Add to ORKGWe investigate the computational problems associated with combinatorial surfaces. Specifically, we present an algorithm (based on the Brahana-Dehn-Heegaard approach) for transforming the polygonal schema of a closed triangulated surface into its canonical form in O(n log n) time, where n is the total number of vertices, edges and faces. We also give an O(n log n + gn) algorithm for constructing canonical generators of the fundamental group of a surface of genus g. This is useful in constructing homeomorphisms between combinatorial surfaces
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
Combinatorial surfaces capture essential properties of continuous surfaces (like spheres and tori) i...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
Abst rac t We investigate the computational problems associated with combinatorial surfaces. Specifi...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
International audienceA closed orientable surface of genus g can be obtained by appropriate identi c...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
Combinatorial surfaces capture essential properties of continuous surfaces (like spheres and tori) i...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
We investigate the computational problems associated with combinatorial surfaces. Specifically, we p...
Abst rac t We investigate the computational problems associated with combinatorial surfaces. Specifi...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
International audienceA closed orientable surface of genus g can be obtained by appropriate identi c...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
A closed orientable surface of genus g can be obtained by appropriate identification of pairs of edg...
Dans cette thèse, nous nous intéressons aux propriétés topologiques des surfaces, i.e. celles qui so...
Combinatorial surfaces capture essential properties of continuous surfaces (like spheres and tori) i...