On locally conformal Kähler space forms

An m-dimensional locally conformal Kähler manifold (l.c.K-manifold) is characterized as a Hermitian manifold admitting a global closed l-form αλ (called the Lee form) whose structure (Fμλ,gμλ) satisfies ∇νFμλ=−βμgνλ+βλgνμ−αμFνλ+αλFνμ, where ∇λ denotes the covariant differentiation with respect to th...

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Bibliographic Details
Main Author:	Koji Matsumoto
Format:	Article
Language:	English
Published:	Wiley 1985-01-01
Series:	International Journal of Mathematics and Mathematical Sciences
Subjects:	l. c. K-manifolds Lee form l. c. K-space forms hybrid recurrent l. c. K-space form.
Online Access:	http://dx.doi.org/10.1155/S0161171285000060
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Summary:	An m-dimensional locally conformal Kähler manifold (l.c.K-manifold) is characterized as a Hermitian manifold admitting a global closed l-form αλ (called the Lee form) whose structure (Fμλ,gμλ) satisfies ∇νFμλ=−βμgνλ+βλgνμ−αμFνλ+αλFνμ, where ∇λ denotes the covariant differentiation with respect to the Hermitian metric gμλ, βλ=−Fλϵαϵ, Fμλ=Fμϵgϵλ and the indices ν,μ,…,λ run over the range 1,2,…,m.
ISSN:	0161-1712 1687-0425

On locally conformal Kähler space forms

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