[2] Barbier, E., Note Sur le Probleme de I’aiguille et le jeu du Joint Couvert, Journal de
Math´ematiques Pures et Appliqu´ees, 2 (1860), no. 5, 273-286.
[3] Fujiwara, M., On space Curves of Constant Breadth, Tohoku Mathematical Journal, 5 (1914),
180-184.
[4] Blaschke, W., Leibziger Berichte, 67 (1917), 290.
[5] Ball, N.H., On Ovals, American Mathematical Monthly, 37 (1930), no. 7, 348-353.
[6] Mellish, A.P., Notes on Differential Geometry, Annals of Mathematics, 32 (1931), no. 1,
181-190.
[7] Hammer, P.C., Constant Breadth Curves in the Plane, Procedings of the American Mathematical
Society, 6 (1955), no. 2, 333-334.
[9] Köse, O., Düzlemde Ovaller ve Sabit Genişlikli Eğrilerin Bazı Özellikleri, Doğa Bilim Dergisi,
Seri B, 8 (1984), no. 2, 119-126.
[10] Köse, O., On Space Curves of Constant Breadth, ¨ Do˘ga Tr. J. Math, 10 (1986), no. 1, 11-14.
[11] Ma˘gden, A., and Köse, O., On the Curves of Constant Breadth in ¨ E4 Space, Tr. J. of
Mathematics, 21 (1997), 277-284.
[12] Akdoğan, Z., and Mağden, A., Some Characterization of Curves of Constant Breadth in En
Space, Turk J Math, 25 (2001), 433-444.
[13] Reuleaux, F., The Kinematics of Machinery, Translated by A. B. W. Kennedy, Dover Pub.
New York, 1963.
[14] Sezer, M., Differential Equations Characterizing Space Curves of Constant Breadth and a
Criterion for These Curves, Turkish J. of Math, 13 (1989), no. 2, 70-78.
[15] Onder, M., Kocayi˘git, H. and Candan, E., Differential Equations Characterizing Timelike ¨
and Spacelike Curves of Constant Breadth in Minkowski 3-Space E31, J. Korean Math. Soc.
48 (2011), no. 4, 849-866.
[16] Kocayiğit, H. and Önder, M., Space Curves of Constant Breadth in Minkowski 3-Space, ¨
Annali di Matematica, 192 (2013), no. 5, 805-814.
[17] O’Neill, B., Semi Riemannian Geometry with Applications to Relativity, Academic Press,
New York, 1983.
[18] Hanson, A.J. and Ma, H., Parallel Transport Approach to Curve Framing, Indiana University,
Technical Report TR425, January 11, 1995.
[19] Bishop, R.L., There is More Than One Way to Frame a Curve, American Mathematical
Monthly, 82 (1975), no. 3, 246-251.
[20] Hanson, A.J., and Ma, H., Quaternion Frame Approach to Streamline Visualization, IEEE
Transactions on Visulation and Computer Graphics, 1 (1995), no.2, 164-174.
[21] B. Bükçü and M.K. Karacan, Bishop frame of the spacelike curve with a spacelike principal
normal in Minkowski 3-space, Commun. Fac. Sci. Univ. Ank. Series A1, 57 (2008), no. 1,
13-22.
[22] B. Bükçü and M.K. Karacan, Bishop frame of the spacelike curve with a spacelike binormal
in Minkowski 3-space, Selçuk J. Appl. Math, 11 (2010), no. 1, 15-25.
[23] Bükçü, B. and Karacan, M.K., The Slant Helices according to Bishop Frame of the Spacelike
Curve in Lorentzian Space, Journal of Interdisciplinary Mathematics, 12 (2009), no. 5, 691-
700.
SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE
[2] Barbier, E., Note Sur le Probleme de I’aiguille et le jeu du Joint Couvert, Journal de
Math´ematiques Pures et Appliqu´ees, 2 (1860), no. 5, 273-286.
[3] Fujiwara, M., On space Curves of Constant Breadth, Tohoku Mathematical Journal, 5 (1914),
180-184.
[4] Blaschke, W., Leibziger Berichte, 67 (1917), 290.
[5] Ball, N.H., On Ovals, American Mathematical Monthly, 37 (1930), no. 7, 348-353.
[6] Mellish, A.P., Notes on Differential Geometry, Annals of Mathematics, 32 (1931), no. 1,
181-190.
[7] Hammer, P.C., Constant Breadth Curves in the Plane, Procedings of the American Mathematical
Society, 6 (1955), no. 2, 333-334.
