Connectivity calculus of fractal polyhedrons
作者:
Highlights:
• This paper analyzes the connectivity information of fractal polyhedra.
• This paper recalls homology strong-deformation retracts as an appropriate tool for doing so.
• This paper illustrates the relevance of this tool for Menger sponge and Sierpinski pyramids.
• This paper provides examples and detailed proofs.
摘要
Highlights•This paper analyzes the connectivity information of fractal polyhedra.•This paper recalls homology strong-deformation retracts as an appropriate tool for doing so.•This paper illustrates the relevance of this tool for Menger sponge and Sierpinski pyramids.•This paper provides examples and detailed proofs.
论文关键词:Connectivity,Cycles,Topological analysis,Tunnels,Directed graphs,Betti number,Fractal set,Menger sponge,Sierpiński pyramid
论文评审过程:Received 27 December 2013, Revised 6 April 2014, Accepted 27 May 2014, Available online 6 June 2014.
论文官网地址:https://doi.org/10.1016/j.patcog.2014.05.016
