Dirac-Lu Space with Pseudo-Riemannian Metric of Constant Curvature

Dirac-Lu Space with Pseudo-Riemannian Metric of Constant Curvature

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摘要 In this paper, we will discuss the geometries of the Dirac-Lu space whose boundary is the third conformal space Af defined by Dirac and Lu. We firstly give the S0（3, 3） invariant pseudo- Riemannian metric with constant curvature on this space, and then discuss the timelike geodesics. Finally we get a solution of the Yang-Mills equation on it by using the reduction theorem of connections. In this paper, we will discuss the geometries of the Dirac-Lu space whose boundary is the third conformal space Af defined by Dirac and Lu. We firstly give the S0（3, 3） invariant pseudo- Riemannian metric with constant curvature on this space, and then discuss the timelike geodesics. Finally we get a solution of the Yang-Mills equation on it by using the reduction theorem of connections.

作者 Xin An REN Li CHEN Gui Dong WANG

机构地区 Department of Mathematics College of Science

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2011年第9期1743-1752,共10页 数学学报（英文版）

关键词 Dirac-Lu space invariant metric Yang-Mills equation Dirac-Lu space, invariant metric, Yang-Mills equation

分类号 O186.12 [理学—基础数学] O4-09 [理学—物理]

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参考文献2

1REN Xin-An,ZHANG Li-You.Geometric Structures and Field Equations of Dirac-Lu Space[J].Communications in Theoretical Physics,2008,50(11):1151-1154. 被引量：1
2LU Qi-Keng.Heisenberg Group and Energy-Momentum Conservative Law in de-Sitter Spaces—— In Memory of the 100th Anniversary of Einstein＇s Special Relativity and the 70th Anniversary of Dirac＇s de-Sitter Spaces[J].Communications in Theoretical Physics,2005,44(3X):389-392. 被引量：9

二级参考文献5

1LU Qi-Keng.Heisenberg Group and Energy-Momentum Conservative Law in de-Sitter Spaces—— In Memory of the 100th Anniversary of Einstein＇s Special Relativity and the 70th Anniversary of Dirac＇s de-Sitter Spaces[J].Communications in Theoretical Physics,2005,44(3X):389-392. 被引量：9
2P.A.M. Dirac, Ann. Math. 36 (1935) 657.
3Qi-Keng Lu, "A Note to a Paper of Dirac in 1935" (inChinese), Lecture at Morningside Center, Beijing (2004),MCM-Workshop Series : Volume I (2005) 86-98.
4H.K. Look (Qi-Keng Lu), G.L. Tsou (Zhen-Long Zhou),and H.Y. Kuo (Han-Ying Guo), Acta Phys. Sin. 23 (1974)225 (in Chinese).
5Qi-Keng Lu, DiHerential Geometry and Its Application to Physics (in Chinese), Science Press, Beijing (1983).

共引文献8

1郭汉英.“舟行不觉”和暗宇宙——惯性运动、相对性原理及其宇宙起源[J].科学文化评论,2006,3(5):77-93. 被引量：3
2郭汉英,徐湛.狭义相对论的欧氏假定与暗宇宙的启示[J].物理与工程,2005,15(6):7-15.
3郭汉英.暗宇宙、马赫原理和惯性运动[J].科学,2006,58(3):33-37. 被引量：2
4吴宏途,黄超光,郭汉英.From the Complete Yang Model to Snyder＇s Model, de Sitter Special Relativity and Their Duality[J].Chinese Physics Letters,2008,25(8):2751-2753.
5REN Xin-An,ZHANG Li-You.Geometric Structures and Field Equations of Dirac-Lu Space[J].Communications in Theoretical Physics,2008,50(11):1151-1154. 被引量：1
6任新安.A SOLUTION OF YANG-MILLS EQUATION ON BDS SPACE[J].Acta Mathematica Scientia,2009,29(2):447-455.
7CHEN Li REN Xin-An.A Static Solution of Yang-Mills Equation on Anti-de Sitter Space[J].Communications in Theoretical Physics,2009,51(5):794-796.
8闫沐霖.与爱因斯坦宇宙学常数相关的狭义相对论:评介德西特不变和反德西特不变狭义相对论[J].科学通报,2017,62(12):1241-1255.

1Ben-ling LI & Zhong-min SHEN Department of Mathematics, Zhejiang University, Hangzhou 310028, China,Department of Mathematical Sciences, Indiana University Purdue University Indianapolis (IUPUI), 402 N. Blackford Street, Indianapolis, IN 46202-3216, USA,Center of Mathematical Sciences, Zhejiang University, Hangzhou 310027, China.On a class of weak Landsberg metrics[J].Science China Mathematics,2007,50(4):573-589. 被引量：14
2郭汉英.MODELS OF HARMONIC MAPPING THEORY FOR THE BELTRAMI SPACE-TIME OF CONSTANT CURVATURE[J].Chinese Science Bulletin,1982,27(1):24-26.
3Lihong LIU,Guangzu CHEN.On (α,β)-Metrics with Reversible Geodesics[J].Journal of Mathematical Research with Applications,2016,36(5):568-574.
4LiJiayu.MEAN CURVATURE FLOW OF GRAPHS IN ∑1×∑2[J].Journal of Partial Differential Equations,2003,16(3):255-265.
5Zicheng ZHAO.Spacelike Graphs with Parallel Mean Curvature in Pseudo-Riemannian Product Manifolds[J].Chinese Annals of Mathematics,Series B,2012,33(1):17-32. 被引量：1
6焦晓祥,彭家贵.ON HOLOMORPHIC CURVES OF CONSTANT CURVATURE IN THE COMPLEX GRASSMANN MANIFOLD G(2,5)[J].Acta Mathematica Scientia,2011,31(1):237-248. 被引量：1
7蒋声.A PROPERTY OF HARMONIC MAPS WITH AN APPLICATION[J].Chinese Science Bulletin,1985,30(5).
8ZENG ChunNa,MA Lei,ZHOU JiaZu,CHEN FangWeit.The Bonnesen isoperimetric inequality in a surface of constant curvature[J].Science China Mathematics,2012,55(9):1913-1919. 被引量：18
9周青.RIEMANNIAN METRIC ON P^n(R)#P^n(R)[J].Chinese Science Bulletin,1983,28(3).
10白正国.ON THE SECTIONAL CURVATURE OF A RIEMANNIAN MANIFOLD[J].Chinese Annals of Mathematics,Series B,1990,11(1):70-73.

Acta Mathematica Sinica,English Series

2011年第9期

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Dirac-Lu Space with Pseudo-Riemannian Metric of Constant Curvature

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