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Examples and Constructions

In: Bodies of Constant Width

Author

Listed:
  • Horst Martini

    (Chemnitz University of Technology, Faculty of Mathematics)

  • Luis Montejano

    (Universidad Nacional Autónoma de México, Campus Juriquilla, Instituto de Matemáticas)

  • Déborah Oliveros

    (Universidad Nacional Autónoma de México, Campus Juriquilla, Instituto de Matemáticas)

Abstract

This chapter is dedicated to concrete examples of constant width sets and procedures on how to construct them. The most notorious convex body of constant width is undoubtedly the Reuleaux triangle of width h which is the intersection of three disks of radius h and whose boundary consists of three congruent circular arcs of radius h. In Section 8.1, we will see that the Reuleaux triangle can be generalized to plane convex figures of constant width h whose boundary consists of a finite number of circular arcs of radius h. They are called ReuleauxReuleaux polygons polygons. The plan for the rest of the chapter is the following: In Section 8.2, we will study the 3-dimensional analogue of the Reuleaux triangle, and in Section 8.3, we will construct Meissner’s mysterious bodies from it. In fact, in this section, we will use the concepts of ball polytope and Reuleaux polytopeReuleaux polytope to construct 3-dimensional bodies of constant width with the help of special embeddings of self-dual graphs. In Section 8.4, we will give a procedure of finitely many steps to construct 3-dimensional constant width bodies from Reuleaux polygons, and in Section 8.5, we will construct constant width bodies with analytic boundaries.

Suggested Citation

  • Horst Martini & Luis Montejano & Déborah Oliveros, 2019. "Examples and Constructions," Springer Books, in: Bodies of Constant Width, chapter 0, pages 167-195, Springer.
    • Handle: RePEc:spr:sprchp:978-3-030-03868-7_8
    DOI: 10.1007/978-3-030-03868-7_8
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