고차원 공간에서의 Poncelet-Steiner 정리
Poncelet-Steiner Theorem in Higher-Dimensional Euclidean Spaces
ABSTRACT
Georg Mohr and Lorenzo Mascheroni independently discovered that any geometric construction that can be performed by a compass and straightedge can be performed by a compass alone in 1672 and 1797 respectively. In 1822 Jean Victor Poncelet conjectured that whatever can be constructed by straightedge and compass together can be constructed by straightedge alone, provided that a single circle and its center are given, and Jakob Steiner gave a proof for it in 1833. These two theorems are called Mohr-Mascheroni theorem and Poncelet-Steiner theorem.
In 2001, Bong-Gyun Koh introduced the geometric construction in higher-dimensional Euclidean spaces and proved that Mohr-Mascheroni theorem still holds in the higher-dimensional spaces.
In this paper, we prove that Steiner's construction can be established in higher-dimensional Euclidean spaces and Poncelet-Steiner theorem also holds in the spaces.
CITE THIS PAPER AS:
- 이슬비, 고차원 공간에서의 Poncelet-Steiner 정리, 수학 나라의 앨리스 : aliceinmathland.com, 2015.
- I Seul Bee, Poncelet-Steiner Theorem in Higher-Dimensional Euclidean Spaces, Alice in Mathematical Land: aliceinmathland.com, 2015.
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