On the boundary value problem in a dihedral angle for normally hyperbolic systems of first order |
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| Authors: | O. Jokhadze |
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| Affiliation: | (1) A. Razmadze Mathematical Institute, Georgian Academy of Sciences, 1, M. Aleksidze St., 380093 Tbilisi, Georgia |
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| Abstract: | ![]()
Some structural properties as well as a general three-dimensional boundary value problem for normally hyperbolic systems of partial differential equations of first order are studied. A condition is given which enables one to reduce the system under consideration to a first-order system with the spliced principal part. It is shown that the initial problem is correct in a certain class of functions if some conditions are fulfilled. |
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| Keywords: | Normally hyperbolic systems dihedral angle reduction of a boundary value problem to a spliced system bicharacteristic |
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