On Joachimsthal's theorems in Riemann Otsuki space R − O3
On Joachimsthal's theorems in Riemann Otsuki space R − O3
___
- [1] C¸ ¨oken AC, G¨org¨ul¨u A. On Joachimsthals theorems in semi-Euclidean spaces. Nonlinear Anal-Theor 2009; 70: 39323942.
- [2] Djerdji FN. On subspaces of Riemann-Otsuki space. Publ De LInst Math Nouvelle Serie 1981; 30: 5358.
- [3] Djerdji FN. The Frenet formulae of the Riemann-Otsuki space. Review of Research, Faculty of Science, University of Novi Sad, Mathematics Series 1986; 16: 96106.
- [4] Djerdji FN. Auto-parallel curves of Riemann-Otsuki spaces. Review of Research, Faculty of Science, University of Novi Sad, Mathematics Series 1986; 13: 228243.
- [5] Do Carmo MP. Differential Geometry of Curves and Surfaces. Upper Saddle River, NJ, USA: Prentice Hall, 1976.
- [6] Garcia R. Curvature lines of orthogonal surfaces of R3 and Joachimsthal theorem. Civilizar 2004; 1: 141151.
- [7] Gluck H. Higher curvatures of curves in Euclidean space. Amer Math Monthly 1966; 73: 699704.
- [8] Horvath J. A Panorama of Hungarian Mathematics in the Twentieth Century, I. Berlin, Germany: Springer-Verlag, 2006.
- [9] Kaya FE, YaylıY, Hacısaliho˘glu HH. A characterization of cylindrical helix strip. Commun Fac Sci Univ Ank Series A1 2010; 59: 3751.
- [10] Kele¸s S. Manifoldlar i¸cin Joachimsthal Teoremleri. PhD, Fırat University, Elazı˘g, Turkey, 1982 (in Turkish).
- [11] K¨u¸c¨ukarslan Z, Yıldırım M. On Mannheim curves in Riemann-Otsuki space R - O3 . Bol Soc Paran Mat 2013; 31: 7988.
- [12] M Manoel, MC Romero Fuster, CTC Wall. Real and Complex Singularities. London Mathematical Society Lecture Note Series 380. Cambridge, UK: Cambridge University Press, 2010.
- [13] Matsumoto M. What is the Finsler Geometry. Bull Korean Math Soc 1976; 13:121125.
- [14] Otsuki T. On general connections I. Math Journal Okoyama Univ 19591960; 9: 99164.
- [15] Sabuncuo˘glu A, Hacısaliho˘glu HH. On higher curvatures of a curve. Commun Fac Sci Uni Ankara 1975; 24-A: 114.
- [16] Sabuncuo˘glu A, Hacısaliho˘glu HH. Higher curvatures of a strip. Commun Fac Sci Uni Ankara 1975; 24-A: 2533.
- [17] Sabuncuo˘glu A. On the Joachimsthals theorems. J Fac Sci KTU II Series MA 1979; 5: 4146. ¨
- [18] Shandra IG. Pseudoconnections and manifolds with degenerate metric. Journal of Mathematical Science 2004; 119: 658681.
- [19] Tutar A. Lorentz Uzayında K¨uresel E˘griler ve Joachimsthal Teoremi. PhD, Ondokuz Mayıs University, Samsun, Turkey, 1994 (in Turkish).
- [20] Tutar A, Sener O. On the theory of strips and Joachimsthal theorem in the Lorentz space L n ,(n > 3). IJST 2012; A3: 327330.
- [21] Yıldırım M. Bekta¸s M. General properties of Bertrand curves in RiemannOtsuki space. Nonlinear Anal-Theor 2008;69:32253231.
- ISSN: 1300-0098
- Yayın Aralığı: Yılda 6 Sayı
- Yayıncı: TÜBİTAK
Oscillation of second order differential equations with mixed nonlinearities
On Joachimsthal's theorems in Riemann--Otsuki space R-O3
Münevver Yildirim YILMAZ, Mehmet BEKTAŞ
Half-lightlike submanifolds with planar normal sections in R24
Feyza Esra ERDOĞAN, Rıfat GÜNEŞ, Bayram ŞAHİN
Almost contact metric submersions and symplectic manifolds
Augustin BATUBENGE, Tshikunguila TSHIKUNA-MATAMBA
On Kapranov's description of \overline{M}0,n as a Chow quotient
Noah GIANSIRACUSA, William Danny GILLAM
Continuity of Wigner-type operators on Lorentz spaces and Lorentz mixed normed modulation spaces
On semiparallel anti-invariant submanifolds of generalized Sasakian space forms
Cihan ÖZGÜR, Fatma GÜRLER, Cengizhan MURATHAN
Generalized hypercenter of a finite group
Mohamed Ezzat MOHAMED, Mohammed Mosa AL-SHOMRANI
Half-lightlike submanifolds with planar normal sections in R4 2
Rıfat GÜNEŞ, Bayram ŞAHİN, Feyza Esra ERDOGAN