CURVATURE PROPERTIES OF THE VAIDYA METRIC

Absos Ali Shaikh; Haradhan Kundu; Jayashree Sen

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CURVATURE PROPERTIES OF THE VAIDYA METRIC

机译：Vaidya公制的曲率特性

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摘要

As a generalization of the Schwarzschild solution, Vaidya presented a radiating metric to develop a model of the exterior of a star including its radiation field, named later Vaidya metric. The present paper deals with the investigation on the curvature properties of Vaidya metric. It is shown that Vaidya metric can be considered as a model of different pseudosym-metric type curvature conditions, namely, C . C =m/r~3Q(g,C), R · R- Q(S, R) = m/r~3Q(g,C), etc. It is also shown that Vaidya metric is Ricci simple, vanishing scalar curvature and its Ricci tensor is Riemann-compatible. As a special case of the main result, we obtain the curvature properties of Schwarzschild metric. Finally, we compare the curvature properties of Vaidya metric with another radiating metric, namely, Ludwig-Edgar pure radiation metric.

机译：作为Schwarzschild解决方案的概括，Vaidya提出了一种辐射度量，以开发一个星星外部的模型，包括其辐射场，名为Waidya度量标准。本文涉及研究Vaidya公制的曲率特性。结果表明，VAIDYA度量可以被认为是不同的伪数 - 度量曲率条件的模型，即C. c = m / r〜3q（g，c），r·r-q（s，r）= m / r〜3q（g，c）等。还表明VAIDya指标是RICCI简单，消失的标量曲率和其Ricci张量是riemann兼容的。作为主要结果的特殊情况，我们获得了Schwarzschild度量的曲率特性。最后，我们将Vaidya公制的曲率特性与另一个辐射度量进行比较，即Ludwig-Edgar纯辐射度量。

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来源
《Indian Journal of Mathematics 》 |2019年第1期| 共19页
作者
Absos Ali Shaikh; Haradhan Kundu; Jayashree Sen;
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作者单位

Department of Mathematics University of Burdwan Golapbag Burdwan - 713 104 West Bengal India;

Department of Mathematics University of Burdwan Golapbag Burdwan - 713 104 West Bengal India;

Department of Mathematics University of Burdwan Golapbag Burdwan - 713 104 West Bengal India;

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原文格式 PDF
正文语种 eng
中图分类数学 ;
关键词
Einstein field equations; Schwarzschild metric; Vaidya metric; Ludwig-Edgar pure radiation metric; quasi-Einstein manifold; Einstein manifold; Ricci flat manifold; Ricci-simple manifold; pseudosymmetry type curvature condition;

机译：爱因斯坦野外方程式;施瓦茨柴尔德公制;伐达岛公制;Ludwig-Edgar纯辐射度量;准爱因斯坦歧管;爱因斯坦歧管;RICCI扁平歧管;RICCI简单歧管;假型微型型曲率;

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专利

1. CURVATURE PROPERTIES OF THE VAIDYA METRIC [J] . Absos Ali Shaikh, Haradhan Kundu, Jayashree Sen Indian Journal of Mathematics . 2019 ,第1期

机译：Vaidya公制的曲率特性
2. sler metrics of scalar flag curvature with special non-Riemannian curvature properties [J] . B. Najafi, Z. Shen, A. Tayebi Geometriae Dedicata . 2008 ,第1期

机译：具有特殊非黎曼曲率性质的标量标志曲率的sler度量
3. Finsler metrics of scalar flag curvature with special non-Riemannian curvature properties [J] . B. Najafi, Z. Shen, A. Tayebi Geometriae Dedicata . 2008 ,第1期

机译：具有特殊非黎曼曲率性质的标量标志曲率的Finsler度量
4. Curvature properties of (α, β)-metrics [C] . Sandor Bacso, Xinyue Cheng, Zhongmin Shen Symposium on Finsler Geometry . 2007

机译：（α，β） - 仪的曲率特性
5. Curvature properties of intrinsic metrics [D] . Sanderson, John Matthew 1996

机译：内在度量的曲率性质
6. Multiplier ideal sheaves and existence of Kähler-Einstein metrics of positive scalar curvature [O] . Alan Michael Nadel 2017

机译：乘数理想滑轮和正标量曲率的Kähler-Einstein度量的存在
7. Finsler metrics of scalar flag curvature with special non-Riemannian curvature properties [O] . B. Najafi, Z. Shen, A. Tayebi 2006

机译：具有特殊非黎曼曲率性质的标量旗曲率的Finsler度量
8. Some Curvature Properties of Quarter Symmetric Metric Connections [R] . Rastogi, S. C. 1986

机译：四分之一对称度量连接的一些曲率性质

CURVATURE PROPERTIES OF THE VAIDYA METRIC

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