非循环匹配简化同调的高效计算

Ulderico Fugacci, F. Iuricich, L. Floriani
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引用次数: 8

摘要

研究任意维简单复形的有效计算Z系数的同调和同调发生器问题。在结合约简、co约简和离散莫尔斯理论的基础上,对不同方法的等价性进行了分析、比较和讨论。我们表明,这些方法的组合产生了理论上合理的方法,它们是相互等效的。其中一种方法通过使用表示复数的紧凑数据结构和离散莫尔斯梯度的紧凑编码来实现简单复数。我们提出了实验结果并讨论了进一步的发展。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Efficient Computation of Simplicial Homology through Acyclic Matching
We consider the problem of efficiently computing homology with Z coefficients as well as homology generators for simplicial complexes of arbitrary dimension. We analyze, compare and discuss the equivalence of different methods based on combining reductions, co reductions and discrete Morse theory. We show that the combination of these methods produces theoretically sound approaches which are mutually equivalent. One of these methods has been implemented for simplicial complexes by using a compact data structure for representing the complex and a compact encoding of the discrete Morse gradient. We present experimental results and discuss further developments.
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