Bernsteinn polynomials approach to determine timelike curves of constant breadth in Minkowski 3-space
Bernsteinn polynomials approach to determine timelike curves of constant breadth in Minkowski 3-space
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- [1] A. Magden, O. Köse, ¨ On The Curves Of Constant Breadth In E4 Space, Turk J. Math.,(21), (1997), 277-284.
- [2] A.P. Mellish, Notes On Differential Geometry, Ann Of Math. (2)32, no.1, (1931), 181-190.
- [3] F. Reuleaux, The Kinematics Of Machinery, Trans. By Kennedy A.B.W., Dover Pub. (1963), New York.
- [4] H. Gluck. Higher Curvatures of Curves In Euclidean Space, Proc. Amer. Math. Montly,(73)(1966),699-704.
- [5] H.H. Hacisalihoglu, Diferensiyel Geometri, Ankara Universitesi Fen Fak¨ultesi, (1993), Ankara, 269s.
- [6] J. Walrave, Curves and Surfaces In Minkowski Space, Ph. D. Thesis (1995), K. U. Leuven, Faculty Of Sciences, Leuven. [7] L. Euler, De Curvis trangularibis, Acta Acad. Petropol, (1778, 1780), 3-30.
- [8] M. Fujivara, On Space Curves of Constant Breadth, Thoku Math. J.(5), (1914), 179-184.
- [9] M. Onder, H. Kocayi˘git, E. Candan, Differential Equations Characterizing Timelike and Spacelike Curves of Constant Breadth ˙In Minkowski 3-Space E. J. Korean Math. Soc.(48), no.4, (2011), 849-866.
- [10] M. Sezer, Differential Equations Characterizing Space Curves of Constant Breadth and A Criterion For These Curves, Doga TU J. Math., 13 (2), (1989), 70-78.
- [11] M. Sezer, Integral Characterizations For A System of Frenet Like Differential Equations and Applications, E. U. Faculity of Science, Series Of Scientific Meetings, (1), (1991), 435-444.
- [12] M.I. Bhatti, B. Brocken, Solutions of Differential Equations ˙In A Bernstein Polynomial Basis. Journal of Computational And Applied Mathematics. (205), (2007), 272-280.
- [13] O.R. Isik, M. Sezer and Z. Güney, A rational approximation based on Bernstein polynomials for high order initial and boundary values problems, Applied Mathematics and Computation, 217, (2011), 9438-9450.
- [14] O. Köse, Düzlemde Ovaller ve Sabit Genislikli Egrilerin bazı özellikleri, Doga Bilim Dergisi, Seri B, (2), (1984), 119-126. [15] O. Köse, On Space Curve of Constant Breadth, Doga TU J. Math.,(1), (1986), 11-14.
- [16] T.A. Aydin, Differential Equations Characterizing Curves of Constant Breadth And Spherical Curves In En-Space and Their Solutions, Ph. D. Thesis (2014), Mugla Sıtkı Koc¸man Universty, Mugla.
- [17] V. Dannon, Integral Characterizations And The Theory of Curves, Proc. Amer. Math. Soc.,(4), (1981), 600-602.
- [18] Z. Akdogan, A. Magden, Some Characterization of Curves of Constant Breadth In En Space, Turk J. Math.,(25), (2001), 433-444.
- Başlangıç: 2016
- Yayıncı: Mustafa BAYRAM
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