References
- A. T. Ali, Position vectors of curves in the Galilean space G3, Math. Bech., 64 (2012), 200-210.
- E. Bayram, F. Guler and E. Kasap, Parametric representation of a surface pencil with a common asymptotic curve, Comput. Aided Des., 44 (2012), 637-643. doi: https://doi.org/10.1016/j.cad.2012.02.007
- M. Dede, Tubular surfaces in Galilean space, Math. Commun., 18 (2013), 209--217 .
- M. Dede, C. Ekici and A. C. Çöken, On the parallel surfaces in Galilean space, Hacet. J. Math. Stat. 42 (2013), 605--615 .
- E. Kasap and F.T. Akyildiz, Surfaces with a Common Geodesic in Minkowski 3-space. App. Math. and Comp., 177 (2006), 260-270. doi: https://doi.org/10.1016/j.amc.2005.11.005
- M. K. Karacan, Y. Tunçer and M. Doruk, Darboux rotation axis of the curve in Galilean and Pseudo-Galilean spaces, J. Vec. Rel., 6 (2011), 107-116.
- O. Kaya and M. Önder, Construction of a surface pencil with a common special surface curve, J. Mahani Math. Res. Center, 6 (2017), 57-72.
- H. Kilean, On intrinsic nonlinear particle motion in compact synchrotrons. Diss. faculty of the University Graduate School in partial fulfillment of the requirement for the degree Doctor of Philosophy in the Department of Physics, Indiana University, 2016.
- Z. Küçükarslan Yüzbaşı, On a family of surfaces with common asymptotic curve in the Galilean Space G3, J. Nonlinear Sci. Appl, 9 (2016), 518--523. doi: https://doi.org/10.22436/jnsa.009.02.17
- S. Y. Lee, Accelerator physics. World scientific, 2004.
- C. Y. Li, R. H. Wang and C. G. Zhu, Parametric representation of a surface pencil with a common line of curvature. Comput. Aid. Design. 43 (2011), 1110--1117. doi: https://doi.org/10.1016/j.cad.2011.05.001
- A. Ögrenmiş, M. Ergüt and M., Bektaş, On the helices in the Galilean space G3. Iran. J. Sci. Tech., 31 (2007), 177--181.
- B. J. Pavkovic and I. Kamenarovic, The equiform differential geometry of curves in the Galilean space G3. Glas. Mat. 22 (1907), 449-457.
- O. Roschel, Die geometrie des Galileischen raumes, Forsch. Graz, Mathematisch-Statistische Sektion, (Graz, 1985.)
- Z. M. Sipus, Ruled Weingarten surfaces in the Galilean space. Period. Math. Hung. 56, (2008), 213--225. doi: https://doi.org/10.1007/s10998-008-6213-6
- G. J. Wang, K. Tang and C.L. Tai, Parametric representation of a surface pencil with a common spatial geodesic. Comput. Aid. Des.,36 (2004), 447-459. doi: https://doi.org/10.1016/S0010-4485(03)00117-9
- I. M. Yaglom, A simple non-Euclidean geometry and its physical basis., Springer-Verlag, New York, 1979.