A new separation theorem with geometric applications
Abstract
Let be an undirected graph with a measure function assigning non-negative values to subgraphs so that does not exceed the clique cover number of . When satisfies some additional natural conditions, we study the problem of separating into two subgraphs, each with a measure of at most by removing a set of vertices that can be covered with a small number of cliques . When , where is a graph with , and is a chordal graph with , we prove that there is a separator that can be covered with cliques in , where is a parameter similar to the bandwidth, which arises from the linear orderings of cliques covers in . The results and the methods are then used to obtain exact and approximate algorithms which significantly improve some of the past results for several well known NP-hard geometric problems. In addition, the methods involve introducing new concepts and hence may be of an independent interest.
Keywords
Cite
@article{arxiv.1504.04938,
title = {A new separation theorem with geometric applications},
author = {Farhad Shahrokhi},
journal= {arXiv preprint arXiv:1504.04938},
year = {2015}
}
Comments
Proceedings of EuroCG 2010, Dortmund, Germany, March 22-24, 2010