Effective homological computations on finite topological spaces

Effective homological computations on finite topological spaces

The study of topological invariants of finite topological spaces is relevant because they can be used as models of a wide class of topological spaces, including regular CW-complexes. In this work, we present a new module for the Kenzo system that allows the computation of homology groups with genera...

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Veröffentlicht in:Applicable algebra in engineering, communication and computing communication and computing, 2023-01, Vol.34 (1), p.33-56
Hauptverfasser: Cuevas-Rozo, Julián, Lambán, Laureano, Romero, Ana, Sarria, Humberto
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Artificial Intelligence
Combinatorial analysis
Computer Hardware
Computer Science
Fields (mathematics)
Homology
Original Paper
Symbolic and Algebraic Manipulation
Theory of Computation
Topology
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Zusammenfassung:The study of topological invariants of finite topological spaces is relevant because they can be used as models of a wide class of topological spaces, including regular CW-complexes. In this work, we present a new module for the Kenzo system that allows the computation of homology groups with generators of finite topological spaces in different situations. Our algorithms combine new constructive versions of well-known results about topological spaces with combinatorial methods used on finite spaces. In the particular case of h-regular spaces, effective and reasonably efficient methods are implemented and the technique of discrete vector fields is applied in order to improve the previous algorithms.
ISSN:0938-1279
1432-0622
DOI:10.1007/s00200-020-00462-8