Global Conharmonic Concept Type Nearly Kahler Manifold
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Abstract
The concept of permanence conharmonic type Nearly Kahler manifold conditions are obtained when the Nearly Kahler manifold is a manifold conharmonic constant type. Proved that the local conharmonic constancy of type Nearly Kahler manifold is equivalent to its global conharmonic constancy of type. And also proved that the Nearly Kahler manifold conharmonic constant type is a manifold of constant scalar curvature.
The notion of constancy of type Nearly Kahler manifolds was introduced A.Greem ([1], [2], [3]) and has proved very useful in the study of the geometry of nearly kahler manifolds. Next nearly kahler manifolds of constant type considered various mathematicians (see. [1], [3], [4], [5], [6], [7]). Comprehensive description of Nearly Kahler manifolds of constant type was obtained V.F.Kirichenko [6]. In [6] it is shown that Nearly Kahler manifold of pointwise constant type description by the identity , where B - a function on Nearly Kahler manifold, . Wherein local constancy of type Nearly Kahler manifold is equivalent to the local constancy of its type. Moreover, the covariant constancy of structure tensors of the first and second kind it follows immediately that, the constancy of type at only one point Nearly Kahler space implies global consistency of its type.
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References
1. Gray A. Nearly Kâhler manifolds. J. Diff. Geom.,
4, №3, 1970, 283-309.
2. Gray A. The structures of nearly Kähler manifolds.
Ann. Math. 223 (1976), 233-248.
3. Gray A. Six dimensional almost complex
manifolds defined by means of three-fold vector cross
products. Tôhoku Math. J., 2, 1969, 614-620.
4. VF Kirichenko Some types of K-spaces .// Uspekhi
Mat. Sciences, T.30, №3, 1975, p. 163-164.
5. VF Kirichenko Some results of the theory of kspace.
6th All-Union. Geometry. Conference on the
present-day. probl. geometry. Abstracts. Vilnius,
1975, 112-115.
6. VF Kirichenko K-spaces of constant type. Sib.
Mat. g., 1976, t.17, №3, 282-289.
7. VF Kirichenko K-algebra and K-spaces of constant
type with indefinite metric .// Mateo. notes, 29, №2,
1981, 265-278.
8. Vanhecke L., Bouten F. Constant type for almost
Hermitian manifolds .// Bull. Math. Soc. Sci. math.
RSR. - 1976 (1977), v.20, №3-4, p. 252-258.
9. VF Kirichenko, Rustanov AR, Shihab A.
Geometry curvature tensor conharmonic almost
Hermitian manifolds .// Mat. Notes, 2011, t. 90, №1.