期刊
JOURNAL OF NONLINEAR MATHEMATICAL PHYSICS
卷 12, 期 -, 页码 648-659出版社
NORBERT EULER
DOI: 10.2991/jnmp.2005.12.s1.50
关键词
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Modulated progressive wave solutions (solitons) to (3 + 1) dimensional wave equation are discussed within a general geometrical framework. The role of geodesic coordinates defined by hypersurfaces of Riemannian spaces is pointed out in this context. In particular in E-3 orthogonal geodesic coordinates defined by Dupin cyclides are used to simplify derivation of the most nontrivial results of Friedlander on solitons of (3 + 1)-dimensional wave equations and to correct some of them. The essence of this novel approach is use of the technique of separation of variables in the Kalnins-Miller formulation.
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