A ( n)(1) integrality gap for the Sparsest Cut SDP
Abstract
We show that the Goemans-Linial semidefinite relaxation of the Sparsest Cut problem with general demands has integrality gap ( n)(1). This is achieved by exhibiting n-point metric spaces of negative type whose L1 distortion is ( n)(1). Our result is based on quantitative bounds on the rate of degeneration of Lipschitz maps from the Heisenberg group to L1 when restricted to cosets of the center.
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