Title :
Data structures and algorithms for topological analysis
Author :
Cane, Jean-Marc ; Tzoumas, George M. ; Michelucci, Dominique ; Hidalgo, Miguel ; Foufou, Sebti
Author_Institution :
Le2i, Univ. of Burgundy, Dijon, France
Abstract :
One of the steps of geometric modeling is to know the topology and/or the geometry of the objects considered. This paper presents different data structures and algorithms used in this study. We are particularly interested by algebraic structures, eg homotopy and homology groups, the Betti numbers, the Euler characteristic, or the Morse-Smale complex. We have to be able to compute these data structures, and for (homotopy and homology) groups, we also want to compute their generators. We are also interested in algorithms CIA and HIA presented in the thesis of Nicolas DELANOUE, which respectively compute the connected components and the homotopy type of a set defined by a CSG (constructive solid geometry) tree. We would like to generalize these algorithms to sets defined by projection.
Keywords :
data structures; topology; Betti numbers; CSG tree; Euler characteristic; Morse-Smale complex; Nicolas DELANOUE; algebraic structures; constructive solid geometry tree; data structures; geometric modeling; homology groups; homotopy type; topological analysis; Data structures; Educational institutions; Electronic mail; Generators; Indexes; Manifolds; Topology; Betti numbers; CIA and HIA algorithms; Euler characteristic; Homology; Homotopy; Morse-Smale complex; Topology;
Conference_Titel :
Science and Information Conference (SAI), 2014
Conference_Location :
London
Print_ISBN :
978-0-9893-1933-1
DOI :
10.1109/SAI.2014.6918204
