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Mathematical and numerical aspects of wave propagation. 5th international conference, Santiago de Compostela, Spain, July 10–14, 2000. (English) Zbl 0943.00077

Philadelphia, PA: SIAM, Society for Industrial and Applied Mathematics. Rocquencourt: INRIA, Institut National de Recherche en Informatique et en Automatique, xvi, 1038 p. (2000).

Show indexed articles as search result.

The articles of this volume will be reviewed individually. The preceding conference (4th, 1998) has been reviewed (see Zbl 0904.00054).
Indexed articles:
Arens, T.; Chandler-Wilde, S. N.; Meier, A., Integral equation methods for scattering by one-dimensional rough surfaces, 3-13 [Zbl 0970.76089]
Craig, Walter; Sulem, Catherine, The water-wave problem and its long-wave and modulational limits, 14-23 [Zbl 0968.76009]
Michielssen, Eric; Ergin, Arif; Shanker, Balasubramaniam; Weile, Daniel, The multilevel plane wave time domain algorithm and its applications to the rapid solution of electromagnetic scattering problems: A review, 24-33 [Zbl 0988.78019]
Zuazua, Enrique, Wave propagation and the control of vibrations, 34-42 [Zbl 0987.74038]
Ayrault, Christophe; Castagnède, Bernard; Moussatov, Alexeï, Ultrasonic characterization of porous materials saturated with compressed air by temporal signal analysis, 47-52 [Zbl 0983.74033]
Khelil, Saloua Ben; Merlen, Alain; Preobrazhensky, Vladimir; Pernod, Philippe, A numerical approach to acoustic wave phase conjugation in active media, 53-57 [Zbl 0976.76080]
Bonnet-Ben Dhia, A.-S.; Dahi, Lynda; Lunéville, Eric; Pagneux, Vincent, Acoustic diffraction by a rigid plate in a uniform flow, 58-62 [Zbl 0968.76077]
Denia, Francisco D.; Albelda, José; Payri, Raúl; Baeza, Luis, Wave propagation in mufflers with elliptical cross-section, 63-67 [Zbl 0977.76076]
Denia, Francisco D.; Albelda, José; Torregrosa, Antonio J.; Tur, Manuel, Mode-matching technique applied to reversing mufflers. Comparison with other analytical solutions, 68-72 [Zbl 0991.76075]
Fellah, Z. E. A.; Depollier, C.; Fellah, M., Propagation of ultrasonic pulses in porous elastic solids: A time-domain analysis with fractional derivatives, 73-79 [Zbl 0993.74028]
Khismatullin, D. B.; Akhatov, I. Sh., Two-dimensional long-wave/short-wave interaction in bubbly liquids., 80-85 [Zbl 1072.76678]
Kovalevsky, Valery V., Modeling of excitation of surface seismic wave by acoustic wave, 86-89 [Zbl 0979.74036]
Nigam, Nilima, A variational method in acoustics related to an impenetrable scatterer coated by a thin penetrable shell, 90-95 [Zbl 0972.76095]
Abramian, A.; Vakulenko, S., Solitary wave motion in hydroelastic systems., 99-102 [Zbl 1072.74516]
Andronov, I. V., Waves propagating along a narrow crack in an elastic plate., 103-107 [Zbl 1072.74517]
Arens, T., Elastic wave scattering by a rough surface, 108-112 [Zbl 0961.74035]
Berezovski, Arkadi; Engelbrecht, Juri; Maugin, Gerard A., Two-dimensional thermoelastic wave propagation in inhomogeneous media, 113-117 [Zbl 0972.74038]
Bermúdez, A.; Hervella-Nieto, L.; Rodríguez, R., A modal reduction method for the elastoacoustic vibration problem, 118-122 [Zbl 1004.74026]
Bofill, Francesc; Quintanilla, Ramón, On a backward in time problem arising in viscoelasticity, 123-127 [Zbl 0989.74030]
Carcione, José M.; Arnsten, Børge; Cavallini, Fabio, Simulation of ultrasonic waves in a natural sandstone, 128-132 [Zbl 0993.74027]
