TY - JOUR T1 - Construction of Developable Surface with Geodesic or Line of Curvature Coordinates AU - Althibany, Nabil PY - 2021 DA - September DO - 10.53570/jnt.987265 JF - Journal of New Theory JO - JNT PB - Naim ÇAĞMAN WT - DergiPark SN - 2149-1402 SP - 75 EP - 87 IS - 36 LA - en AB - In this paper, a developable surface with geodesic or line of curvature coordinates is constructed in the Euclidean 3-space. A developable surface is coordinated by two families of parametric curves, base curves (directrices) and lines (rulings). Since any part of a straight line on a developable surface is geodesic and line of curvature, we only need to show that the directrices curves are geodesics or lines of curvature to ensure that the developable surface is parameterized by geodesic or line of curvature coordinates. The necessary and sufficient conditions for the directrices curves to be geodesics or lines of curvature are studied. The main results of this paper show that the developable surface with geodesic coordinates is a generalized cylinder, and the developable surface with line of curvature coordinates is a tangent surface. KW - Developable surface KW - geodesic KW - line of curvature KW - parametric curves KW - coordinates CR - H. Pottmann, A. Asperl, M. Hofer, A. Kilian, Architectural geometry, Bentley Institute Press, 2007. CR - Y. Liu, H. Pottmann, J. Wallner, Y. L. Yang, W. Wang, Geometric Modeling with Conical Meshes and Developable Surfaces, In ACM SIGGRAPH Papers (2006) 681-689. CR - C. Tang, P. Bo, J. Wallner, H. Pottmann, Interactive Design of Developable Surfaces, ACM Transactions on Graphics (TOG) 35(2) (2016) 1-12. CR - W. K. Schief, On the Integrability of Bertrand Curves and Razzaboni Surfaces, Journal of Geometry and Physics 45(1-2) (2003) 130-150. CR - N. Gürbüz, The Motion of Timelike Surfaces in Timelike Geodesic Coordinates, International Journal of Mathematical Analysis 4 (2010) 349-356. CR - Y. Li, C. Chen, The Motion of Surfaces in Geodesic Coordinates and 2+ 1-dimensional Breaking Soliton Equation, Journal of Mathematical Physics 41(4) (2000) 2066-2076. CR - E. Adiels, M. Ander, C. Williams, Brick Patterns on Shells Using Geodesic Coordinates, In Proceedings of IASS Annual Symposia 23 (2017) 1-10 Hamburg, Germany. CR - X. Tellier, C. Douthe, L. Hauswirth, O. Baverel, Surfaces with Planar Curvature Lines: Discretization, Generation and Application to the Rationalization of Curved Architectural Envelopes, Automation in Construction 106 (2019) p.102880. CR - H. Zhao, G. Wang, A New Method for Designing a Developable Surface Utilizing the Surface Pencil through a Given Curve, Progress in Natural Science 18(1) (2008) 105-110. CR - R. A. Al-Ghefaria, A. B. Rashad, An Approach for Designing a Developable Surface with a Common Geodesic Curve, International Journal of Contemporary Mathematical Sciences 8(18) (2013) 875-891. CR - C. Y. Li, R. H. Wang, C. G. Zhu, An Approach for Designing a Developable Surface through a Given Line of Curvature, Computer-Aided Design 45(3) (2013) 621-627. CR - M. D. Carmo, Differential Geometry of Curves and Surfaces, Prentice Hall, New Jersey, 1976. CR - A. N. Pressley, Elementary Differential Geometry, Springer Science & Business Media, 2010. CR - F. Doğan, Y. Yaylı, The Relation between Parameter Curves and Lines of Curvature on Canal Surfaces, Kuwait Journal of Science 44(1) (2017) 29-35. CR - M. I. Shtogrin, Bending of a Piecewise Developable Surface, Proceedings of the Steklov Institute of Mathematics 275(1) (2011) 133-54. CR - N. M. Althibany, Classification of Ruled Surfaces Family with Common Characteristic Curve in Euclidean 3-space, Turkish Journal of Science (2021) In Press. UR - https://doi.org/10.53570/jnt.987265 L1 - https://dergipark.org.tr/en/download/article-file/1942599 ER -