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A compact set of disjoint line segments in E3 whose end set has positive measure

Published online by Cambridge University Press:  26 February 2010

D. G. Larman
Affiliation:
University College London, Gower Street, London, W.C.1.
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Extract

If L is a set of disjoint closed line segments in En, let E(L) denote the end set of L, i.e. the set of end points of members of L.

In [1, 2] V. L. Klee and M. Martin proved the following lemma:

IfLis a disjoint set of closed line segments in E2 such that E(L) is compact, then E(L) has zero 2-measure.

Type
Research Article
Copyright
Copyright © University College London 1971

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References

1.Klee, V. L. and Martin, M., “Semi-continuity of the face function of a convex set”, Commentarii Math. Helv.Google Scholar
2.Klee, V. L. and Martin, M., “Must a compact end set have measure zero?Amer. Math. Monthly 11 (1970), 616–18.CrossRefGoogle Scholar
3.Larman, D. G., “On a conjecture of Klee and Martin for convex bodies”, Proc. London Math. sec., to appear.Google Scholar
4.Bruckner, A. M. and Ceder, J. G., “A note on End-setsAmer. Math. Monthly, 78 (1971), 516–18.CrossRefGoogle Scholar
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