Longwap, Silas and Bitrus, Gukat G. and Chigozie, Chibuisi (2021) Some Geometric Properties of a Non-Strict Eight Dimensional Walker Manifold. Journal of Advances in Mathematics and Computer Science, 36 (5). pp. 107-119. ISSN 2456-9968
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Abstract
An 8 dimensional Walker manifold (M; g) is a strict walker manifold if we can choose a coordinate system fx1; x2; x3; x4; x5; x6; x7; x8g on (M,g) such that any function f on the manfold (M,g), f(x1; x2; x3; x4; x5; x6; x7; x8) = f(x5; x6; x7; x8): In this work, we dene a Non-strict eight dimensional walker manifold as the one that we can choose the coordinate system such that for any f in (M; g); f(x1; x2; x3; x4; x5; x6; x7; x8) = f(x1; x2; x3; x4): We derive cononical form of the Levi-Civita connection, curvature operator, (0; 4)-curvature tansor, the Ricci tensor, Weyl tensorand study some of the properties associated with the class of Non-strict 8 dimensionalWalker manifold. We investigate the Einstein property and establish a theorem for the metric to be locally conformally at.
Item Type: | Article |
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Subjects: | South Archive > Mathematical Science |
Depositing User: | Unnamed user with email support@southarchive.com |
Date Deposited: | 20 Jan 2023 09:00 |
Last Modified: | 29 Jun 2024 12:29 |
URI: | http://ebooks.eprintrepositoryarticle.com/id/eprint/77 |