Methods of Local and Global Differential Geometry in General Relativity
Methods of Local and Global Differential Geometry in General Relativity Proceedings of the Regional Conference on Relativity held at the University of Pittsburgh, Pittsburgh, Pennsylvania, July 13–17, 1970 / [electronic resource] :
edited by D. Farnsworth, J. Fink, J. Porter, A. Thompson.
- VI, 191 p. online resource.
- Lecture Notes in Physics, 14 0075-8450 ; .
- Lecture Notes in Physics, 14 .
Techniques of topology and differential geometry in general relativity -- A simple derivation of the general redshift formula -- Some remarks on a radiating solution of the Einstein-Maxwell equations -- Conservation laws on manifolds -- Structure of singularities -- Lattice transformations and charge quantization -- On an Einstein-Maxwell field with a null source -- The luminosity of a collapsing star -- A class of inextendible Weyl solutions -- Scaling in function spaces -- On the spherical symmetry of a static perfect fluid -- Differentiable manifolds with singularities -- Non-vacuum ADaM field equations -- General relativity as a dynamical system on the manifold a of Riemannian metrics which cover diffeomorphisms.
9783540374343
10.1007/3-540-05793-5 doi
Mechanics.
Classical Mechanics.
QC120-168.85 QA808.2
531
Techniques of topology and differential geometry in general relativity -- A simple derivation of the general redshift formula -- Some remarks on a radiating solution of the Einstein-Maxwell equations -- Conservation laws on manifolds -- Structure of singularities -- Lattice transformations and charge quantization -- On an Einstein-Maxwell field with a null source -- The luminosity of a collapsing star -- A class of inextendible Weyl solutions -- Scaling in function spaces -- On the spherical symmetry of a static perfect fluid -- Differentiable manifolds with singularities -- Non-vacuum ADaM field equations -- General relativity as a dynamical system on the manifold a of Riemannian metrics which cover diffeomorphisms.
9783540374343
10.1007/3-540-05793-5 doi
Mechanics.
Classical Mechanics.
QC120-168.85 QA808.2
531