Geometric Aspects of the Einstein Equations and Integrable Systems
Geometric Aspects of the Einstein Equations and Integrable Systems Proceedings of the Sixth Scheveningen Conference, Scheveningen, The Netherlands, August 26–31, 1984 / [electronic resource] :
edited by R. Martini.
- V, 347 p. 10 illus. online resource.
- Lecture Notes in Physics, 239 0075-8450 ; .
- Lecture Notes in Physics, 239 .
Exact solutions in gauge theory, general relativity, and their supersymmetric extensions -- Symmetries and solutions of the einstein equations -- Superposition of solutions in general relativity -- Gauge fields, gravitation and Kaluza-Klein theory -- Gravitational shock waves -- Soliton surfaces and their applications (soliton geometry from spectral problems) -- Completely integrable systems of evolution equations on KAC moody lie algebras -- Integrable lattice systems in two and three dimensions -- Isovectors and prolongation structures by Vessiot's vector field formulation of partial differential equations -- Hamiltonian flow on an energy surface: 240 years after the euler-maupertuis principle.
9783540397137
10.1007/3-540-16039-6 doi
Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
QC19.2-20.85
530.1
Exact solutions in gauge theory, general relativity, and their supersymmetric extensions -- Symmetries and solutions of the einstein equations -- Superposition of solutions in general relativity -- Gauge fields, gravitation and Kaluza-Klein theory -- Gravitational shock waves -- Soliton surfaces and their applications (soliton geometry from spectral problems) -- Completely integrable systems of evolution equations on KAC moody lie algebras -- Integrable lattice systems in two and three dimensions -- Isovectors and prolongation structures by Vessiot's vector field formulation of partial differential equations -- Hamiltonian flow on an energy surface: 240 years after the euler-maupertuis principle.
9783540397137
10.1007/3-540-16039-6 doi
Physics.
Physics.
Theoretical, Mathematical and Computational Physics.
QC19.2-20.85
530.1