Denneman, A. I. M.; Drijkoningen, G. G.; Smeulders, D. M. J.; Wapenaar, C. P. A., Reflection and transmission of waves at an impermeable interface between a fluid and a porous medium, 133-137 [Zbl 0990.74029]
Ditzel, Auke; Herman, Gérard, Response of a layered elastic half-space to a moving high-speed train., 138-142 [Zbl 1039.74024]
Durand, Marc; Guediri, Hocine, A new system of integral equations for the elasto-acoustic coupling problem, 143-147 [Zbl 0989.74019]
Fialkovsky, Ignat V.; Kiselev, Aleksei P.; Perel, Maria V., Wave propagation in a nonuniform Timoshenko beam in presence of a point of phase velocities intersection., 148-152 [Zbl 1166.74368]
Glema, Adam, Dispersive waves in solid mechanics of elasto-viscoplastic material, 153-157 [Zbl 0995.74029]
Gvozdovskaya, Natalia I.; Kulikovskii, Andrey G., Peculiar structure of the set of admissible discontinuities in problems with dispersion, 158-162 [Zbl 0973.74040]
Hanyga, Andrzej; Carcione, José M., Numerical solutions of a poro-acoustic wave equation with generalized fractional integral operators, 163-167 [Zbl 0990.74079]
Klíe, Héctor; Toro, William, Modeling in transversely isotropic media with the acoustic wave equation, 168-172 [Zbl 1004.74043]
Konyukh, Galina V.; Mikhailenko, Boris G.; Mikhailov, Alexandr A., Viscoelastic modeling by spectral Laguerre method, 173-176 [Zbl 0982.74035]
Laurens, Jérôme, Regular and singular perturbations of transmission problems in linear acoustics or systems related to the wave equation, 177-181 [Zbl 0980.76084]
Martin, P. A.; Berger, J. R., Waves in wood: Elastic waves in cylindrically orthotropic materials, 182-186 [Zbl 1003.74041]
Pavlovskaya, Ekaterina E., Role of waves propagation process in transient motion of a few masses situated on a surface of an elastic medium, 187-191 [Zbl 1003.74044]
Quintanilla, R., Logarithmic convexity in thermoelasticity of type III, 192-196 [Zbl 0989.74016]
Tambača, Josip; Tutek, Zvonimir, Evolution model of curved rods, 197-201 [Zbl 0987.74045]
Turhan, Doğan; Şen, Özge, Transient wave propagation in encased viscoelastic cylinders, 202-207 [Zbl 1001.74061]
Ammari, Habib; Bao, Gang; Van, Tri; Wood, Aihua W., Electromagnetic scattering from cavities, 211-215 [Zbl 1006.78008]
Ammari, H.; Buffa, A.; Nédélec, J.-C., Topology dependence of the approximation properties of eddy currents model for Maxwell’s equations, 216-220 [Zbl 0992.78501]
Bidégaray, B.; Bourgeade, A.; Reignier, D.; Ziolkowski, R. W., Multi-level Maxwell-Bloch simulations, 221-225 [Zbl 0983.78020]
Bouchitté, Guy; Felbacq, Didier, Low frequency scattering by a set of parallel metallic rods, 226-230 [Zbl 0986.78026]
Castro, Luís P., Solution of a wave diffraction problem by a magnetic strip, 231-235 [Zbl 0983.78015]
Figotin, Alex; Godin, Yuri A., An asymptotic model of three-dimensional photonic crystal, 236-240 [Zbl 0982.82026]
Proekt, Leonid; Yuferev, Sergey; Ida, Nathan, Calculation of the surface impedance near an imperfectly conducting edge, 241-245 [Zbl 0988.78005]
Smith, Paul D.; Vinogradova, Elena D., Mixed boundary value problems of diffraction theory: The spheroidal cavity, 246-252 [Zbl 0981.78502]
Ablowitz, M. J.; Hammack, J.; Henderson, D.; Schober, C. M., Chaotic dynamics of deep water gravity waves, 255-259 [Zbl 0986.76008]
Andrianov, I. V.; Awrejcewicz, J., Non-traditional asymptotic approaches to investigation of wave nonlinear equation, 260-264 [Zbl 0962.35125]
