Discontinuity of First Derivatives of Metric Tensor and Mach's Principle
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概要
- 論文の詳細を見る
A static massive thin spherical shell in a universe empty, except for the shell, is constructed which provides suitable boundary conditions that enforce Mach's principle in general relativity. The momentum-energy tensor of the surface distribution on the shell is given by the terms containing δ-function, that appear in Einstein's field equations if the first derivatives of the metric tensor are discontinuous across the interface of the two adjacent regions. Einstein's field equations, in this case are constructed from the metric tensor which is a linear combination of two metric tensors specifying two adjacent regions, making use of the step-function. This method of constructing the field equation is the same as has been followed by Nariai.
- 理論物理学刊行会の論文
- 1970-07-25
著者
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KUMAR M.
Department of Agricultural and Food Engineering, Indian Institute of Technology Kharagpur
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Kumar M.
Department Of Mathematics M. S. College
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Kumar M.
Department Of Agricultural And Food Engineering Indian Institute Of Technology Kharagpur
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