Re: [EMHL] Kantor Point / Line
- Paul A. Blaga wrote:
>Regarding the Kantor line and Kantor point, I can tell you the
Thanks, dear Paul, for your response.
Following is another reference:
Weiss, Gunter - Nestler, Karla: Extensions and Analoga of Theorems of Steiner,
In: Artemiadis, N. K. (ed.) et al.: Proceedings of the 4th International
Congress of Geometry, Thessaloniki, Greece, May 26--June 1, 1996.
Athens: Aristotle University of Thessaloniki. 431-435 (1997).
ISBN 960-7425-11-1 (hbk)
The authors' Summary:
<q>Recent mathematical developments are followed by an increasing interest
in elementary geometric theorems. Such theorems may serve as axioms within
geometric structures. This paper mainly deals with quadrilaterals in the
euclidean, affine and projective plane and discusses relationships between
theorems of Gauss, Steiner, Bodenmiller, Miquel, Morley a.o.. Some analoga
to those theorems are added.</q>