Geodesic
On the critical semilinear wave equation outside convex obstacles
Journal of the American Mathematical Society, Tome 08 (1995) no. 4, pp. 879-916
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Smith, Hart F.; Sogge, Christopher D. On the critical semilinear wave equation outside convex obstacles. Journal of the American Mathematical Society, Tome 08 (1995) no. 4, pp. 879-916. doi: 10.1090/S0894-0347-1995-1308407-1

[1] Farris, Mark Egorov’s theorem on a manifold with diffractive boundary Comm. Partial Differential Equations 1981 651 687

[2] Friedlander, F. G. The wave front set of the solution of a simple initial-boundary value problem with glancing rays Math. Proc. Cambridge Philos. Soc. 1976 145 159

[3] Grillakis, Manoussos G. Regularity and asymptotic behaviour of the wave equation with a critical nonlinearity Ann. of Math. (2) 1990 485 509

[4] Grillakis, Manoussos G. Regularity for the wave equation with a critical nonlinearity Comm. Pure Appl. Math. 1992 749 774

[5] Kapitanskiĭ, L. V. The Cauchy problem for the semilinear wave equation. III Zap. Nauchn. Sem. Leningrad. Otdel. Mat. Inst. Steklov. (LOMI) 1990

[6] Kapitanskiĭ, L. V. Some generalizations of the Strichartz-Brenner inequality Algebra i Analiz 1989 127 159

[7] Klainerman, S., Machedon, M. Space-time estimates for null forms and the local existence theorem Comm. Pure Appl. Math. 1993 1221 1268

[8] Lindblad, Hans, Sogge, Christopher D. On existence and scattering with minimal regularity for semilinear wave equations J. Funct. Anal. 1995 357 426

[9] Melrose, Richard B. Microlocal parametrices for diffractive boundary value problems Duke Math. J. 1975 605 635

[10] Melrose, R. B. Equivalence of glancing hypersurfaces Invent. Math. 1976 165 191

[11] Melrose, Richard B., Taylor, Michael E. Near peak scattering and the corrected Kirchhoff approximation for a convex obstacle Adv. in Math. 1985 242 315

[12] Melrose, Richard B., Taylor, Michael E. The radiation pattern of a diffracted wave near the shadow boundary Comm. Partial Differential Equations 1986 599 672

[13] Mockenhaupt, Gerd, Seeger, Andreas, Sogge, Christopher D. Local smoothing of Fourier integral operators and Carleson-Sjölin estimates J. Amer. Math. Soc. 1993 65 130

[14] Pecher, Hartmut Nonlinear small data scattering for the wave and Klein-Gordon equation Math. Z. 1984 261 270

[15] Rauch, Jeffrey I. The 𝑢⁵ Klein-Gordon equation. II. Anomalous singularities for semilinear wave equations 1981 335 364

[16] Shatah, Jalal, Struwe, Michael Regularity results for nonlinear wave equations Ann. of Math. (2) 1993 503 518

[17] Seeger, A., Sogge, C. D. Bounds for eigenfunctions of differential operators Indiana Univ. Math. J. 1989 669 682

[18] Smith, Hart F., Sogge, Christopher D. 𝐿^{𝑝} regularity for the wave equation with strictly convex obstacles Duke Math. J. 1994 97 153

[19] Smith, Hart F., Sogge, Christopher D. On Strichartz and eigenfunction estimates for low regularity metrics Math. Res. Lett. 1994 729 737

[20] Sogge, Christopher D. Concerning the 𝐿^{𝑝} norm of spectral clusters for second-order elliptic operators on compact manifolds J. Funct. Anal. 1988 123 138

[21] Sogge, Christopher D. Fourier integrals in classical analysis 1993

[22] Stein, Elias M. Singular integrals and differentiability properties of functions 1970

[23] Stein, Elias M. Harmonic analysis: real-variable methods, orthogonality, and oscillatory integrals 1993

[24] Strichartz, Robert S. A priori estimates for the wave equation and some applications J. Functional Analysis 1970 218 235

[25] Strichartz, Robert S. Restrictions of Fourier transforms to quadratic surfaces and decay of solutions of wave equations Duke Math. J. 1977 705 714

[26] Struwe, Michael Globally regular solutions to the 𝑢⁵ Klein-Gordon equation Ann. Scuola Norm. Sup. Pisa Cl. Sci. (4) 1988

[27] Taylor, Michael E. Grazing rays and reflection of singularities of solutions to wave equations Comm. Pure Appl. Math. 1976 1 38

[28] Taylor, Michael E. Diffraction effects in the scattering of waves 1981 271 316

[29] Zworski, Maciej High frequency scattering by a convex obstacle Duke Math. J. 1990 545 634

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