Antonopoulos, D. C.; Dougalis, V. A., Numerical approximations of Boussinesq systems, 265-269 [Zbl 0976.76015]
Ben Youssef, Walid; Colin, Thierry, Rigorous derivation of the Korteweg-de Vries type systems from a general class of nonlinear hyperbolic systems, 270-273 [Zbl 0960.35091]
Chen, Min, A plethora of multi-pulsed solutions for a Boussinesq system, 274-279 [Zbl 0960.76016]
Clarke, Simon; Grimshaw, Roger; Malomed, Boris A., Soliton formation in a variable coefficient nonlinear Schrödinger equation, 280-284 [Zbl 0959.35152]
Daripa, Prabir; Dash, Ranjan K., Studies of capillary ripples in a sixth-order Boussinesq equation arising in water waves, 285-291 [Zbl 0968.76011]
Debussche, Arnaud, A stochastic nonlinear Schrödinger equation, 292-295 [Zbl 0963.60052]
Fokas, A. S.; Pelloni, B., Boundary value problems for linearized Boussinesq type systems, 296-301 [Zbl 0962.35141]
Gavrilov, Serge, Non-stationary nonlinear waves induced in a string by a moving concentrated load overcoming the critical velocity, 302-306 [Zbl 0991.74035]
Gutiérrez, Susana, \(L^q\) solutions to the Ginzburg-Landau equation, 307-309 [Zbl 0960.35094]
Halpern, Laurence; Labbé, Stéphane, From the quasi-static to the dynamic Maxwell’s model in micromagnetism, 310-314 [Zbl 0962.78005]
Hayashi, Nakao; Kaikina, Elena I.; Naumkin, Pavel I., Large time behavior of solutions to the Landau-Ginzburg type equations, 315-319 [Zbl 0958.35128]
Jochmann, Frank, Asymptotic behavior of solutions to the anharmonic oscillator model from nonlinear optics, 320-323 [Zbl 1017.78518]
Kalisch, Henrik; Bona, Jerry L., Solitary waves in a two-fluid system that includes surface tension, 324-328 [Zbl 0960.76017]
Komech, Alexander; Spohn, Herbert; Imaikin, Valery, Soliton-like asymptotics for the coupled Maxwell-Lorentz equations, 329-333 [Zbl 0963.35183]
Lannes, David, Continuous oscillating spectrum and Raman scattering, 334-338 [Zbl 0956.78003]
Li, Y. A., The eigenvalue problem for solitary waves of the Green-Naghdi equations, 339-343 [Zbl 0980.76025]
Manna, M. A., Short waves in the Green-Naghdi system and others fluid dynamics model equations, 344-349 [Zbl 0973.76014]
Miller, Judith R., The dispersive regime in a modified Kuramoto-Sivashinsky system, 350-353 [Zbl 0959.35146]
Oberle, William F.; Rostamian, Rouben, Traveling waves in layered combustible media, 354-358 [Zbl 0962.80500]
Pego, Robert L., Spatial dynamics in oblique wave interactions, 359-363 [Zbl 0973.76013]
Sergeyev, Alexander D., Dissipation of the trapped oscillation energy in the nonlinear string with inertia inclusions, 364-368 [Zbl 1008.74042]
Skiba, Yuri N.; Strelkov, Andrei Y., Linear instability conditions for steady waves in ideal incompressible fluid on a rotating sphere., 369-373 [Zbl 1072.76546]
Sung, Li-Yeng, Initial boundary value problems for linear dispersive evolution equations on the half-line, 374-378 [Zbl 0958.35018]
Vainshtein, P.; Shapiro, M.; Gutfinger, C., High-frequency waves in suspensions near the critical point of the particulate pressure-density dependence, 379-381 [Zbl 0976.76092]
Varlamov, Vladimir, Long-time behavior for the nonlinear heat equation with a fractional Laplacian in a ball, 382-385 [Zbl 0959.35094]
Berger, J. R.; Martin, P. A.; McCaffery, S. J., Torsional waves in composite co-axial cylinders with imperfect interfaces, 389-393 [Zbl 0977.74034]
