Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds

Ahmet Yıldız

doi:10.36890/iejg.1470495

Araştırma Makalesi

Yıl 2024, Cilt: 17 Sayı: 2, 394 - 401

Ahmet Yıldız

https://doi.org/10.36890/iejg.1470495

Öz

Kaynakça

[1] Blair D. E., On the geometric meaning of the Bochner Tensor, Geom. Dedicata 4, 33-38 (1975).
[2] Blair D.E., Koufogiorgos T., Papantoniou B. J., Contact metric manifolds satisfying a nullity condition, Israel Journal of Math. 91, 189-214 (1995).
[3] Blair D.E., Two remarks on contact metric structures, Tôhoku Math. J., 29, 319-324, (1977).
[4] Bochner S., Curvature and Betti numbers, Ann. of Math. (2) 50, 77-93 (1949).
[5] Boothby W. M., and Wang H. C., On contact manifolds, Ann. of Math. 68, 721-734 (1958).
[6] Endo H., On K-contact Riemannian manifolds with vanishing E-contact Bochner curvature tensor, Colloq. Math., Vol.LXII, no.2, 293-297 (1991).
[7] Hasegawa I. and Nakane T., On Sasakian manifolds with vanishing contact Bochner curvature tensor II, Hokkaido Math. J. 11 , 44-51 (1982).
[8] Ikawa T. and Kon M., Sasakian manifolds with vanishing contact Bochner curvature tensor and constant scalar curvature, Colloq. Math. 37, 113-122 (1977).
[9] Matsumoto M. and Chuman G., On the C-Bochner curvature tensor, TRU Math., 5 , 21-30 (1969).
[10] Papantoniou B. J., Contact Riemannian manifolds satisfying R(ξ,X) · R = 0 and ξ ∈ (`k,`μ)-nullity distribution, Yokohama Math. J., 40, 149-161 (1993).
[11] Shaikh A. A. and Baishya, K. K., On (`k,`μ)-contact metric manifolds, Diff. Geom.-Dynm. System, 8 , 253-261 (2006).
[12] Yano K., Differential geometry of anti-invariant submanifolds of a Sasakian manifold, Boll. Un. Mat. Ital., 12 , 279-296 (1975).
[13] Yano K., Anti-invariant submanifolds of a Sasakian manifold with vanishing contact Bochner curvature tensor, J. Diff. Geom., 12 , 153-170 (1977).

Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds

Yıl 2024, Cilt: 17 Sayı: 2, 394 - 401

Ahmet Yıldız

https://doi.org/10.36890/iejg.1470495

Öz

The object of the present paper is to study $(\grave{k},\grave{\mu})$-contact metric manifolds with generalized extended $C$-Bochner curvature tensor.

Anahtar Kelimeler

(`k; `μ)-contact metric manifold, Sasakian manifold, C-Bochner curvature tensor, generalized extended C-Bochner curvature tensor.

Kaynakça

[1] Blair D. E., On the geometric meaning of the Bochner Tensor, Geom. Dedicata 4, 33-38 (1975).
[2] Blair D.E., Koufogiorgos T., Papantoniou B. J., Contact metric manifolds satisfying a nullity condition, Israel Journal of Math. 91, 189-214 (1995).
[3] Blair D.E., Two remarks on contact metric structures, Tôhoku Math. J., 29, 319-324, (1977).
[4] Bochner S., Curvature and Betti numbers, Ann. of Math. (2) 50, 77-93 (1949).
[5] Boothby W. M., and Wang H. C., On contact manifolds, Ann. of Math. 68, 721-734 (1958).
[6] Endo H., On K-contact Riemannian manifolds with vanishing E-contact Bochner curvature tensor, Colloq. Math., Vol.LXII, no.2, 293-297 (1991).
[7] Hasegawa I. and Nakane T., On Sasakian manifolds with vanishing contact Bochner curvature tensor II, Hokkaido Math. J. 11 , 44-51 (1982).
[8] Ikawa T. and Kon M., Sasakian manifolds with vanishing contact Bochner curvature tensor and constant scalar curvature, Colloq. Math. 37, 113-122 (1977).
[9] Matsumoto M. and Chuman G., On the C-Bochner curvature tensor, TRU Math., 5 , 21-30 (1969).
[10] Papantoniou B. J., Contact Riemannian manifolds satisfying R(ξ,X) · R = 0 and ξ ∈ (`k,`μ)-nullity distribution, Yokohama Math. J., 40, 149-161 (1993).
[11] Shaikh A. A. and Baishya, K. K., On (`k,`μ)-contact metric manifolds, Diff. Geom.-Dynm. System, 8 , 253-261 (2006).
[12] Yano K., Differential geometry of anti-invariant submanifolds of a Sasakian manifold, Boll. Un. Mat. Ital., 12 , 279-296 (1975).
[13] Yano K., Anti-invariant submanifolds of a Sasakian manifold with vanishing contact Bochner curvature tensor, J. Diff. Geom., 12 , 153-170 (1977).

Toplam 13 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Cebirsel ve Diferansiyel Geometri
Bölüm	Araştırma Makalesi
Yazarlar	Ahmet Yıldız 0000-0002-9799-1781
Erken Görünüm Tarihi	19 Eylül 2024
Yayımlanma Tarihi
Gönderilme Tarihi	18 Nisan 2024
Kabul Tarihi	11 Temmuz 2024
Yayımlandığı Sayı	Yıl 2024 Cilt: 17 Sayı: 2

Kaynak Göster

APA	Yıldız, A. (2024). Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds. International Electronic Journal of Geometry, 17(2), 394-401. https://doi.org/10.36890/iejg.1470495
AMA	Yıldız A. Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds. Int. Electron. J. Geom. Eylül 2024;17(2):394-401. doi:10.36890/iejg.1470495
Chicago	Yıldız, Ahmet. “Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds”. International Electronic Journal of Geometry 17, sy. 2 (Eylül 2024): 394-401. https://doi.org/10.36890/iejg.1470495.
EndNote	Yıldız A (01 Eylül 2024) Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds. International Electronic Journal of Geometry 17 2 394–401.
IEEE	A. Yıldız, “Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds”, Int. Electron. J. Geom., c. 17, sy. 2, ss. 394–401, 2024, doi: 10.36890/iejg.1470495.
ISNAD	Yıldız, Ahmet. “Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds”. International Electronic Journal of Geometry 17/2 (Eylül 2024), 394-401. https://doi.org/10.36890/iejg.1470495.
JAMA	Yıldız A. Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds. Int. Electron. J. Geom. 2024;17:394–401.
MLA	Yıldız, Ahmet. “Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds”. International Electronic Journal of Geometry, c. 17, sy. 2, 2024, ss. 394-01, doi:10.36890/iejg.1470495.
Vancouver	Yıldız A. Generalized Extended $C$-Bochner Curvature Tensor on $(\grave{k},\grave{\mu})$-Contact Metric Manifolds. Int. Electron. J. Geom. 2024;17(2):394-401.

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