[9] Köse, O., Düzlemde Ovaller ve Sabit Genişlikli Eğrilerin Bazı Özellikleri, Doğa Bilim Dergisi,
Seri B, 8 (1984), no. 2, 119-126.
[10] Köse, O., On Space Curves of Constant Breadth, ¨ Do˘ga Tr. J. Math, 10 (1986), no. 1, 11-14.
[11] Ma˘gden, A., and Köse, O., On the Curves of Constant Breadth in ¨ E4 Space, Tr. J. of
Mathematics, 21 (1997), 277-284.
[12] Akdoğan, Z., and Mağden, A., Some Characterization of Curves of Constant Breadth in En
Space, Turk J Math, 25 (2001), 433-444.
[13] Reuleaux, F., The Kinematics of Machinery, Translated by A. B. W. Kennedy, Dover Pub.
New York, 1963.
[14] Sezer, M., Differential Equations Characterizing Space Curves of Constant Breadth and a
Criterion for These Curves, Turkish J. of Math, 13 (1989), no. 2, 70-78.
[15] Onder, M., Kocayi˘git, H. and Candan, E., Differential Equations Characterizing Timelike ¨
and Spacelike Curves of Constant Breadth in Minkowski 3-Space E31, J. Korean Math. Soc.
48 (2011), no. 4, 849-866.
[16] Kocayiğit, H. and Önder, M., Space Curves of Constant Breadth in Minkowski 3-Space, ¨
Annali di Matematica, 192 (2013), no. 5, 805-814.
[17] O’Neill, B., Semi Riemannian Geometry with Applications to Relativity, Academic Press,
New York, 1983.
[18] Hanson, A.J. and Ma, H., Parallel Transport Approach to Curve Framing, Indiana University,
Technical Report TR425, January 11, 1995.
[19] Bishop, R.L., There is More Than One Way to Frame a Curve, American Mathematical
Monthly, 82 (1975), no. 3, 246-251.
[20] Hanson, A.J., and Ma, H., Quaternion Frame Approach to Streamline Visualization, IEEE
Transactions on Visulation and Computer Graphics, 1 (1995), no.2, 164-174.
[21] B. Bükçü and M.K. Karacan, Bishop frame of the spacelike curve with a spacelike principal
normal in Minkowski 3-space, Commun. Fac. Sci. Univ. Ank. Series A1, 57 (2008), no. 1,
13-22.
[22] B. Bükçü and M.K. Karacan, Bishop frame of the spacelike curve with a spacelike binormal
in Minkowski 3-space, Selçuk J. Appl. Math, 11 (2010), no. 1, 15-25.
[23] Bükçü, B. and Karacan, M.K., The Slant Helices according to Bishop Frame of the Spacelike
Curve in Lorentzian Space, Journal of Interdisciplinary Mathematics, 12 (2009), no. 5, 691-
700.
Kocayiğit, H., & Çetin, M. (2015). SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE. Mathematical Sciences and Applications E-Notes, 3(1), 86-93. https://doi.org/10.36753/mathenot.421222
AMA
Kocayiğit H, Çetin M. SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE. Math. Sci. Appl. E-Notes. May 2015;3(1):86-93. doi:10.36753/mathenot.421222
Chicago
Kocayiğit, Hüseyin, and Muhammed Çetin. “SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE”. Mathematical Sciences and Applications E-Notes 3, no. 1 (May 2015): 86-93. https://doi.org/10.36753/mathenot.421222.
EndNote
Kocayiğit H, Çetin M (May 1, 2015) SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE. Mathematical Sciences and Applications E-Notes 3 1 86–93.
IEEE
H. Kocayiğit and M. Çetin, “SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE”, Math. Sci. Appl. E-Notes, vol. 3, no. 1, pp. 86–93, 2015, doi: 10.36753/mathenot.421222.
ISNAD
Kocayiğit, Hüseyin - Çetin, Muhammed. “SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE”. Mathematical Sciences and Applications E-Notes 3/1 (May 2015), 86-93. https://doi.org/10.36753/mathenot.421222.
JAMA
Kocayiğit H, Çetin M. SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE. Math. Sci. Appl. E-Notes. 2015;3:86–93.
MLA
Kocayiğit, Hüseyin and Muhammed Çetin. “SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE”. Mathematical Sciences and Applications E-Notes, vol. 3, no. 1, 2015, pp. 86-93, doi:10.36753/mathenot.421222.
Vancouver
Kocayiğit H, Çetin M. SPACELIKE CURVES OF CONSTANT BREADTH ACCORDING TO BISHOP FRAME IN MINKOWSKI 3-SPACE. Math. Sci. Appl. E-Notes. 2015;3(1):86-93.