A new parametrization of Cartan null Bertrand curve in Minkowski 3-space
Keywords:
Bertrand curves, General helices, Slant helices, Cartan null curve, non-null curve, Minkowski 3-spaceAbstract
We define and study a new parametrization of a Bertrand pair $\{\alpha,\,\alpha^{*}\}$, where $\alpha$ is a Cartan null Bertrand curve and $\alpha^{*}$ is a Bertrand partner curve of $\alpha$ in Minkowski 3-space by not taking the principal normal vector of the Cartan null Bertrand curve $\alpha$ parallel to $\overrightarrow{\alpha^{*} \,\alpha}$. We characterize both cases when the curve $\alpha^{*}$ is non-null and the null Bertrand partner of the curve $\alpha$. Further, we investigate this type of Bertrand pair curve as a helix and a slant helix. Also, we provide some examples.
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Published
2024-03-15
How to Cite
Tamta, S., & Gupta, R. S. (2024). A new parametrization of Cartan null Bertrand curve in Minkowski 3-space. International Journal of Maps in Mathematics, 7(1), 2–19. Retrieved from https://simadp.com/journalmim/article/view/7-1-1
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