Bonnet-Ben Dhia, A.-S.; Dahi, L., The behavior of the generalized Stoneley waves when the density of the fluid tends to zero, 394-398 [Zbl 0976.74032]
Bonnet-Ben Dhia, A.-S.; Tillequin, A., A generalized mode matching method for the junction of open waveguides, 399-403 [Zbl 0983.78017]
Djellouli, Rabia; Bekkey, Chokri, A finite element solution of guided modes of optical fibers using a local non-reflecting boundary condition, 404-408 [Zbl 0995.78022]
Drozdova, Julia A., Propagation of a solitary wave in a channel: Effect of bottom unevenness, 409-413 [Zbl 0976.76016]
Karchevskii, Evgenii, Mathematical analysis and numerical modelling of the guided modes of the step-index optical fibers, 414-418 [Zbl 0962.78011]
Linton, C. M.; McIver, P.; McIver, M.; Zhang, J., Embedded trapped modes, 419-423 [Zbl 0960.76082]
Mochalova, Yulia; Indeitsev, Dmitry, Trapped modes above a die oscillating on the bottom of a wave channel, 424-427 [Zbl 0976.76013]
Motygin, Oleg V., Frequency bounds for modes trapped near a channel-spanning cylinder., 428-432 [Zbl 1072.76524]
Salgueiro, José R.; Liñares, Jesús; Moreno, Vicente; Nistal, María C., Numerical test for the modal field separability of step index channel waveguides with separable equivalent index profile, 433-437 [Zbl 0995.78025]
Tausch, Johannes, Numerical analysis of dielectric periodic waveguides via Dirichlet-to-Neumann maps, 438-442 [Zbl 0983.78018]
Ammari, Habib; Bao, Gang, Modeling of near-field optics, 445-449 [Zbl 1006.78015]
Bochniak, Marius; Cakoni, Fioralba, Domain sensitivity analysis for acoustic scattering problems, 450-454 [Zbl 0990.76079]
Borovikov, V. A., Singularities of the Green function for non-strictly hyperbolic operators, 455-459 [Zbl 0960.35060]
Boutet de Monvel, Anne; Shepelsky, Dmitry, Riemann-Hilbert problem and frequency-domain inverse problem for a stratified omega medium, 460-464 [Zbl 0995.78019]
Bruno, Oscar P.; Kunyansky, Leonid A., Fast, high-order solution of surface scattering problems, 465-470 [Zbl 0992.78510]
Bruno, Oscar P.; Reitich, Fernando, Solution of Laplace-eigenvalue problems via variation of the boundary into the complex domain, 471-476 [Zbl 0962.35133]
Bruno, Oscar; Sei, Alain; Caponi, Maria, High order high frequency solutions of rough surface scattering problems, 477-481 [Zbl 0992.78505]
Buchanan, J. L.; Gilbert, R. P.; Ou, M., Implementation of the method of variation of boundaries for three-dimensional objects in a waveguide, 482-488 [Zbl 0989.76007]
Hähner, Peter; Kress, Rainer, Uniqueness for a linearized, inverse obstacle problem using backscattering data, 489-493 [Zbl 0958.35093]
Hazard, Christophe, The singularity expansion method: An application in hydrodynamics, 494-498 [Zbl 0960.76072]
Kirsch, Andreas, A new class of methods for solving inverse scattering problems, 499-503 [Zbl 0961.35177]
Kuznetsov, Nikolay G., Uniqueness in the water-wave problem for a vertical shell, 504-508 [Zbl 0971.76015]
Lipachev, Evgeny, On boundary integral equation methods in scattering problems for unbounded domains, 509-512 [Zbl 0983.78024]
Meier, A.; Chandler-Wilde, S. N., On the stability and convergence of the finite section method for integral equation formulations of rough surface scattering, 513-517 [Zbl 0959.35133]
Molchanov, S.; Vainberg, B., Multiscattering by sparse scatterers, 518-522 [Zbl 0959.35130]
Nizhnik, L. P., Inverse scattering problem for the multidimensional first-order hyperbolic system, 523-527 [Zbl 0961.35178]
