Local decrease of energy of solutions of hyperbolic systems

1. M. S. Agranovich and M. I. Vishik, “Elliptic problems with parameter and parabolic problems of general type,” Usp. Mat. Nauk,19, No. 3, 53–161 (1964).

   Google Scholar 

2. B. R. Vainberg, “Principles of radiation, limit absorption and limit amplitude in the general theory of partial differential equations,” Usp. Mat. Nauk,21, No. 3, 115–194 (1966).

   Google Scholar 

3. B. R. Vainberg, “Analytic properties of the resolvent for a class of bundles of operators,” Mat. Sb.,77, No. 2, 259–296 (1968).

   Google Scholar 

4. B. R. Vainberg, “Exterior elliptic problems, depending polynomially on the spectral parameter, and asymptotic's for large times of solutions of nonstationary problems,” Mat. Sb.,92, No. 2, 224–241 (1973).

   Google Scholar 

5. B. R. Vainberg, “Shortwave asymptotics of solutions of stationary problems and asymptotics as t → ∞ of solutions of nonstationary problems,” Usp. Mat. Nauk,30, No. 2, 3–55 (1975).

   Google Scholar 

6. N. Iwasaki, “Local decay of solutions for symmetric hyperbolic systems with dissipative and coercive boundary conditions in exterior domains,” Publ. RIMS Kyoto Univ.,5, 193–218 (1969).

   Google Scholar 

7. A. Maida and M. Taylor, “Inverse scattering problems for transparent obstacles electromagnetic waves and hyperbolic systems,” Commun. Partial Diff. Equations,2, No. 4, 395–438 (1977).

   Google Scholar 

8. B. Malgrange, “Existence et approximation des solutions des équations aux derivées partielles et des équations de convolution,” Ann. Inst. Fourier,6, 271–351 (1956).

   Google Scholar 

9. J. Rauch, “Asymptotic behavior of solutions to hyperbolic partial differential equations with zero speeds,” Commun. Pure Appl. Math.,34, No. 4, 431–480 (1978).

   Google Scholar 

10. F. Treves, Lectures on Linear Partial Differential Equations with Constant Coefficients, Rio de Janeiro (1961).

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