Generalized $\beta$-skeletons
Computational Geometry
2014-11-21 v1
Abstract
-skeletons, a prominent member of the neighborhood graph family, have interesting geometric properties and various applications ranging from geographic networks to archeology. This paper focuses on developing a new, more general than the present one, definition of -skeletons based only on the distance criterion. It allows us to consider them in many different cases, e.g. for weighted graphs or objects other than points. Two types of -skeletons are especially well-known: the Gabriel Graph (for ) and the Relative Neighborhood Graph (for ). The new definition retains relations between those graphs and the other well-known ones (minimum spanning tree and Delaunay triangulation). We also show several new algorithms finding -skeletons.
Keywords
Cite
@article{arxiv.1411.5455,
title = {Generalized $\beta$-skeletons},
author = {Mirosław Kowaluk and Gabriela Majewska},
journal= {arXiv preprint arXiv:1411.5455},
year = {2014}
}