Randomly removing g handles at once
Computational Geometry
2010-03-09 v1
Abstract
Indyk and Sidiropoulos (2007) proved that any orientable graph of genus can be probabilistically embedded into a graph of genus with constant distortion. Viewing a graph of genus as embedded on the surface of a sphere with handles attached, Indyk and Sidiropoulos' method gives an embedding into a distribution over planar graphs with distortion , by iteratively removing the handles. By removing all handles at once, we present a probabilistic embedding with distortion for both orientable and non-orientable graphs. Our result is obtained by showing that the nimum-cut graph of Erickson and Har Peled (2004) has low dilation, and then randomly cutting this graph out of the surface using the Peeling Lemma of Lee and Sidiropoulos (2009).
Cite
@article{arxiv.1003.1426,
title = {Randomly removing g handles at once},
author = {Glencora Borradaile and James R. Lee and Anastasios Sidiropoulos},
journal= {arXiv preprint arXiv:1003.1426},
year = {2010}
}