On Holonomy Algebras of Four-Dimensional Generalized Quasi-Einstein Manifolds

Kirik Bahar

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On Holonomy Algebras of Four-Dimensional Generalized Quasi-Einstein Manifolds

机译：在完整的四维代数广义Quasi-Einstein集合管

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abstract_textpGeneralized quasi-Einstein manifolds on 4-dimensional manifolds admitting a metric whose signature is one of the only possibilities (+,+,-,-), (+,+,+,-) are based on the holonomy group of the Levi-Civita connection associated with the metric.By considering the possible Lie algebras which are known for all signatures, the holonomy types permitting generalized quasi-Einstein manifolds are determined using some computational methods and the Ambrose-Singer theorem./p/abstract_text

机译：& abstract_text & p广义quasi-Einstein导管在四维集合管承认签名的一个度量唯一的可能性 (+,+,-,-),(+,+,+,-) 基于完整群的吗Levi-Civita连接相关的指标。这是已知的所有签名,完整吗类型允许广义quasi-Einstein集合管决心使用一些计算方法和Ambrose-Singer定理。;/ p & / abstract_text

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《Proceedings of the National Academy of Sciences, India, Section A. Physical Sciences 》 |2019年第4期| 711-719| 共9页
作者
Kirik Bahar;
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作者单位

Marmara Univ, Fac Arts & Sci, Dept Math, Gortepe Campus, TR-34722 Istanbul, Turkey;

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原文格式 PDF
正文语种英语
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关键词
Manifolds; Algebra; signaturesfour-dimensionalcomputational methods;

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On Holonomy Algebras of Four-Dimensional Generalized Quasi-Einstein Manifolds

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