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APPROX
2009
Springer
2009
Springer
Optimal Sherali-Adams Gaps from Pairwise Independence
Abstract. This work considers the problem of approximating fixed predicate constraint satisfaction problems (MAX k-CSP(P)). We show that if the set of assignments accepted by P contains the support of a balanced pairwise independent distribution over the domain of the inputs, then such a problem on n variables cannot be approximated better than the trivial (random) approximation, even using Ω(n) levels of the SheraliAdams LP hierarchy. It was recently shown [3] that under the Unique Game Conjecture, CSPs with predicates with this condition cannot be approximated better than the trivial approximation. Our results can be viewed as an unconditional analogue of this result in the restricted computational model defined by the Sherali-Adams hierarchy. We also introduce a new generalization of techniques to define consistent “local distributions” over partial assignments to variables in the problem, which is often the crux of proving lower bounds for such hierarchies.
Real-time TrafficAlgorithms | APPROX 2009 | Pairwise Independent Distribution | Predicate Constraint Satisfaction | Unique Game Conjecture |
Related Content
| Added | 25 May 2010 |
| Updated | 25 May 2010 |
| Type | Conference |
| Year | 2009 |
| Where | APPROX |
| Authors | Konstantinos Georgiou, Avner Magen, Madhur Tulsiani |
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