Poirier, J.-R.; Bendali, A.; Borderies, P., Impedance boundary condition for rapidly oscillating surface scatterers, 528-532 [Zbl 1006.78009]
Ségui, Lionel, A modified Gauss-Newton method for the detection of defects in lossy diffractive media, 533-537 [Zbl 0965.78015]
Vaudon, Patrick, A representation of the edge diffracted field with the help of a non integer derivative, 538-542 [Zbl 0962.78009]
Xu, Yongzhi, Generalized dual space indicator method for inverse scattering problems in underwater acoustics, 543-547 [Zbl 0965.76077]
Zhevandrov, Peter; Merzon, Anatoli, Exact finite energy solution of the Neumann problem for the Helmholtz equation in a plane angle, 548-552 [Zbl 0957.35039]
Bakhvalov, N. S.; Eglit, M. E., Effective model with dispersion for long wave propagation in stratified media, 555-558 [Zbl 0980.74032]
Bal, Guillaume; Moscoso, Miguel, Radiative transfer for wave propagation in random media. Monte Carlo simulations of seismic waves, 559-563 [Zbl 1001.74060]
Bonnet-Ben Dhia, Anne-Sophie; Drissi, Dorra; Gmati, Nabil, Determination of muffler’s transmission losses by homogenization and finite element method, 564-568 [Zbl 0976.76074]
Borysenko, S.; Limarchenko, O.; Matarazzo, G., Asymptotic approximations for wave processes in disperse media with slowly changed inhomogeneities, 569-573 [Zbl 0958.35076]
Chattopadhyay, Gayatri; Bhattacharyya, R. K., Acoustic wave propagation in random fluid medium, 574-577 [Zbl 0973.76079]
Haddar, H.; Joly, P., Electromagnetic waves in laminar ferromagnetic medium: The homogenized problem, 578-582 [Zbl 0983.78014]
Orive, R., Correctors in periodic homogenization via Bloch decomposition, 583-587 [Zbl 0974.35009]
Savin, E.; Clouteau, D.; Aubry, D., Dynamic soil-structure interaction: Stochastic simulations, 588-592 [Zbl 0960.74049]
Sølna, K., Acoustic pulse shaping and localization in a random fractal, 593-596 [Zbl 0960.76083]
Zhevandrov, Peter, Singular boundary perturbations for trapped waves, 597-601 [Zbl 0960.76015]
Besse, C., Relaxation scheme for time dependant nonlinear Schrödinger equations, 605-609 [Zbl 0958.65095]
Carles, Rémi, Geometric optics with caustic crossing for nonlinear Schrödinger equations, 610-615 [Zbl 0988.78003]
Naumkin, Pavel I., Global solutions to the cubic derivative nonlinear Schrödinger equations, 616-620 [Zbl 0958.35130]
Schädle, Achim, Non-reflecting boundary condition for a Schrödinger-type equation, 621-625 [Zbl 0959.35143]
Shull, Randy; Bu, Charles; Wang, Hefei; Chu, Millie, On the forced nonlinear Schrödinger equation, 626-630 [Zbl 0960.35095]
Weder, Ricardo, Uniqueness of inverse scattering for the nonlinear Schrödinger equation and reconstruction of the potential and the nonlinearity, 631-634 [Zbl 0959.35156]
Cherkaev, Elena, A new inversion method for dissipating electromagnetic problem, 637-642 [Zbl 1006.78011]
Cognet, Jean-Marc; De Roeck, Yann-Hervé; Chavent, Guy, The seismic inverse problem with a source identification, 643-647 [Zbl 0982.74036]
Cristofol, Michel; Gaitan, Patricia, Inverse problem for a multistratified acoustic strip, 648-652 [Zbl 0976.76079]
El Badia, A.; Ha-Duong, T., On inverse acoustic source problems, 653-656 [Zbl 0960.35109]
Fokin, V. N., Using of frequency dependence of sound reflectivity for elastic layered bottom reconstruction, 657-661 [Zbl 1004.74044]
Gustafsson, Mats, Inverse scattering for temporally dispersive medium, 662-666 [Zbl 1006.78012]
