Towards a better approximation for sparsest cut?
Abstract
We give a new -approximation for sparsest cut problem on graphs where small sets expand significantly more than the sparsest cut (sets of size expand by a factor bigger, for some small ; this condition holds for many natural graph families). We give two different algorithms. One involves Guruswami-Sinop rounding on the level- Lasserre relaxation. The other is combinatorial and involves a new notion called {\em Small Set Expander Flows} (inspired by the {\em expander flows} of ARV) which we show exists in the input graph. Both algorithms run in time . We also show similar approximation algorithms in graphs with genus with an analogous local expansion condition. This is the first algorithm we know of that achieves -approximation on such general family of graphs.
Cite
@article{arxiv.1304.3365,
title = {Towards a better approximation for sparsest cut?},
author = {Sanjeev Arora and Rong Ge and Ali Kemal Sinop},
journal= {arXiv preprint arXiv:1304.3365},
year = {2013}
}