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A Class of Configurations and the Commutativity of Multiplication

Published online by Cambridge University Press:  03 November 2016

M. W. Al-Dhahir
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Extract

A configuration is a finite collection of points, lines and planes with a number of each on each; any one of the three kinds may be empty.

Type
Research Article
Information
The Mathematical Gazette , Volume 40 , Issue 334 , December 1956 , pp. 241 - 245
Copyright
Copyright © Mathematical Association 1956

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References

1. Baker, H. F., Principles of Geometry, Vol. I, Cambridge (1925).Google Scholar
2. Coxeter, H. S. M., “Self-Dual Configurations and Regular Graphs”, Bull. Amer. Math. Soc., Vol. 56 (1950), pp. 413-455.CrossRefGoogle Scholar
3. Möbius, A. F., Kann Von Zwei dreiseitigen pyramiden eine jede in Bezug auf die andere um-und eingeschrieben zugleich heissen? Crelle 3 (1828).Google Scholar
4. Reidemeister, K., “Zur Axiomatik der 3-dimensionalen projektive Geometrie”, Jhbr. Deutsch. Math. Verein, 38 (1929), p. 71.Google Scholar
5. Schönhardt, , Jhbr. Deutsch. Math. Verein, 40 (1931), pp. 48-50.Google Scholar
6. Veblen, O. and Young, J W., Projective Geometry, Boston, New York, Vol. I (1910).Google Scholar