Abstract
The construction of curves of constant width using circular arcs is well known; the procedure may be found, for example, in [1]. This article describes a different method for constructing a family of ‘smooth’ curves of constant width. Basic properties of such curves may be found in [1].
Let C be a regular, smooth, and convex curve in the euclidean plane. Regularity implies that each point of C lies on only one support line and each support line contains only one point of C, smoothness implies the existence of derivatives at each point of C, and convexity implies the curve is a simple closed curve whose interior points form a convex set. Select a point O on C as origin, use the support line to C at O as the x-axis, and give the curve a counter-clockwise orientation (see Fig. 1).
Publisher
Cambridge University Press (CUP)
Cited by
6 articles.
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1. On the Geometry of Spherical Trochoids;KoG;2023
2. An extension of Rabinowitz’s polynomial representation for convex curves;Beiträge zur Algebra und Geometrie / Contributions to Algebra and Geometry;2020-03-06
3. Mellish theorem for generalized constant width curves;Aequationes mathematicae;2014-11-27
4. Fourier Series and Spherical Harmonics in Convexity;Handbook of Convex Geometry;1993
5. On equichordal curves;Proceedings of the Royal Society of Edinburgh: Section A Mathematics;1991