Induced Structures Of The Product Of Riemannian Manifolds
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- [1] Boothby, W.M., Homogeneous complex contact manifolds, Proc. Symps. AMS III Diff. Geom.
(1961), 144-154.
- [2] Boothby, W.M., A note on homogeneous complex contact mafifolds,Proc. Amer. Math. Soc.
13 (1962), 276-280.
- [3] Capursi, M., Some remarks on the product of two almost contact
manifolds, An.Sti.Univ.”Al.I.Cuza” Iasi, 30 (1984), 75-79.
- [4] Chinea, D. and Gonzalez, C.,A classification of almost contact metric manifolds,Ann. Mat.
Pura Appl. 156(1990), 15-36.
- [5] Gray, A. and Hervella, L.M., The sixteen classes of almost Hermitian manifolds and their
linear invariants, Ann. Mat. Pura Appl., 123 (1980), 35-58.
- [6] Kobayashi, S., Remarks on complex contact manifolds, Proc. Amer. Math. Soc. 10 (1959),
164-167.
- [7] Kuo, Y.Y., On almost contact 3-structure, Tˆohoku Math.J. 22 (1970), 325-332.
- [8] Oubina, J.A., New classes of almost contact metric structures, Publicationes Mathematicae,
Debrecen, 32 (1985), 187-193.
- [9] Oubina, J.A., ”A classification for almost contact structures”, Preprint (1985).
- [10] Sasaki, S. and Hatakeyama, Y., On differentiable manifolds with certain structures which
are closely related to almost contact structure II, Tˆohoku Math. J., 13 (1961), 281-294.
- [11] Shibuya, Y., On the existence of a complex almost contact structure, Kodai. Math. J. 1
(1978), 197-204.
- [12] Tshikuna-Matamba, T., Quelques classes des vari´et´es m´etriques `a 3-structures
presque de contact, Ann. Univ. Craiova, Math. Comp. Sci. Ser. 31(1) (2004), 94-101.
- [13] Tshikuna-Matamba, T., The differential geometry of almost Hermitian almost contact metric
submersions, Int. J. Math. Math. Sci. 36 (2004), 1923-1935.
- [14] Tshikuna-Matamba, T., Geometric properties of almost contact metric 3−submersions, Pe- riod.
Math. Hungar. 52(1) (2006), 101-119.
- [15] Udriste, C., Structures presque coquaternioniennes, Bull. Math. Soc. Sci. Math.
R.S. Roumanie 13 (1969), 487-507.
- [16] Watson, B., Riemannian submersions and instantons, Math. Modelling,1 (1980), 381-393.
- [17] Watson, B., G,G’-Riemannian submersions and non-linear gauge field equations of general
relativity, in Global Analysis-Analysis in Manifolds, (T.M. Rassias ed.) Teubner-Texte Math, Vol.
57, Teubner, Leipzig, (1983), 324-349.
- [18] Wolf,J., Complex homogeneous contact manifolds and quaternionic symmetric spaces, J.
ech., 14 (1965), 1033-1047.
