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Connectivity and freely rolling convex bodies

Part of: General convexity

Published online by Cambridge University Press:  26 February 2010

P. R. Goodey
P. R. Goodey
Affiliation:
Mathematics Department, Royal Holloway College, Englefield Green, Surrey.
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Abstract

If C and Co are two convex bodies in Ed we say that C slides (rolls) freely inside Co if the following condition is satisfied: for each x ∈ ∂C0 (and each rotation R) there is a translation t such that, if gC = C + t (= RC + t), then gCCo and x ∈ ∂gC. This work establishes certain topological conditions which ensure the free rolling and sliding of C inside Co. One consequence of these conditions is that, if ∂K ∩ int gK is a topological ball for all rigid motions g, then K is a ball in the geometrical sense.

MSC classification

Secondary: 52A20: Convex sets in $n$ dimensions (including convex hypersurfaces)
Type
Research Article
Information
Mathematika , Volume 29 , Issue 2 , December 1982 , pp. 249 - 259
Copyright
Copyright © University College London 1982

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References

1.Bonnesen, T. and Fenchel, W.. Theorie der konvexen Körper (New York, 1948).Google Scholar
2.Firey, W. J.. Inner contact measures. Mathematika, 26 (1979), 106112.CrossRefGoogle Scholar
3.Goodey, P. R. and Woodcock, M. M.. Intersections of convex bodies with their translates. The Geometric Vein. Eds. Davis, C., Grunbaum, B. and Sherk, F. A. (New York, 1982).Google Scholar
4.Greenberg, M. J.. Lectures on algebraic topology (New York-Amsterdam, 1967).Google Scholar
5.Grünbaum, B.. Convex Polytopes (London, 1967).Google Scholar
6.Miles, R. E.. On the elimination of edge effects in planar sampling. Stochastic Geometry. Eds. Harding, E. F. and Kendall, D. G. (London, 1974).Google Scholar
7.Santaló, L. A.. Integral geometry and geometric probability (Reading Mass., 1976).Google Scholar
8.Spanier, E. H.. Algebraic topology (New York, 1966).Google Scholar