摘要
探讨了凸棱柱和凸棱锥分割空间的数量性质.基于"空间限界"等方法,研究并确立了三维环绕空间中任意凸棱柱和凸棱锥的空间块个数计算公式,进而简单探讨了依据Ludwig Schlfli理论将公式拓展到多维空间中的思路,提及了三棱锥空间限界改进图形在结构上的优越性.
This paper discusses the quantitative property of space-partitioning by convex prisms and pyramids, and determines the formula to count spatial blocks of any convex prism and convex pyramid 3D ambient space using "Space Limitation" method, and simply discusses the method of broadening the la into hyperspaces on the basis of Ludwig Schlafli theory, and mentions the structural superiority of the derived from the space limitation figure of the triangular pyramid.
出处
《鞍山师范学院学报》
2011年第4期15-19,共5页
Journal of Anshan Normal University
关键词
棱柱
棱锥
空间分割
空间限界
LudwigSchlfli
Prism
Pyramid
Space partitioning
Space limitation
Ludwig Schlafli convex in the forlnu - object