach. Evol Equ Control Theory. 2013;2(2):233–253.
- Avalos G, Triggiani R. Uniform stabilization of a coupled PDE system arising in fluid-structure interaction with boundary dissipation at the interface. Discrete Contin Dyn Syst. 2008;22(4):817–833.
- Avalos G, Lasiecka I, Triggiani R. Heat-wave interaction in 2–3 dimensions: optimal rational decay rate. J Math Anal Appl. 2016;437(2):782–815.
- Avalos G, Geredeli PG. Uniform stability for solutions of a structural acoustics PDE model with no added dissipative feedback. Math Methods Appl Sci. 2016;39(18):5497–5512.
- Avalos G, Geredeli PG. Stability analysis of coupled structural acoustics PDE models under thermal effects and with no additional dissipation. Math Nachr. 2019;292(5):939–960.
- Lasiecka I, Lebiedzik C. Decay rates of interactive hyperbolic-parabolic PDE models with thermal effects on the interface. Appl Math Optim. 2000;42:127–167.
- Chill R, Tomilov Y. Stability of operator semigroups: ideas and results. Perspectives in operator theory Banach center publications. Vol. 75. Warszawa: Institute of Mathematics Polish Academy of Sciences; 2007. p. 71–109.
- Boyadzhiev KN, Levan N. Strong stability of Hilbert space contraction semigroups. Stud Sci Math Hungar. 1995;30(3–4):165–182.
- Lyubich YI, Phong VQ. Asymptotic stability of linear differential equations in Banach Spaces. Stud Mat. 1988. 37–42.
- Eller M, Isakov V, Nakamura G, et al. Uniqueness and stability in the Cauchy problem for Maxwell's and elasticity systems, in Lions J-L Nonlinear PDE, College de France Seminar, Series in Applied Mathematics. Vol. 7, 2002.
- Nicaise S. About the Lame system in a polygonal or polyhedral domain and a coupled problem between the Lame system and the plate equation I: Regularity of the solutions. Ann Scud Norm Super Pisa Sci. 1992;19(3):327–361.
- Bernardi C, Dauge M, Maday Y. Polynomials in the Sobolev world. preprint 2007. hal-00153795vI.
- Eller M. Personal communication. 2021.