A fast algorithm for computing irreducible triangulations of closed surfaces in $E^d$
Geometric Topology
2023-12-19 v3 Computational Geometry
Data Structures and Algorithms
Abstract
We give a fast algorithm for computing an irreducible triangulation of an oriented, connected, boundaryless, and compact surface in from any given triangulation of . If the genus of is positive, then our algorithm takes time to obtain , where is the number of triangles of . Otherwise, is obtained in linear time in . While the latter upper bound is optimal, the former upper bound improves upon the currently best known upper bound by a factor. In both cases, the memory space required by our algorithm is in .
Cite
@article{arxiv.1409.6015,
title = {A fast algorithm for computing irreducible triangulations of closed surfaces in $E^d$},
author = {Suneeta Ramaswami and Marcelo Siqueira},
journal= {arXiv preprint arXiv:1409.6015},
year = {2023}
}
Comments
52 pages, a shorter version of this Technical Report is about to be submitted to Elsevier Journal Computational Geometry: Theory and Applications