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| '''Numerical relativity''' is a subfield of ] that aims to establish numerical solutions to ]s in ]. Despite promising results, accurate and validated ] for Einstein's equations remain elusive. The size and complexity of the equations along with persisting inquiries in fundamental issues of relativity theory are attributed the cause of thus far unsuccessful attempts at resolution. Nonetheless, the field has prodigiously expanded in recent years as engaging research continues. | '''Numerical relativity''' is a subfield of ] that aims to establish numerical solutions to ]s in ]. Despite promising results, accurate and validated ] for Einstein's equations remain elusive. The size and complexity of the equations along with persisting inquiries in fundamental issues of relativity theory are attributed the cause of thus far unsuccessful attempts at resolution. Nonetheless, the field has prodigiously expanded in recent years as engaging research continues. | ||
| Numerical relativity attempts to acquire a comprehensive understanding of the complex nature of strong dynamical gravitational fields. Another topic under investigation in numerical relativity is the ]. This involves ], discretization techniques for these equations, treatment of ] spacetimes, and the imposition of ]s. | Numerical relativity attempts to acquire a comprehensive understanding of the complex nature of strong dynamical gravitational fields. Another topic under investigation in numerical relativity is the ]. This involves ], discretization techniques for these equations, treatment of ] spacetimes, and the imposition of ]s. | ||
| Numerical relativity research is distinct from work on ] as many techniques implemented in these areas are inapplicable in relativity. Many facets are however shared with large scale problems in other computational sciences like ], electromagnetics, and solid mechanics. Numerical relativists often work with applied mathematicians and draw insight from ], ], ]s, and ] among other mathematical areas of specialization. | Numerical relativity research is distinct from work on ] as many techniques implemented in these areas are inapplicable in relativity. Many facets are however shared with large scale problems in other computational sciences like ], electromagnetics, and solid mechanics. Numerical relativists often work with applied mathematicians and draw insight from ], ], ]s, and ] among other mathematical areas of specialization. | ||
Revision as of 10:26, 9 October 2005
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Numerical relativity is a subfield of computational physics that aims to establish numerical solutions to Einstein's field equations in general relativity. Despite promising results, accurate and validated algorithms for Einstein's equations remain elusive. The size and complexity of the equations along with persisting inquiries in fundamental issues of relativity theory are attributed the cause of thus far unsuccessful attempts at resolution. Nonetheless, the field has prodigiously expanded in recent years as engaging research continues.
Numerical relativity attempts to acquire a comprehensive understanding of the complex nature of strong dynamical gravitational fields. Another topic under investigation in numerical relativity is the initial value problem in general relativity. This involves partial differential equations, discretization techniques for these equations, treatment of black hole spacetimes, and the imposition of boundary conditions.
Numerical relativity research is distinct from work on classical field theories as many techniques implemented in these areas are inapplicable in relativity. Many facets are however shared with large scale problems in other computational sciences like computational fluid dynamics, electromagnetics, and solid mechanics. Numerical relativists often work with applied mathematicians and draw insight from numerical analysis, scientific computation, partial differential equations, and geometry among other mathematical areas of specialization.
See also
Links
http://www.emis.ams.org/journals/LRG/Articles/lrr-2003-3/node19.html
http://xxx.lanl.gov/abs/gr-qc/9808024
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