Research Article
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Year 2022, , 47 - 56, 30.04.2022
https://doi.org/10.36890/iejg.875477

Abstract

References

  • Honda, S., Takahashi, M.: Framed curves in the Euclidean space, Advances in Geometry, 16(3), 265-276 (2016)
  • Wang, Y., Pei, D., Gao, R., Generic properties of framed rectifying curves, Mathematics,7, 37 (2019)
  • Dogan Yazıcı, B., Özkaldı Karakuş, S., Tosun, M., Framed normal curves in Euclidean space, Tbilisi Mathematical Journal, 27-37 (2019)
  • Honda, S., Takahashi, M., Evolutes and focal surfaces of framed immersions in the Euclidean space, Proceedings of the Royal Society of Edinburgh Sect. A., 150(1), 497-516 (2019)
  • Fukunaga, T., Takahashi, M., Existence conditions of framed curves for smooth curves, Journal of Geometry, 108, 763-774 (2017)
  • Honda, S., Rectifying developable surfaces of framed base curves and framed helices, Advanced Studies in Pure Mathematics, 78, 273-292 (2018)
  • Deshmukh, S., Chen B.Y., Turki, N.B.: A differential equations for Frenet curves in Euclidean 3-space and its applications. Rom. J. Math. Comput. Sci, 8(1), 1-6 (2018)
  • Chen, B.Y., When does the position vector of a space curve always lie in its rectifying plane?, Amer Math Monthly, 110, 147-152 (2003)
  • Chen, B.Y., Dillen, F., Rectifying curves as centrodes and extremal curves. Bull Inst Math Academia Sinica, 33, 77-90 (2005)
  • Deshmukh, S., Chen B.Y., Alshammari S.H.: On rectifying curves in Euclidean 3-space, Turk J Math, 42(2), 609-620 (2018)

Framed Curves and Their Applications Based on a New Differential Equation

Year 2022, , 47 - 56, 30.04.2022
https://doi.org/10.36890/iejg.875477

Abstract

Characterization is very important for non-regular curves in differential geometry. Recently, the concept of framed curve has been proposed to examine a non-regular curve. Framed curves are defined as smooth curves with a moving frame that can have singular points. In this paper, the differential equation is obtained by using distance squared functions for framed curves with for each $p,q\neq 0$ framed curvatures in Euclidean space. Next, we give the relationships between this differential equation and some special curves. Moreover we intoduce a new equation of framed helices with the help of this differential equation. Moreover, these are support by some examples and figures.

References

  • Honda, S., Takahashi, M.: Framed curves in the Euclidean space, Advances in Geometry, 16(3), 265-276 (2016)
  • Wang, Y., Pei, D., Gao, R., Generic properties of framed rectifying curves, Mathematics,7, 37 (2019)
  • Dogan Yazıcı, B., Özkaldı Karakuş, S., Tosun, M., Framed normal curves in Euclidean space, Tbilisi Mathematical Journal, 27-37 (2019)
  • Honda, S., Takahashi, M., Evolutes and focal surfaces of framed immersions in the Euclidean space, Proceedings of the Royal Society of Edinburgh Sect. A., 150(1), 497-516 (2019)
  • Fukunaga, T., Takahashi, M., Existence conditions of framed curves for smooth curves, Journal of Geometry, 108, 763-774 (2017)
  • Honda, S., Rectifying developable surfaces of framed base curves and framed helices, Advanced Studies in Pure Mathematics, 78, 273-292 (2018)
  • Deshmukh, S., Chen B.Y., Turki, N.B.: A differential equations for Frenet curves in Euclidean 3-space and its applications. Rom. J. Math. Comput. Sci, 8(1), 1-6 (2018)
  • Chen, B.Y., When does the position vector of a space curve always lie in its rectifying plane?, Amer Math Monthly, 110, 147-152 (2003)
  • Chen, B.Y., Dillen, F., Rectifying curves as centrodes and extremal curves. Bull Inst Math Academia Sinica, 33, 77-90 (2005)
  • Deshmukh, S., Chen B.Y., Alshammari S.H.: On rectifying curves in Euclidean 3-space, Turk J Math, 42(2), 609-620 (2018)
There are 10 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Research Article
Authors

Bahar Doğan Yazıcı 0000-0001-5690-4840

Sıddıka Özkaldı Karakuş 0000-0002-2699-4109

Murat Tosun 0000-0002-4888-1412

Publication Date April 30, 2022
Acceptance Date July 2, 2021
Published in Issue Year 2022

Cite

APA Doğan Yazıcı, B., Özkaldı Karakuş, S., & Tosun, M. (2022). Framed Curves and Their Applications Based on a New Differential Equation. International Electronic Journal of Geometry, 15(1), 47-56. https://doi.org/10.36890/iejg.875477
AMA Doğan Yazıcı B, Özkaldı Karakuş S, Tosun M. Framed Curves and Their Applications Based on a New Differential Equation. Int. Electron. J. Geom. April 2022;15(1):47-56. doi:10.36890/iejg.875477
Chicago Doğan Yazıcı, Bahar, Sıddıka Özkaldı Karakuş, and Murat Tosun. “Framed Curves and Their Applications Based on a New Differential Equation”. International Electronic Journal of Geometry 15, no. 1 (April 2022): 47-56. https://doi.org/10.36890/iejg.875477.
EndNote Doğan Yazıcı B, Özkaldı Karakuş S, Tosun M (April 1, 2022) Framed Curves and Their Applications Based on a New Differential Equation. International Electronic Journal of Geometry 15 1 47–56.
IEEE B. Doğan Yazıcı, S. Özkaldı Karakuş, and M. Tosun, “Framed Curves and Their Applications Based on a New Differential Equation”, Int. Electron. J. Geom., vol. 15, no. 1, pp. 47–56, 2022, doi: 10.36890/iejg.875477.
ISNAD Doğan Yazıcı, Bahar et al. “Framed Curves and Their Applications Based on a New Differential Equation”. International Electronic Journal of Geometry 15/1 (April 2022), 47-56. https://doi.org/10.36890/iejg.875477.
JAMA Doğan Yazıcı B, Özkaldı Karakuş S, Tosun M. Framed Curves and Their Applications Based on a New Differential Equation. Int. Electron. J. Geom. 2022;15:47–56.
MLA Doğan Yazıcı, Bahar et al. “Framed Curves and Their Applications Based on a New Differential Equation”. International Electronic Journal of Geometry, vol. 15, no. 1, 2022, pp. 47-56, doi:10.36890/iejg.875477.
Vancouver Doğan Yazıcı B, Özkaldı Karakuş S, Tosun M. Framed Curves and Their Applications Based on a New Differential Equation. Int. Electron. J. Geom. 2022;15(1):47-56.