On derivation of equations of gravitation from the principle of least action, relativistic Milne-McCrea solutions, and Lagrange points
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Publication:6194435
DOI10.1134/s1064562423701417MaRDI QIDQ6194435
No author found.
Publication date: 19 March 2024
Published in: Doklady Mathematics (Search for Journal in Brave)
Partial differential equations of mathematical physics and other areas of application (35Qxx) General relativity (83Cxx) Relativity and gravitational theory (83-XX)
Cites Work
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- Derivation and classification of Vlasov-type and magnetohydrodynamics equations: Lagrange identity and Godunov's form
- The relativistic Boltzmann equation: Theory and applications
- The hydrodynamics of Hamiltonian systems
- Global existence of solutions of the spherically symmetric Vlasov- Einstein system with small initial data
- Hamiltonian structure of the Vlasov-Einstein system and the problem of stability for spherical relativistic star clusters
- BBGKY-hierarchies and Vlasov's equations in postgalilean approximation
- Derivation of the equations of electrodynamics and gravity from the principle of least action
- On derivation of equations of electrodynamics and gravitation from the principle of least action, the Hamilton-Jacobi method, and cosmological solutions
- On derivation and classification of Vlasov type equations and equations of magnetohydrodynamics. The Lagrange identity, the Godunov form, and critical mass
- On the topology of steady-state solutions of hydrodynamic and vortex consequences of the Vlasov equation and the Hamilton-Jacobi method
- Vlasov-type and Liouville-type equations, their microscopic, energetic and hydrodynamical consequences
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