Normality of the Hyper-Surfaces of Almost Hermite Manifods
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F2=-I2m, (1.1a)
'F(λ,μ)=g(Fλ,μ)=-'F(μ,μ), (1.1b)
is called an almost Hermite manifold with the almost Hermite structure {F,g} (Helgason, 1960; Yano, 1965; Mishra, 1984, p. 67).
Authors
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Banaras Hindu University, Varanasi ,IN
R. S. Mishra
Abstract
An even-dimensional differentiable manifold V2m on which there are defined a tensor field F of the type (1,1) and a metric-tensor field g, satisfying for arbitrary vector fields λ, μ, v, . . . ∈ V2m,F2=-I2m, (1.1a)
'F(λ,μ)=g(Fλ,μ)=-'F(μ,μ), (1.1b)
is called an almost Hermite manifold with the almost Hermite structure {F,g} (Helgason, 1960; Yano, 1965; Mishra, 1984, p. 67).
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Published
1995-06-01
How to Cite
Mishra, R. S. (1995). Normality of the Hyper-Surfaces of Almost Hermite Manifods. The Journal of the Indian Mathematical Society, 61(1-2), 71–79. Retrieved from https://informaticsjournals.co.in/index.php/jims/article/view/21866
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Copyright (c) 1995 R. S. Mishra
This work is licensed under a Creative Commons Attribution 4.0 International License.
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