Global Solutions of Einstein-Dirac Equation on the
Conformal Space
LU Qi-Keng;WANG Shi-Kun;WU Ke
【期刊名称】《理论物理通讯(英文版)》 【年(卷),期】2001(036)008
【摘要】The difference between the Riemann and Lorentz spinor manifolds of four dimensions is that the Dirac operator of the former is elliptic and that of the latter is hyperbolic. Moreover the spinor group of the former is a compact group and that of the latter is a noncompact group, which is isomorphic to SL(2, ). Hence the results and their interpretation coming from the two theories would be different. In this short note we study only the Lorentz spinor manifold and, especially, the solutions of Einstein-Dirac equations on the conformal space, which is closely related to the AdS/CFT correspondence. 【总页数】2页(129-130)
【关键词】Lorentz manifold;Dirac operator;conformal space 【作者】LU Qi-Keng;WANG Shi-Kun;WU Ke
【作者单位】Institute of Mathematics, Academy of Mathematics and System Sciences, The Chinese Academy of Sciences, Beijing 100080, China;Institute of Applied Mathematics, Academy of Mathematics and System Sciences, The Chinese Academy of Sciences, Beijing 100080, China;Institute of Theoretical Physics, The Chinese Academy of Sciences,
Beijing 100080, China 【正文语种】中文 【中图分类】04 【相关文献】
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Global Solutions of Einstein-Dirac Equation on the Conformal Space
