A data structure for non-manifold simplicial d-complexes
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Date
2004Author
Floriani, Leila De
Greenfieldboyce, David
Hui, Annie
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We propose a data structure for d-dimensional simplicial complexes, that we call the Simplified Incidence Graph (SIG). The simplified incidence graph encodes all simplices of a simplicial complex together with a set of boundary and partial co-boundary topological relations. It is a dimension-independent data structure in the sense that it can represent objects of arbitrary dimensions. It scales well to the manifold case, i.e. it exhibits a small overhead when applied to simplicial complexes with a manifold domain. Here, we present efficient navigation algorithms for retrieving all topological relations from a SIG, and an algorithm for generating a SIG from a representation of the complex as an incidence graph. Finally, we compare the simplified incidence graph with the incidence graph, with a widely-used data structure for d-dimensional pseudo-manifold simplicial complexes, and with two data structures specific for two- and three-dimensional simplicial complexes.
BibTeX
@inproceedings {10.2312:SGP:SGP04:085-094,
booktitle = {Symposium on Geometry Processing},
editor = {Roberto Scopigno and Denis Zorin},
title = {{A data structure for non-manifold simplicial d-complexes}},
author = {Floriani, Leila De and Greenfieldboyce, David and Hui, Annie},
year = {2004},
publisher = {The Eurographics Association},
ISSN = {1727-8384},
ISBN = {3-905673-13-4},
DOI = {10.2312/SGP/SGP04/085-094}
}
booktitle = {Symposium on Geometry Processing},
editor = {Roberto Scopigno and Denis Zorin},
title = {{A data structure for non-manifold simplicial d-complexes}},
author = {Floriani, Leila De and Greenfieldboyce, David and Hui, Annie},
year = {2004},
publisher = {The Eurographics Association},
ISSN = {1727-8384},
ISBN = {3-905673-13-4},
DOI = {10.2312/SGP/SGP04/085-094}
}