Sectorial Covers for Curves of Constant Length

John E. Wetzel

doi:10.4153/CMB-1973-058-8

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In answer to a question raised by Leo Moser, A. Meir proved some years ago that every plane arc of unit length lies in some closed semidisk of radius ½. His elegant, unpublished argument is reproduced here with his kind permission.

References

1. Blaschke, W., Über den grössten Kreis in einer konvexen Punktmenge, Jber. Deutsch. Math.-Verein. 23 (1914), 369–374.Google Scholar

2. Croft, H. T., Research problems, (Mimeographed), Cambridge, England, 1967.Google Scholar

3. Croft, H. T., Addenda, (Mimeographed), Cambridge, England, 1969.Google Scholar

4. Jones, J. P. and Schaer, J., The worm problem, Univ. of Calgary Research Paper No. 100, Calgary, Alberta, Canada, 1970.Google Scholar

5. Mitrinović, D. S., Elementary inequalities, Noordhoff, Groningen, 1964.Google Scholar

6. Moser, Leo, Poorly formulated unsolved problems of combinatorial geometry. (Mimeographed.)Google Scholar

7. Pál, Julius, Ein Minimumproblem für Ovale, Math. Ann. 83 (1921), 311–319.Google Scholar

8. Schaer, Jonathan, The broadest curve of length 1, Univ. of Calgary Mathematical Research Paper No. 52, Calgary, Alberta, Canada, 1968.Google Scholar

9. Wetzel, John E., Triangular covers for closed curves of constant length, Elem. Math. 24 (1970), 78–82.Google Scholar

10. Yaglom, I. M. and Boltyanskiá, V. G., Convex figures, Holt, New York, 1961.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Poole, George and Gerriets, John 1973. Minimum covers for arcs of constant length. Bulletin of the American Mathematical Society, Vol. 79, Issue. 2, p. 462.

Bezdek, K. and Connelly, R. 1989. Covering Curves by Translates of a Convex Set. The American Mathematical Monthly, Vol. 96, Issue. 9, p. 789.

Makeev, V. V. 1990. Extremal covers. Mathematical Notes of the Academy of Sciences of the USSR, Vol. 47, Issue. 6, p. 570.

Moser, William O.J. 1991. Problems, problems, problems. Discrete Applied Mathematics, Vol. 31, Issue. 2, p. 201.

Norwood, Rick Poole, George and Laidacker, Michael 1992. The Worm Problem of Leo Moser. Discrete & Computational Geometry, Vol. 7, Issue. 2, p. 153.

Elekes, Gy. 1994. Generalized breadths, circular Cantor sets, and the least area UCC. Discrete & Computational Geometry, Vol. 12, Issue. 4, p. 439.

Wetzel, John E. 2003. Fits and Covers. Mathematics Magazine, Vol. 76, Issue. 5, p. 349.

Finch, Steven R. and Wetzel, John E. 2004. Lost in a Forest. The American Mathematical Monthly, Vol. 111, Issue. 8, p. 645.

KHANDHAWIT, TIRASAN PAGONAKIS, DIMITRIOS and SRISWASDI, SIRA 2013. LOWER BOUND FOR CONVEX HULL AREA AND UNIVERSAL COVER PROBLEMS. International Journal of Computational Geometry & Applications, Vol. 23, Issue. 03, p. 197.

Ahn, Hee-Kap Bae, Sang Won Cheong, Otfried Gudmundsson, Joachim Tokuyama, Takeshi and Vigneron, Antoine 2014. A Generalization of the Convex Kakeya Problem. Algorithmica, Vol. 70, Issue. 2, p. 152.

Chen, Ke and Dumitrescu, Adrian 2015. Nonconvex cases for carpenter's rulers. Theoretical Computer Science, Vol. 586, Issue. , p. 12.

Wetzel, John E. and Wichiramala, Wacharin 2019. Sectorial Covers for Unit Arcs. Mathematics Magazine, Vol. 92, Issue. 1, p. 42.

Movshovich, Yevgenya 2021. z-arcs in the thirty degrees sector. Journal of Applied Analysis, Vol. 27, Issue. 2, p. 299.

Panraksa, Chatchawan and Wichiramala, Wacharin 2021. Wetzel’s sector covers unit arcs. Periodica Mathematica Hungarica, Vol. 82, Issue. 2, p. 213.

Rudolf, Daniel and Krupp, Stefan 2022. A regularity result for shortest generalized billiard trajectories in convex bodies in $$\mathbb {R}^n$$. Geometriae Dedicata, Vol. 216, Issue. 5,

Rudolf, Daniel 2023. Viterbo’s conjecture as a worm problem. Monatshefte für Mathematik, Vol. 201, Issue. 1, p. 217.

Jung, Mook Kwon Yoon, Sang Duk Ahn, Hee-Kap and Tokuyama, Takeshi 2023. Universal convex covering problems under translations and discrete rotations. Advances in Geometry, Vol. 23, Issue. 4, p. 481.

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