SOME CHARACTERIZATION OF ALMOST HERMITIAN MANIFOLDS
Yıl 2012,
Cilt: 5 Sayı: 2, 59 - 66, 30.10.2012
Hakan M. Taştan
Öz
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)
Kaynakça
- [1] G.T. Gancev, Almost Hermitian manifolds similar to complex space forms, C.R. Acad. Bulgare
Sci. 32(1979), 1179-1182.
- [2] A. Gray, Nearly Kahler manifolds, J. Differential Geometry 4(1970), 283-309.
- [3] O.T. Kassabov, On the axiom of planes and the axiom of spheres in the almost Hermitian
geometry, Serdica 8(1982), no.1, 109-114.
- [4] V.F. Kirichenko and I.V. Tret'yakova, On the constant-type manifolds of almost Hermitian
manifolds, Mathematical Notes, 68(2000), no.5, 569-575.
- [5] K. Ogiue, On invariant immersions, Ann. Math. Pura Appl. 4(1968), 387-397.
- [6] G.B. Rizza, On almost Hermitian manifolds with constant holomorphic sectional curvature
at a point, Tensor, N.S., 50(1991), 79-89.
- [7] G.B. Rizza, On almost constant-type manifolds, Journal of Geometry, 48(1993), 174-183.
- [8] F. Tricerri and L. Vanhecke, Curvature tensors on almost Hermitian manifolds, Trans. Amer.
Math. Soc. 267(1981), no.2, 365-398.
- [9] L. Vanhecke, Almost Hermitian manifolds with J-invariant Riemann curvature tensor, Rend.
Sem. Mat. Univers. Politech. Torino 34(1975-76), 487-498.
- [10] K. Yano and M. Kon, Structures on Manifolds, World Scientic, Singapore, 1984.
Yıl 2012,
Cilt: 5 Sayı: 2, 59 - 66, 30.10.2012
Hakan M. Taştan
Kaynakça
- [1] G.T. Gancev, Almost Hermitian manifolds similar to complex space forms, C.R. Acad. Bulgare
Sci. 32(1979), 1179-1182.
- [2] A. Gray, Nearly Kahler manifolds, J. Differential Geometry 4(1970), 283-309.
- [3] O.T. Kassabov, On the axiom of planes and the axiom of spheres in the almost Hermitian
geometry, Serdica 8(1982), no.1, 109-114.
- [4] V.F. Kirichenko and I.V. Tret'yakova, On the constant-type manifolds of almost Hermitian
manifolds, Mathematical Notes, 68(2000), no.5, 569-575.
- [5] K. Ogiue, On invariant immersions, Ann. Math. Pura Appl. 4(1968), 387-397.
- [6] G.B. Rizza, On almost Hermitian manifolds with constant holomorphic sectional curvature
at a point, Tensor, N.S., 50(1991), 79-89.
- [7] G.B. Rizza, On almost constant-type manifolds, Journal of Geometry, 48(1993), 174-183.
- [8] F. Tricerri and L. Vanhecke, Curvature tensors on almost Hermitian manifolds, Trans. Amer.
Math. Soc. 267(1981), no.2, 365-398.
- [9] L. Vanhecke, Almost Hermitian manifolds with J-invariant Riemann curvature tensor, Rend.
Sem. Mat. Univers. Politech. Torino 34(1975-76), 487-498.
- [10] K. Yano and M. Kon, Structures on Manifolds, World Scientic, Singapore, 1984.
Toplam 10 adet kaynakça vardır.