Difference between revisions of "A Lorentzian Approach to General Relativity: Einstein's Closed Universe Reinterpreted"
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==Abstract== | ==Abstract== | ||
− | Within Lorentzian interpretation of general relativity (GR) curvilinear space is not reality itself, and has to be projected to Euclidean space. A finite, closed universe is even more complicated. When these difficulties are resolved, black holes disappear. This explains another point: An expanding universe should stay at its beginning within a black hole but later on leave it. | + | Within Lorentzian interpretation of general relativity (GR) curvilinear space is not reality itself, and has to be projected to Euclidean space. A finite, closed universe is even more complicated. When these difficulties are resolved, black holes disappear. This explains another point: An expanding universe should stay at its beginning within a black hole but later on leave it. |
− | [[Category:Relativity]] | + | [[Category:Scientific Paper|lorentzian approach general relativity einstein 's closed universe reinterpreted]] |
+ | |||
+ | [[Category:Relativity|lorentzian approach general relativity einstein 's closed universe reinterpreted]] |
Latest revision as of 19:16, 1 January 2017
Scientific Paper | |
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Title | A Lorentzian Approach to General Relativity: Einstein\'s Closed Universe Reinterpreted |
Author(s) | J G Brandes |
Keywords | special and general relativity, finite, closed universe, black holes, white holes, big bang |
Published | 1997 |
Journal | None |
Pages | 275-281 |
Abstract
Within Lorentzian interpretation of general relativity (GR) curvilinear space is not reality itself, and has to be projected to Euclidean space. A finite, closed universe is even more complicated. When these difficulties are resolved, black holes disappear. This explains another point: An expanding universe should stay at its beginning within a black hole but later on leave it.