TY - BOOK AU - AU - AU - ED - SpringerLink (Online service) TI - Analytical and Numerical Approaches to Mathematical Relativity T2 - Lecture Notes in Physics, SN - 9783540334842 AV - QB980-991 U1 - 523.1 23 PY - 2006/// CY - Berlin, Heidelberg PB - Springer Berlin Heidelberg KW - Physics KW - Global differential geometry KW - Cell aggregation KW - Mathematics KW - Mathematical physics KW - Relativity (Physics) KW - Relativity and Cosmology KW - Mathematical Methods in Physics KW - Differential Geometry KW - Manifolds and Cell Complexes (incl. Diff.Topology) KW - Numerical and Computational Methods N1 - Differential Geometry and Differential Topology -- A Personal Perspective on Global Lorentzian Geometry -- The Space of Null Geodesics (and a New Causal Boundary) -- Some Variational Problems in Semi-Riemannian Geometry -- On the Geometry of pp-Wave Type Spacetimes -- Analytical Methods and Differential Equations -- Concepts of Hyperbolicity and Relativistic Continuum Mechanics -- Elliptic Systems -- Mathematical Properties of Cosmological Models with Accelerated Expansion -- The PoincarȨ Structure and the Centre-of-Mass of Asymptotically Flat Spacetimes -- Numerical Methods -- Computer Simulation a Tool for Mathematical Relativity and Vice Versa -- On Boundary Conditions for the Einstein Equations -- Recent Analytical and Numerical Techniques Applied to the Einstein Equations -- Some Mathematical Problems in Numerical Relativity; ZDB-2-PHA; ZDB-2-LNP N2 - Today, general relativity rates among the most accurately tested fundamental theories in all of physics. However, deficiencies in our mathematical and conceptual understanding still exist, and these partly hamper further progress. For this reason alone, but no less important from the point of view that a theory-based prediction should be regarded as no better than one's own structural understanding of the underlying theory, one should undertake serious investigations into the corresponding mathematical issues. This book contains a representative collection of surveys by experts in mathematical relativity writing about the current status of, and problems in, their fields. There are four contributions for each of the following mathematical areas: differential geometry and differential topology, analytical methods and differential equations, and numerical methods. This book addresses graduate students and specialist researchers alike UR - http://dx.doi.org/10.1007/b11550259 ER -