Ludwig, B.; Terrasse, I.; Alestra, S.; Duceau, E.; Ha-Duong, Tuong, Inverse acoustic impedance problem using the delayed time-domain boundary integral method., 667-671 [Zbl 1072.76592]
Mulder, W. A.; ten Kroode, A. P. E., Automatic velocity analysis of seismic data with differential semblance optimisation, 672-677 [Zbl 0992.86004]
Pianelo, L.; Gallouët, T.; Guérillot, D., Simultaneous inversion of the wave and flow equations: applications in oil recovery., 678-682 [Zbl 1072.76672]
Plessix, René-Edouard; Mulder, Wim; ten Kroode, Fons, The gradient of the differential semblance optimization function using a recursive wavefront raytracer for the crosswell transmission problem, 683-686 [Zbl 0954.86006]
Rachele, Lizabeth V., Uniqueness in an inverse problem for anisotropic elastic media: An announcement, 687-692 [Zbl 1012.74523]
Romanov, Mart E., Numerical solution of an inverse problem in wave tomography, 693-695 [Zbl 0952.74537]
Urbach, H. Paul, A model for grazing emission X-ray fluorescence spectroscopy, 696-700 [Zbl 0983.78013]
Abboud, Toufic; El Gharib, Joseph; Zhou, Bin, Retarded potentials for acoustic impedance problems, 703-708 [Zbl 1012.76539]
Antoine, X.; Barucq, H.; Vernhet, L., Approximate numerical solution of the acoustic scattering by a penetrable object using impedance boundary conditions, 709-713 [Zbl 0978.76081]
Assous, Franck; Ciarlet, Patrick; Garcia, Emmanuelle, Numerical solution to Maxwell equations in singular domains: The singular complement method, 714-718 [Zbl 0962.78018]
Athanassoulis, Gerassimos A.; Belibassakis, Konstadinos A.; Gerostathis, Theodoros P., A coupled-mode theory for the diffraction of water waves by localized scatterers over a parallel-contour bathymetry, 719-724 [Zbl 0995.76071]
Bangerth, Wolfgang, Mesh adaptivity and error control for a finite element approximation of the elastic wave equation, 725-729 [Zbl 0991.74065]
Bartoli, Nathalie; Collino, Francis, Integral equations via saddle point problem for acoustic problems., 730-734 [Zbl 1072.76611]
Bécache, Éliane; Derveaux, Grégoire; Joly, Patrick, An explicit finite element scheme for time-dependent Kirchhoff-Love equations., 735-740 [Zbl 1072.74546]
Benamou, Jean-David; Solliec, Ian, An Eulerian method for capturing caustics, 741-747 [Zbl 0961.70002]
Bergström, Rickard; Larson, Mats G., Dispersion analysis of Galerkin least squares approximations of Maxwell’s equations, 748-752 [Zbl 0962.78014]
Bossavit, Alain, The discrete Hodge operator in electromagnetic wave propagation problems, 753-759 [Zbl 0962.78017]
Boubendir, Y.; Bendali, A.; Collino, F., Domain decomposition methods and integral equation for solving Helmholtz diffraction problem, 760-764 [Zbl 0958.65136]
Brannan, James R.; Duan, Jinqiao; Ervin, Vincent J.; Razoumov, Leonid, Wiener-Hopf factorization of a multiple plate diffraction problem, 765-770 [Zbl 0974.76066]
Carcione, José M.; Seriani, Géza, Numerical simulation of wave propagation in frozen porous media, 771-775 [Zbl 0991.74080]
Christiansen, S. H.; Nédélec, J.-C., Preconditioners for the boundary element method in acoustics, 776-781 [Zbl 0990.76056]
Cohen, Gary; Fauqueux, Sandrine, Mixed finite elements with mass-lumping for the transient wave equation., 782-786 [Zbl 1072.76563]
Collino, F.; Fouquet, T.; Joly, P., A new space-time mesh refinement method for Maxwell’s equation, 787-791 [Zbl 1006.78017]
