具有$(\ well，\，m)$型度量连接的不定Kaehler流形的类光超曲面

IF 0.4 Q4 MATHEMATICS International Electronic Journal of Geometry Pub Date : 2023-10-29 DOI:10.36890/iejg.1264249

Dae Ho JİN, Chul Woo LEE, Jae Won LEE

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引用次数: 0

摘要

Jin介绍了一种非对称度量连接，称为{\it$(\ell,m)$型度量连接}\cite{Jin1, Jin2}。$(\ell, m)$类型有两个例子:${\ell}=1$和$m=0$是半对称度量连接，${\ell}=0$和$m=1$是四分之一对称连接。我们的目的是研究具有$(\ell,m)$型度量连接的不定(复)Kaehler流形在这种超表面上的切特征向量场下的类光超表面。

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Lightlike hypersurfaces of an indefinite Kaehler manifold with an $(\ell,\,m)$-type metric connection

Jin introduced a non-symmetric metric connection, called an {\it $(\ell,m)$-type metric connection} \cite{Jin1, Jin2}. There are two examples of $(\ell, m)$-type: a semi-symmetric metric connection when ${\ell}=1$ and $m=0$ and a quater-symmetric connection for ${\ell}=0$ and $m=1$ . Our purpose is to investigate lightlike hypersurfaces of an indefinite (complex) Kaehler manifolds with an $(\ell,m)$-type metric connection under the tangent characteristic vector field on such hypersurfaces.

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