English

Guruswami-Sinop Rounding without Higher Level Lasserre

Data Structures and Algorithms 2014-06-30 v1

Abstract

Guruswami and Sinop give a O(1/δ)O(1/\delta) approximation guarantee for the non-uniform Sparsest Cut problem by solving O(r)O(r)-level Lasserre semidefinite constraints, provided that the generalized eigenvalues of the Laplacians of the cost and demand graphs satisfy a certain spectral condition, namely, λr+1Φ/(1δ)\lambda_{r+1} \geq \Phi^{*}/(1-\delta). Their key idea is a rounding technique that first maps a vector-valued solution to [0,1][0, 1] using appropriately scaled projections onto Lasserre vectors. In this paper, we show that similar projections and analysis can be obtained using only 22\ell_{2}^{2} triangle inequality constraints. This results in a O(r/δ2)O(r/\delta^{2}) approximation guarantee for the non-uniform Sparsest Cut problem by adding only 22\ell_{2}^{2} triangle inequality constraints to the usual semidefinite program, provided that the same spectral condition, λr+1Φ/(1δ)\lambda_{r+1} \geq \Phi^{*}/(1-\delta), holds.

Keywords

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}
}
R2 v1 2026-06-22T04:49:37.197Z