Douglas, Jim jun.; Santos, Juan E.; Sheen, Dongwoo, A nonconforming mixed method for the time-harmonic Maxwell equations, 792-796 [Zbl 1006.78016]
Elman, Howard C.; Ernst, Oliver G., Numerical experiences with a Krylov-enhanced multigrid solver for exterior Helmholtz problems, 797-801 [Zbl 0958.65131]
Fishman, Louis; de Hoop, Maarten V., Construction of exact square-root Helmholtz operator symbols: The focusing quaratic profile, 802-806 [Zbl 0964.35105]
Gander, Martin J.; Halpern, Laurence; Nataf, Frederic, Domain decomposition methods for wave propagation, 807-811 [Zbl 0960.65106]
Giebermann, Klaus, A multilevel algorithm for the efficient solution of boundary integral equations, 812-816 [Zbl 0958.65130]
Gmati, N.; Farhat, C.; Hetmaniuk, U., An efficient substructuring method for analyzing acoustics in a concentric hole-cavity resonator, 817-821 [Zbl 0976.76039]
Gremaud, Pierre A.; Matthews, John V., Computation of flowing granular materials, 822-826 [Zbl 0969.76071]
Hagstrom, Thomas, Experiments with stable, high-order difference approximations to hyperbolic initial-boundary value problems, 827-831 [Zbl 0961.65075]
Harran-Klotz, Patricia; Kalfon, Daniel, Hybridization of structured and unstructured grids for Maxwell equations, 832-836 [Zbl 0962.78019]
Heikkola, Erkki; Rossi, Tuomo; Toivanen, Jari, Efficient iterative solution of high-frequency acoustic scattering problems, 837-841 [Zbl 0973.76046]
Joly, Patrick; Poirier, Christine, A new second order 3D edge element on tetrahedra for time dependent Maxwell’s equations, 842-847 [Zbl 0995.78040]
Mikhailenko, Boris G.; Soboleva, Olga N., Application of the integral Laguerre transforms for numerical simulation of seismic waves for the radially heterogeneous spherical Earth, 848-852 [Zbl 1005.74077]
Nosich, A. I.; Boriskina, Svetlana V., Fast solution of the scattering from dielectric cylinders based on the inversion of ”dynamic” circular-cylinder part of the full-wave equation, 853-857 [Zbl 0962.78020]
Operto, S.; Virieux, J.; Malfanti, F.; Hustedt, B., Adaptive seismic wave modeling in wavelet bases., 858-862 [Zbl 1072.74556]
Remaki, Malika; Fezoui, Loula; Piperno, Serge; Duceau, Eric, A centered finite volume scheme for solving Maxwell’s equations in heterogeneous media, 863-867 [Zbl 1006.78018]
Los, Henk Sjoerd; Herman, Gérard C.; Hölscher, Paul, Dynamic interaction between train wheels and the subsurface, 868-872 [Zbl 0982.74549]
Volpert, Dominique, Computation of electromagnetic fields in dispersive materials using derivatives in respect to frequency, 873-877 [Zbl 1006.78019]
Xie, Zhongqiang; Zhang, Bo, A fourth-order FDTD technique for Maxwell’s equations, 878-882 [Zbl 0962.78015]
Yefet, Amir; Petropoulos, Peter G., A fourth-order FD-TD scheme for eletromagnetics, 883-887 [Zbl 0962.78016]
Antoine, X.; Besse, C., Quasi-analytic determination of the Dirichlet-to-Neumann operator associated to a linear Schrödinger-type equation, 891-895 [Zbl 0967.35114]
Djellouli, Rabia; Farhat, Charbel; Macedo, Antonini; Tezaur, Radek, Finite element solution of three-dimensional acoustic scattering problems using arbitrarily shaped convex artificial boundaries, 896-900 [Zbl 0989.76046]
Grote, Marcus J., Nonreflecting boundary conditions for the simulation of elastic waves in unbounded media., 901-905 [Zbl 1072.74555]
Hebermehl, Georg; Hübner, Friedrich-Karl; Schlundt, Rainer; Tischler, Thorsten; Zscheile, Horst; Heinrich, Wolfgang, On the simulation of microwave transmission lines with PML, 906-910 [Zbl 0981.78510]
