Your search keyword '"Homology computation"' showing total 2 results

1. Generating Second Order (Co)homological Information within AT-Model Context

Author

Pedro Real, Fernando Díaz del Río, Helena Molina-Abril, Darian M. Onchis, Universidad de Sevilla. Departamento de Matemática Aplicada I (ETSII), and Universidad de Sevilla. Departamento de Arquitectura y Tecnología de Computadores

Subjects

Pure mathematics, Algebraic-topological model, Boundary (topology), Field (mathematics), Context (language use), Cell complex, 010103 numerical & computational mathematics, 02 engineering and technology, Primal and dual AT-segmentation, Homology (mathematics), 01 natural sciences, AT-model region-incidence-graph, symbols.namesake, nD digital object, Euler characteristic, 0202 electrical engineering, electronic engineering, information engineering, symbols, Homology computation, Computer Science::Programming Languages, Graph (abstract data type), 020201 artificial intelligence & image processing, 0101 mathematics, Algebraic number, Representation (mathematics), Mathematics

Abstract

In this paper we design a new family of relations between (co)homology classes, working with coefficients in a field and starting from an AT-model (Algebraic Topological Model) AT(C) of a finite cell complex C These relations are induced by elementary relations of type “to be in the (co)boundary of” between cells. This high-order connectivity information is embedded into a graph-based representation model, called Second Order AT-Region-Incidence Graph (or AT-RIG) of C. This graph, having as nodes the different homology classes of C, is in turn, computed from two generalized abstract cell complexes, called primal and dual AT-segmentations of C. The respective cells of these two complexes are connected regions (set of cells) of the original cell complex C, which are specified by the integral operator of AT(C). In this work in progress, we successfully use this model (a) in experiments for discriminating topologically different 3D digital objects, having the same Euler characteristic and (b) in designing a parallel algorithm for computing potentially significant (co)homological information of 3D digital objects. Ministerio de Economía y Competitividad MTM2016-81030-P Ministerio de Economía y Competitividad TEC2012-37868-C04-02

Published

2019

2. Homology of Cellular Structures Allowing Multi-incidence

Author

Sylvie Alayrangues, Guillaume Damiand, Samuel Peltier, Pascal Lienhardt, Synthèse et analyse d'images (XLIM-ASALI), XLIM (XLIM), Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS)-Université de Limoges (UNILIM)-Centre National de la Recherche Scientifique (CNRS), Geometry Processing and Constrained Optimization (M2DisCo), Laboratoire d'InfoRmatique en Image et Systèmes d'information (LIRIS), Institut National des Sciences Appliquées de Lyon (INSA Lyon), Université de Lyon-Institut National des Sciences Appliquées (INSA)-Université de Lyon-Institut National des Sciences Appliquées (INSA)-Centre National de la Recherche Scientifique (CNRS)-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-École Centrale de Lyon (ECL), Université de Lyon-Université Lumière - Lyon 2 (UL2)-Institut National des Sciences Appliquées de Lyon (INSA Lyon), and Université de Lyon-Université Lumière - Lyon 2 (UL2)

Subjects

Cellular homology, 0102 computer and information sciences, 02 engineering and technology, [INFO.INFO-CG]Computer Science [cs]/Computational Geometry [cs.CG], 01 natural sciences, Mathematics::Algebraic Topology, Theoretical Computer Science, CW complex, Combinatorics, Simplicial complex, Morse homology, Mathematics::K-Theory and Homology, TheoryofComputation_ANALYSISOFALGORITHMSANDPROBLEMCOMPLEXITY, ComputingMethodologies_SYMBOLICANDALGEBRAICMANIPULATION, 0202 electrical engineering, electronic engineering, information engineering, Discrete Mathematics and Combinatorics, Mathematics, Simplicial approximation theorem, Discrete mathematics, 020207 software engineering, Simplicial homology, combinatorial maps, Computational Theory and Mathematics, 010201 computation theory & mathematics, Geometry and Topology, homology computation, Singular homology, Relative homology, MathematicsofComputing_DISCRETEMATHEMATICS, boundary operator

Abstract

International audience; This paper focuses on homology computation over ‘cellular’ structures that allow multi-incidence between cells. We deal here with combinatorial maps, more precisely chains of maps and subclasses such as maps and generalized maps. Homology computation on such structures is usually achieved by computing simplicial homology on a simplicial analog. But such an approach is computationally expensive because it requires computing this simplicial analog and performing the homology computation on a structure containing many more cells (simplices) than the initial one. Our work aims at providing a way to compute homologies directly on a cellular structure. This is done through the computation of incidence numbers. Roughly speaking, if two cells are incident, then their incidence number characterizes how they are attached. Having these numbers naturally leads to the definition of a boundary operator, which induces a homology. Hence, we propose a boundary operator for chains of maps and provide optimization for maps and generalized maps. It is proved that, under specific conditions, the homology of a combinatorial map as defined in the paper is equivalent to the homology of its simplicial analogue.

Published

2015