https://orcid.org/0000-0003-2959-1855
References
- Chkadua G, Natroshvili D. Mathematical aspects of fluid-multiferroic solid interaction problems. Math Methods Appl Sci. 2020. DOI: 10.1002/mma.7108.
- Hsiao GC, Sánchez-Vizuet T. Time-dependent wave-structure interaction revisited: thermo-piezoelectric scatterers. Fluids. 2021;6(101):1–19. DOI:10.3390/fluids6030101.
- Gatica GN, Hsiao GC. Boundary-field equation methods for a class of nonlinear problems. Harlow: Longman Group Ltd; 1995. (Pitman Research Notes in Mathematics Series; 331).
- Hassell ME, Qiu T, Sánchez-Vizuet T, et al. A new and improved analysis of the time domain boundary integral operators for acoustics. J Integral Equ Appl. 2017;29(1):107–136.
- Hsiao GC, Sayas F-J, Weinacht RJ. Time-dpendent fluid-structure Iiteraction. Math. Methods Appl Sci. 2017;40:486–500. Article first published online 19 Mar 2015, DOI: 10.10.1137/14099173X.
- Gilbert RP, Hsiao GC. Time dependent solutions for the Biot equations. In: Rogosin S, elebi AO, editors. Analysis as a life, trends in mathematics. Basel: Birkhäuser; 2019, p. 171–191. (Springer Nature Switzerland AG). DOI:10.1007/978-3-030-02650-9.
- Sánchez-Vizuet T, Sayas F-J. Symmetric boundary-finite element discretization of time dependent acoustic scattering by elastic obstacles with piezoelectric behavior. J Sci Comput. 2017;70(3):1290–1315.
- Acheson AJ. Elementary fluid dynamics. Oxford: Clarendon Press; 1990. (Oxford Applied Mathematics and Computing Science Series).
- Serrin J. Mathematical principles of classical fluid mechanics. Vol. 8/1. Berlin: Springer; 1959. p. 3–26. (Handbuch der Physik).
- Mindlin RD. On the equations of motion of piezoelectric crystals. In: Muskilishivili NI, editor. Problems of continuum mechanics. Philadelphia: SIAM; 1961.
- Aouadi M. Some theorems in the generalized theory of thermo-magnetoelectroelasticity under Green-Lindsay's model. Acta Mech. 2008;200(1–2):5–43.
- Natroshvili D. Mathematical problems of thermo-electro-magneto-elasticity. Tbilisi: Tbilisi University Press.2011. (Lecture Notes of TICMi; 12).
- Kupradze VD. Three-dimensional problems of the mathematical theory of elasticity and thermoelasticity. Amsterdam, New York, Oxford: North-Holland Publishing Company; 1979. (North-Holland Series in Applied Mathematics and Mechanics; p. 164).
- Nowacki W. Some general theorems of thermopiezoelectricity. J Thermal Stress. 1978;1:171–182.
- Nowacki W. Electromagnetic interaction in elastic solids. In: H Parkus, editor. International centre for mechanical sciences. Wien: Springer-Verlag; 1979.
- Hsiao GC, Kleinman RE, Roach GF. Weak solutions of fluid-solid interaction problems. Math Nachr. 2000;218:139–163.
- Lubich Ch. On the multistep time discretization of linear initial-boundary value problems and their boundary integral equations. Numer Math. 1994;67(3):365–389.
- Lubich Ch., Schneider R. Time discretization of parabolic boundary integral equations. Numer Math. 1992;63(4):455–481.
- Laliena AR, Sayas F-J. Theoretical aspects of the application of convolution quadrature to scattering off acoustic waves. Numer Math. 2009;112:637–678.
- Sayas F-J. Retarded potentials and time domain boundary integral equations: a road-map. Cham: Springer; 2016. (Computational Mathematics; 50).
- Hsiao GC, Wendland WL. Boundary integral equations. 2nd ed., Berlin: Springer; 2021. (Applied Mathematical Sciences; 164).
- Fichera G. Existence theorems in elasticity theory. Berlin: Springer; 1972. p. 347–389 (Handbuch der Physik; 2).
- Sayas F-J. Errata to: Retarded potentials and time domain boundary integral equations: a road-map. https://team-pancho.github.io/documents/ERRATA.pdf.
- Hamdi MA, Jean P. A mixed functional for the numerical resolution of wave-structure interaction problems. In: Comte-Bellot G and William J E, editors. Aero- and Hydro-Acoustic IUTAM Symposium. Berlin: Springer-Verlag; 1985. p. 269–276.
- C.Hsiao G. On the boundary-field equation methods for fluid-structure. In: Jentsch L and Tröltzsch F, editors. Problems and Methods in Mathematical Physics. Stuttgart, Leipzig: B. G. Teubner Veriagsgesellschaft; 1994. p. 79–88. (Teubner-Texte zur Mathematik, Band; 134).
- Hsiao GC, Kleinman RE, Schuetz LS. On variational formulations of boundary value problems for fluid-solid interactions. In: McCarthy MF and Hayes MA, editors. Elastic Wave Propagation I.T.U.A.M. -I.U.P.A.P. Symposium; North-Holland: Elsevier Science Publishers B.V.; 1989. p. 321–326.
- Hsiao GC, Sánchez-Vizuet T, Sayas F-J. Boundary and coupled boundary-finite element methods for transient wave-structure interaction. IMA J Numer Anal. 2016;37(1):237–265.
- Hsiao GC, Sánchez-Vizuet T, Saya FJ, et al. A time-dependent wave-thermoelastic solid interaction. IMA J Numer Anal. 2019;39:924–956. DOI: 10.1093/imanum/dry016, Advance Access publication on 10 April 2018.
- Brown TS, Sánchez-Vizuet T, Sayas F-J. Evolution of a semidiscrete system modeling the scattering of acoustic waves by a piezoelectric solid. ESAIM: Math Model Numer Anal. 2018;52(2):423–455.
- Schanz M. Wave propagation in viscoelastic and poroelastic continua, a boundary element approach. Berlin: Springer-Verlag; 2001. (Lecture Notes in Applied Mechanics; 2).
- Banjai L, Lubich C, Sayas FJ. Stable numerical coupling of exterior and interior problems for the wave equation. Numer Math. 2015;129:611–646.