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Diameters in Typical Convex Bodies

Published online by Cambridge University Press:  20 November 2018

Imre Bárány
Affiliation:
Academy of Sciences, Budapest, Hungary
Tudor Zamfirescu
Affiliation:
University of Dortmund, Dortmund, Germany
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The most usual diameters in the world are those of a sphere and they all contain its centre. More generally, a chord of a convex body in Rd is called a diameter if there are two parallel supporting hyperplanes at the two endpoints of the chord.

It is easily seen that there are points on at least two diameters. From a result of Kosiński [6] proved in a more general setting it follows that every convex body has a point lying on at least three diameters. Does a typical convex body behave like a sphere and contain a point on infinitely or even uncountably many diameters?

But what is a typical convex body? The space 𝒦 of all convex bodies (d-dimensional compact convex sets) in Rd, equipped with the Hausdorff metric, is a Baire space.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1990

References

1. Besicovitch, A.S. and Zamfirescu, T., On pencils of diameters in convex bodies, Rev. Roum. Math. Pures Appl. 11 (1966), 637639.Google Scholar
2. Hammer, P.C., Problem 14 in colloquium on Convexity, Copenhagen (1965).Google Scholar
3. Hammer, P.C. and Sobczyk, A., Planar line families II, Proc. Amer. Math. Soc. 4 (1953), 341349.Google Scholar
4. Heil, E., Concurrent normals and critical points under weak smoothness assumptions, Ann. New York Acad. Sci. 440 (1985), 170178.Google Scholar
5. Klee, V., Some new results on smoothness and rotundity in normed linear spaces, Math. Ann. 139 (1959), 5163.Google Scholar
6. Kosiński, A., On a problem of Steinhaus, Fund. Math. 46 (1958), 4759.Google Scholar
7. Zamfirescu, T., Most convex mirrors are magic, Topology 21 (1982), 6569.Google Scholar
8. Zamfirescu, T., Points on infinitely many normals to convex surfaces, J. Reine Angew. Math. 350 (1984), 183187.Google Scholar
9. Zamfirescu, T., Intersecting diameters in convex bodies, Ann. Discrete Math. 20 (1984), 311316.Google Scholar
10. Zamfirescu, T., Using Baire categories in geometry, Rend. Sem. Math. Univ. Politecn. Torino 43 (1985), 6788.Google Scholar