Some combinational problems in geometry

  • P. Erdös
I. Geomety
Part of the Lecture Notes in Mathematics book series (LNM, volume 792)

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References

  1. P. Erdös, R.L. Graham, Montgomery, B. Rothschild, J. Spencer and E. Straus, "Euclidean Ramsey Theorems I, II, III," J. Com. Theory A 14 (1973), p. 341–363, Proc. Conf. Finite and Infinite Sets, June 1973, Keszthely, Hungary, p. 529–557, and p.558–584.CrossRefMATHGoogle Scholar
  2. L.E. Shader, "All Right Triangles are Ramsey in E 2, Proc. 7th Southeastern Conf. Combinatorics (1974), p.476–480.Google Scholar
  3. D.G. Lavman, and C.A. Rogers, "The Realization of Distances within Sets in Euclidean Space," Mathematika 19 (1972), p. 1–24.MathSciNetCrossRefGoogle Scholar
  4. D.G. Lavman, "A Note on the Realization of Distances within Sets in Euclidean Space," Comment. Math. Helvetici, 53 (1978), p. 529–539.MathSciNetCrossRefGoogle Scholar
  5. N.G. de Bruijn and P. Erdös, "A Colour Problem for Infinite Graphs and a Problem in the Theory of Relations," Indag. Math. 13 (1951), p. 371–373, and Nederl. Akad. Wetensch Proc. 57 (1948), p. 1277–79.MathSciNetCrossRefMATHGoogle Scholar
  6. D.R. Woodall, "Distances realized by Sets Covering the Plane," Journal Comb. Theory (A) 14 (1973), p. 187–200.MathSciNetCrossRefMATHGoogle Scholar
  7. L.M. Kelly and W. Moser, "On the Number of Ordinary Lines Determined by n Points," Canad. J. Math. 10 (1958), p. 210–219.MathSciNetCrossRefMATHGoogle Scholar
  8. P. Bateman and P. Erdös, "Geometrical Extrema Suggested by a Lemma of Besicovitch," Amer. Math. Monthly, 58 (1951), p. 306–314.MathSciNetCrossRefMATHGoogle Scholar

Copyright information

© Springer-Verlag 1980

Authors and Affiliations

  • P. Erdös
    • 1
  1. 1.Mathematical Institute Hungarian Academy of SciencesHungary

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