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Independence in Combinatorial Geometries of Rank Three

Published online by Cambridge University Press:  20 November 2018

Japheth Hall Jr.*
Affiliation:
Stillman CollegeP.O. Box 1430, Tuscaloosa Alabama, 34501, U.S.A.
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The class of all combinatorial geometries of rank three shall coincide with the class of all pairs (V, S) such that V is a set and S is a collection of non-empty subsets of V such that each pair of distinct elements of V belong to exactly one member of S. (See [3].)

Consider a combinatorial geometry (V, S) of rank three.

Type
Research Article
Copyright
Copyright © Canadian Mathematical Society 1975

References

1. Bleicher, M. N. and Marczewski, E., Remarks on dependence relations and closure operators, Colloquium Mathematicum IX (1962), 209-211.Google Scholar
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3. Crapo-Rota, Combinatorial Geometries, MIT Press, 1970.Google Scholar
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6. Hall, J. Jr., On the Theory of Structures in Sets, Dissertation Abstracts International XXXI (10), 1971.Google Scholar