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The Ricci flow, which connects metric evolution and curvature of space, was introduced by Richard Hamilton in 1981 in order to gain insight into the geometrization conjecture of William Thurston, concerning the topological classification of threedimensional smooth manifold. Many physicist believed t...
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id-itb.:79192017-09-27T11:45:11Z#TITLE_ALTERNATIVE# TAUFIK A. S. (NIM 10204021), FIKI Indonesia Final Project INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/7919 The Ricci flow, which connects metric evolution and curvature of space, was introduced by Richard Hamilton in 1981 in order to gain insight into the geometrization conjecture of William Thurston, concerning the topological classification of threedimensional smooth manifold. Many physicist believed that Ricci flow related to physical phenomena, especially gravity. In this project, we will derive an exact solution of Ricci flow equation for axisymmetric metric in 4D for static condition (! = 0), and using assumption that all the function that forming the metrics are integrable. text |
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The Ricci flow, which connects metric evolution and curvature of space, was introduced by Richard Hamilton in 1981 in order to gain insight into the geometrization conjecture of William Thurston, concerning the topological classification of threedimensional smooth manifold. Many physicist believed that Ricci flow related to physical phenomena, especially gravity. In this project, we will derive an exact solution of Ricci flow equation for axisymmetric metric in 4D for static condition (! = 0), and using assumption that all the function that forming the metrics are integrable. |
| format |
Final Project |
| author |
TAUFIK A. S. (NIM 10204021), FIKI |
| spellingShingle |
TAUFIK A. S. (NIM 10204021), FIKI #TITLE_ALTERNATIVE# |
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TAUFIK A. S. (NIM 10204021), FIKI |
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TAUFIK A. S. (NIM 10204021), FIKI |
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https://digilib.itb.ac.id/gdl/view/7919 |
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1820664279508975616 |