由Combescure变换关联的空间曲线

IF 0.4 Q4 MATHEMATICS
Ç. Camcı, A. Uçum, K. Ilarslan
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引用次数: 1

摘要

摘要本文讨论了与Combescure变换相关的曲线。借助于这些曲线有一个共同的Frenet框架这一事实,定义了一个等价关系。对一些特殊曲线检验了由这种等价关系得到的等价类,得到螺旋曲线等价类中的所有曲线也是螺旋曲线。对于k倾斜螺旋曲线也是如此。本文的重要部分包括在Combescure变换的帮助下从给定的曲线α获得曲线的有用构造方法。利用这种方法,可以从任何与Combescure变换相关的曲线中获得一些特殊的曲线,如Bertrand、Mannheim、Salkowski、anti-Salkowski或球面曲线。例如,我们获得了从反Salkowski曲线明确获得的曼海姆曲线的例子。在文献中除了圆螺旋外,很难找到曼海姆曲线的例子。一般来说,得到了由给定曲线α借助于Combescure变换得到的曲线β的Bertrand-anti-Salkowski或球面曲线的条件。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Space Curves Related by a Transformation of Combescure
Abstract In this paper, the curves associated with the Combescure transform are discussed. With the help of the fact that these curves have a common Frenet frame, an equivalence relation is defined. The equivalence classes obtained by this equivalence relation have been examined for some special curves and it has been obtained that all curves in the equivalence class of a helix curve are also helix curves. This is also true for k-slant helix curves. The important part of this paper consists of the useful construction method to obtain a curve from the given curve α with the help of Combescure transformation. With this method, some special curves such as Bertrand, Mannheim, Salkowski, anti-Salkowski or spherical curve can be obtained from any curve related by a Combescure transform. For example, we obtain an example of Mannheim curves explicitly obtained from an anti-Salkowski curve. It is not easy to find an example of Mannheim curves except circular helix in the literature. In general, the condition for being Bertrand anti-Salkowski or spherical curve of the curve β obtained from the given curve α with the help of Combescure transformation were obtained.
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