Geometrical invariant element's in theory 2F- mapping between Riemannian spaces A\(_n\) which have tensors (F)\(^3\)=0
University of Aden Journal of Natural and Applied Sciences,
Vol. 21 No. 2 (2017),
31-08-2017
Page 267-277
DOI:
https://doi.org/10.47372/uajnas.2017.n2.a06
Abstract
In this paper we define Riemannian space that’s exist in its tensor (F)3=0, and remain the necessary and sufficient conditions in order to be exist 2F -mapping, between Riemannian spaces ̅An ,An which have tensors (F)3=0 later fined Geometrical invariant element's in 2F mapping between Riemannian spaces ̅An ,A_nwith have tensors (F)3=0.
Keywords:
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Riemannian space of tensor, \((F)^3=0\), 2F -mapping
How to Cite
Haider ع. أ. (2017). Geometrical invariant element’s in theory 2F- mapping between Riemannian spaces A\(_n\) which have tensors (F)\(^3\)=0. University of Aden Journal of Natural and Applied Sciences, 21(2), 267–277. https://doi.org/10.47372/uajnas.2017.n2.a06
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