Optimal Sherali-Adams Gaps from Pairwise Independence

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 ***(n ) levels of the Sherali-Adams 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.

[1]  Jonas Holmerin,et al.  More efficient queries in PCPs for NP and improved approximation hardness of maximum CSP , 2008, Random Struct. Algorithms.

[2]  Hanif D. Sherali,et al.  A Hierarchy of Relaxations Between the Continuous and Convex Hull Representations for Zero-One Programming Problems , 1990, SIAM J. Discret. Math..

[3]  Claire Mathieu,et al.  Sherali-adams relaxations of the matching polytope , 2009, STOC '09.

[4]  Luca Trevisan,et al.  A PCP characterization of NP with optimal amortized query complexity , 2000, STOC '00.

[5]  Eden Chlamtác,et al.  Approximation Algorithms Using Hierarchies of Semidefinite Programming Relaxations , 2007, 48th Annual IEEE Symposium on Foundations of Computer Science (FOCS'07).

[6]  Prasad Raghavendra,et al.  Constraint Satisfaction over a Non-Boolean Domain: Approximation Algorithms and Unique-Games Hardness , 2008, APPROX-RANDOM.

[7]  Grant Schoenebeck,et al.  Linear Level Lasserre Lower Bounds for Certain k-CSPs , 2008, 2008 49th Annual IEEE Symposium on Foundations of Computer Science.

[8]  T. Pitassi,et al.  Integrality gaps of 2 - o(1) for Vertex Cover SDPs in the Lovész-Schrijver Hierarchy , 2007, FOCS 2007.

[9]  Prasad Raghavendra,et al.  Optimal algorithms and inapproximability results for every CSP? , 2008, STOC.

[10]  Stefan Dziembowski,et al.  Intrusion-Resilient Secret Sharing , 2007, FOCS 2007.

[11]  Venkatesan Guruswami,et al.  MaxMin allocation via degree lower-bounded arborescences , 2009, STOC '09.

[12]  Hanif D. Sherali,et al.  A Hierarchy of Relaxations and Convex Hull Characterizations for Mixed-integer Zero-one Programming Problems , 1994, Discret. Appl. Math..

[13]  Monique Laurent,et al.  A Comparison of the Sherali-Adams, Lovász-Schrijver, and Lasserre Relaxations for 0-1 Programming , 2003, Math. Oper. Res..

[14]  Madhur Tulsiani,et al.  A Linear Round Lower Bound for Lovasz-Schrijver SDP Relaxations of Vertex Cover , 2007, Twenty-Second Annual IEEE Conference on Computational Complexity (CCC'07).

[15]  Moses Charikar,et al.  Integrality gaps for Sherali-Adams relaxations , 2009, STOC '09.

[16]  Béla Bollobás,et al.  Proving integrality gaps without knowing the linear program , 2002, The 43rd Annual IEEE Symposium on Foundations of Computer Science, 2002. Proceedings..

[17]  Iannis Tourlakis Towards Optimal Integrality Gaps for Hypergraph Vertex Cover in the Lovász-Schrijver Hierarchy , 2005, APPROX-RANDOM.

[18]  Toniann Pitassi,et al.  Rank bounds and integrality gaps for cutting planes procedures , 2003, 44th Annual IEEE Symposium on Foundations of Computer Science, 2003. Proceedings..

[19]  Madhur Tulsiani CSP gaps and reductions in the lasserre hierarchy , 2009, STOC '09.

[20]  Jean B. Lasserre,et al.  An Explicit Exact SDP Relaxation for Nonlinear 0-1 Programs , 2001, IPCO.

[21]  Robert Krauthgamer,et al.  The Probable Value of the Lovász--Schrijver Relaxations for Maximum Independent Set , 2003, SIAM J. Comput..

[22]  Wenceslas Fernandez de la Vega,et al.  Linear programming relaxations of maxcut , 2007, SODA '07.

[23]  Elchanan Mossel,et al.  Approximation Resistant Predicates from Pairwise Independence , 2008, Computational Complexity Conference.

[24]  Sandy Irani,et al.  The Power of Quantum Systems on a Line , 2007, 48th Annual IEEE Symposium on Foundations of Computer Science (FOCS'07).

[25]  Iannis Tourlakis,et al.  New Lower Bounds for Vertex Cover in the Lovasz-Schrijver Hierarchy , 2006, 21st Annual IEEE Conference on Computational Complexity (CCC'06).

[26]  Sanjeev Arora,et al.  Towards Strong Nonapproximability Results in the Lovász-Schrijver Hierarchy , 2005, STOC '05.

[27]  Madhur Tulsiani,et al.  Tight integrality gaps for Lovasz-Schrijver LP relaxations of vertex cover and max cut , 2007, STOC '07.

[28]  Alexander Schrijver,et al.  Cones of Matrices and Set-Functions and 0-1 Optimization , 1991, SIAM J. Optim..

[29]  Gyanit Singh,et al.  Improved Approximation Guarantees through Higher Levels of SDP Hierarchies , 2008, APPROX-RANDOM.

[30]  Warren P. Adams,et al.  A hierarchy of relaxation between the continuous and convex hull representations , 1990 .

[31]  Luca Trevisan,et al.  Gowers uniformity, influence of variables, and PCPs , 2005, STOC '06.