Lions, Jacques-Louis; Métral, Jérôme; Vacus, Olivier, Well-posed absorbing layers for hyperbolic problems, 911-915 [Zbl 0974.76071]
Rahmouni, Adib N., A well-posed PML model for elastodynamics, 916-920 [Zbl 0986.74044]
Schmidt, F., Discrete nonreflecting boundary conditions for the Helmholtz equation, 921-925 [Zbl 0979.76065]
Le Rousseau, Jérôme H.; de Hoop, Maarten V., Generalized-screen approximation for the scattering of elastic waves in isotropic media, 929-933 [Zbl 0997.74036]
Lu, Ya Yan, Alternative single scatter approximation for one-way wave propagation, 934-938 [Zbl 0959.35008]
Natterer, Frank, Stable marching for Helmholtz equations, 939-941 [Zbl 0958.65120]
Wapenaar, Kees; Dillen, Menno; Fokkema, Jacob, Reciprocity theorem for one-way electromagnetic and acoustic wave fields in inhomogeneous media with losses, 942-946 [Zbl 0974.76077]
Brandsberg-Dahl, Sverre; Hokstad, Ketil; de Hoop, Maarten V.; Ursin, Bjørn, Maslov asymptotic Green’s functions for heterogeneous anisotropic elastic media, 949-953 [Zbl 0961.74034]
Colin, T.; Nkonga, B., Computing oscillatory waves of nonlinear hyperbolic systems using a phase-amplitude approach, 954-958 [Zbl 0981.78509]
Duchkov, Anton; Goldin, Sergey, Seismic wave field dynamics in the vicinity of a caustic, 959-963 [Zbl 0984.74040]
Goldin, Sergei V.; Khaidukov, Valery G.; Kostin, Victor I.; Ryan, Sara; Tcheverda, Vladimir A., Separation of reflected and diffracted objects by means of Gaussian beams decomposition, 964-968 [Zbl 1017.78511]
Lafitte, Olivier D., Rigorous asymptotic results for the diffraction of a wave, 969-974 [Zbl 0959.35166]
Leleu, Claire; De Roeck, Yann-Hervé; Chavent, Guy, Validity range of a 3D Born+ray model for the estimation of sea bottom and acquisition parameters in marine seismics, 975-979 [Zbl 0991.86005]
Steinhoff, John; Fan, Meng; Wang, Lesong, A new Eulerian method for the computation of propagating short wave equation pulses, 980-986 [Zbl 0981.78506]
Stolk, Christiaan C.; de Hoop, Maarten V., Microlocal analysis of elastic inversion for reflectivity, 987-991 [Zbl 1007.74052]
Asch, Mark, Geometric control of waves: Theory, simulations, applications, 995-1000 [Zbl 0960.35057]
Bey, Rabah; Lohéac, Jean-Pierre; Moussaoui, Mohand, Boundary stabilization of coupled wave equations, 1001-1005 [Zbl 1005.74040]
Dáger, René; Zuazua, Enrique, Controllability of star-shaped networks of strings, 1006-1010 [Zbl 1006.74068]
Maciá, Fabrizio; Zuazua, Enrique, Some applications of Gaussian beams to the controllability of waves, 1011-1015 [Zbl 0976.35039]
Micu, Sorin, On the controllability of the linearized Benjamin-Bona-Mahony equation, 1016-1019 [Zbl 0987.93005]
Micu, Sorin; Ortega, Jaime H., On the controllability of a linear coupled system of Korteweg-de Vries equations, 1020-1024 [Zbl 0958.93046]
Montseny, Gérard; Audounet, Jacques; Matignon, Denis, Perfectly absorbing boundary feedback control for wave equations: A diffusive formulation, 1025-1029 [Zbl 0960.93021]
Petit, Nicolas; Rouchon, Pierre, Motion planning for heavy chain systems, 1030-1034 [Zbl 0990.70020]

MSC:

00B25 Proceedings of conferences of miscellaneous specific interest
76-06 Proceedings, conferences, collections, etc. pertaining to fluid mechanics
65-06 Proceedings, conferences, collections, etc. pertaining to numerical analysis

Citations:

Zbl 0904.00054
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