The essential relations in theorem of 2F mappings between Remannian spaces which have structure (F\(^3\) )=0
University of Aden Journal of Natural and Applied Sciences,
Vol. 22 No. 1 (2018),
30-04-2018
Page 51-58
DOI:
https://doi.org/10.47372/uajnas.2018.n1.a05
Abstract
In this paper, we have define 2F- mapping between Riemannian spaces which have the structure (F3 )=0, remembering the necessary and sufficient conditions for the existence of 2F-mapping between Riemannian spaces An and finding the Essential relations in the theory of 2F- mapping between Riemannian spaces which have structure (F3 )=0. An example of Riemannian spaces, in to which 2F-mapping exist between them, is given.
Keywords:
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Remannian spaces which have structure (F\(^3\))=0
How to Cite
Haider ع. ا. (2018). The essential relations in theorem of 2F mappings between Remannian spaces which have structure (F\(^3\) )=0. University of Aden Journal of Natural and Applied Sciences, 22(1), 51–58. https://doi.org/10.47372/uajnas.2018.n1.a05
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