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A fast algorithm for computing irreducible triangulations of closed surfaces in $E^d$

Published 21 Sep 2014 in math.GT, cs.CG, and cs.DS | (1409.6015v3)

Abstract: We give a fast algorithm for computing an irreducible triangulation $T\prime$ of an oriented, connected, boundaryless, and compact surface $S$ in $Ed$ from any given triangulation $T$ of $S$. If the genus $g$ of $S$ is positive, then our algorithm takes $O(g2+gn)$ time to obtain $T\prime$, where $n$ is the number of triangles of $T$. Otherwise, $T\prime$ is obtained in linear time in $n$. While the latter upper bound is optimal, the former upper bound improves upon the currently best known upper bound by a $(\lg n / g)$ factor. In both cases, the memory space required by our algorithm is in ${\Theta}(n)$.

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