MR 933684 | Zbl 0657.35102 | 3 citations dans Numdam

[1] A. Bachelot et V. Petkov, Existence de l'opérateur de diffusion pour l'équation des ondes avec un potentiel périodique en temps ; C. R. Acad. Sc. Paris, t. 303, série I, n° 14, 1986, p. 671-673. | MR 870693 | Zbl 0611.35067

[2] A. Bachelot et V. Petkov, Existence de l'opérateur de diffusion pour l'équation des ondes avec un potentiel périodique en temps ; à paraître in « Nonlinear partial differential equations and their applications, Collège de France Seminar ». H. Brezis et J. L. Lions Eds. Research Notes in Math., Pitman, Boston, Londres, Melbourne. | Zbl 0673.35062

[3] C. Bloom et N. Kazarinoff, Energy decays locally even if total energy grows algebrically with time. J. Diff. Equations, t. 16, 1974, p. 352-372. | MR 350215 | Zbl 0279.35054

[4] J. Copper, G. Perla-Menzala, W. Strauss, On the scattering frequencies of time dependent potentials. Preprint.

[5] J. Copper et W. Strauss, Scattering of waves by periodically moving bodies. J. Funct. Anal., t. 47, 1982, p. 180-229. | MR 664336 | Zbl 0494.35073

[6] J. Copper et W. Strauss, Abstract scattering theory for time periodic systems with applications to electromagnetism. Indiana Univ. Math., t. 34, 1985, p. 33-83. | MR 773393 | Zbl 0582.47011

[7] N. Dunford et J. Schwartz, Linear operators. Wiley Interscience, New York, 1971. | MR 412888

[8] J.A. Ferreira et G. Perla-Menzala, Time dependent approach to the inverse scattering problem for wave equation with time dependent coefficients; Preprint.

[9] V. Georgiev, Existence and completeness of the wave operators for dissipative hyperbolic systems. J. Operator Theory, t. 14, 1985, p. 291-310. | MR 808294 | Zbl 0589.47010

[10] V. Georgiev et V. Petkov, Théorème de type RAGE pour des opérateurs à puissances bornées. C. R. Acad. Sc. Paris, t. 303, série I, 1986, p. 605-608. | MR 867547 | Zbl 0603.47001

[11] J.C. Guillot et G. Schmidt, Spectral and scattering theory for Dirac operators. Arch. Rat. Mech. Anal., t. 55, 1974, p. 193-206. | MR 355374 | Zbl 0297.47008

[12] J.S. Howland, Stationary scattering theory for time dependent hamiltonians. Math. Ann., t. 207, 1974, p. 315-335. | MR 346559 | Zbl 0261.35067

[13] P.D. Lax et R. Phillips, Scattering theory. Academic Press, New York, 1967. | Zbl 0186.16301

[14] R.B. Melrose, Singularities and energy decay in acoustical scattering. Duke Math. J., t. 46, 1979, p. 43-59. | MR 523601 | Zbl 0415.35050

[15] R.B. Melrose, The trace of the wave group; in Contemporary Mathematics, vol. 27. Microlocal Analysis, A. M. S., 1985, p. 127-167. | MR 741046 | Zbl 0547.35095

[16] G. Perla-Menzala, On perturbed wave equations with time dependent coefficients. Ann. Scuola Norm. Pisa, t. 11, 1984, p. 541-558. | Numdam | MR 808423 | Zbl 0592.35079

[17] G. Perla-Menzala, Sur l'opérateur de diffusion pour l'équation des ondes avec des potentiels dépendant du temps ; C. R. Acad. Sci. Paris, série I, t. 300, 1985, p. 621-624. | MR 795672 | Zbl 0601.35090

[18] G. Perla-Menzala, Scattering properties of wave equations with time dependent potentials; Preprint.

[19] V. Petkov, Scattering theory for mixed problems in the exteriour of moving obstacles; Intern. Conf. on Hyperbolic Equ. and Related Topics, Padova, 1985, à paraître. | Zbl 0732.35065

[20] V. Petkov, Scattering theory for hyperbolic operators ; Notas de Curso n° 24, Departamento de Matematica, Universitade Federal de Pernambuco, Recife, 1987. | MR 912265

[21] G. Popov et Zv. Rangelov, On the exponential growth of the local energy for periodically moving obstacles; Preprint.

[22] R. Phillips, Scattering theory for the wave equation with a short range perturbation. Indiana Univ. Math. J., t. 31, 1982, p. 609-639. | MR 667785 | Zbl 0465.35073

[23] W. Strauss, The existence of the scattering operator for moving obstacles. J. Funct. Anal., t. 31, 1979, p. 255-262. | MR 525956 | Zbl 0457.35049

[24] M.E. Taylor, Pseudodifferential operators ; Princeton University Press, 1981. | MR 618463 | Zbl 0453.47026