Guruswami-Sinop Rounding without Higher Level Lasserre
Abstract
Guruswami and Sinop give a approximation guarantee for the non-uniform Sparsest Cut problem by solving -level Lasserre semidefinite constraints, provided that the generalized eigenvalues of the Laplacians of the cost and demand graphs satisfy a certain spectral condition, namely, . Their key idea is a rounding technique that first maps a vector-valued solution to using appropriately scaled projections onto Lasserre vectors. In this paper, we show that similar projections and analysis can be obtained using only triangle inequality constraints. This results in a approximation guarantee for the non-uniform Sparsest Cut problem by adding only triangle inequality constraints to the usual semidefinite program, provided that the same spectral condition, , holds.
Cite
@article{arxiv.1406.7279,
title = {Guruswami-Sinop Rounding without Higher Level Lasserre},
author = {Amit Deshpande and Rakesh Venkat},
journal= {arXiv preprint arXiv:1406.7279},
year = {2014}
}