Tight approximation algorithms for maximum general assignment problems

A separable assignment problem (SAP) is defined by a set of bins and a set of items to pack in each bin; a value, f ij , for assigning item j to bin i; and a separate packing constraint for each bin - i.e. for bin i, a family L i of subsets of items that fit in bin i. The goal is to pack items into bins to maximize the aggregate value. This class of problems includes the maximum generalized assignment problem (GAP)1) and a distributed caching problem (DCP) described in this paper.Given a β-approximation algorithm for finding the highest value packing of a single bin, we give1. A polynomial-time LP-rounding based ((1 − 1/e)β)-approximation algorithm.2. A simple polynomial-time local search (β/β+1 - e) - approximation algorithm, for any e > 0.Therefore, for all examples of SAP that admit an approximation scheme for the single-bin problem, we obtain an LP-based algorithm with (1 - 1/e - e)-approximation and a local search algorithm with (1/2-e)-approximation guarantee. Furthermore, for cases in which the subproblem admits a fully polynomial approximation scheme (such as for GAP), the LP-based algorithm analysis can be strengthened to give a guarantee of 1 - 1/e. The best previously known approximation algorithm for GAP is a 1/2-approximation by Shmoys and Tardos; and Chekuri and Khanna. Our LP algorithm is based on rounding a new linear programming relaxation, with a provably better integrality gap.To complement these results, we show that SAP and DCP cannot be approximated within a factor better than 1 -1/e unless NP⊆ DTIME(nO(log log n)), even if there exists a polynomial-time exact algorithm for the single-bin problem.We extend the (1 - 1/e)-approximation algorithm to a nonseparable assignment problem with applications in maximizing revenue for budget-constrained combinatorial auctions and the AdWords assignment problem. We generalize the local search algorithm to yield a 1/2-e approximation algorithm for the k-median problem with hard capacities. Finally, we study naturally defined game-theoretic versions of these problems, and show that they have price of anarchy of 2. We also prove the existence of cycles of best response moves, and exponentially long best-response paths to (pure or sink) equilibria.

[1]  J. Nash Equilibrium Points in N-Person Games. , 1950, Proceedings of the National Academy of Sciences of the United States of America.

[2]  M. L. Fisher,et al.  An analysis of approximations for maximizing submodular set functions—I , 1978, Math. Program..

[3]  Mihalis Yannakakis,et al.  How easy is local search? , 1985, 26th Annual Symposium on Foundations of Computer Science (sfcs 1985).

[4]  Mihalis Yannakakis,et al.  On the complexity of local search , 1990, STOC '90.

[5]  Mihalis Yannakakis,et al.  Simple Local Search Problems That are Hard to Solve , 1991, SIAM J. Comput..

[6]  Éva Tardos,et al.  An approximation algorithm for the generalized assignment problem , 1993, Math. Program..

[7]  David P. Williamson,et al.  New 3/4-Approximation Algorithms for the Maximum Satisfiability Problem , 1994, SIAM J. Discret. Math..

[8]  Neal E. Young,et al.  Randomized rounding without solving the linear program , 1995, SODA '95.

[9]  Éva Tardos,et al.  Fast Approximation Algorithms for Fractional Packing and Covering Problems , 1995, Math. Oper. Res..

[10]  U. Feige A threshold of ln n for approximating set cover , 1998, JACM.

[11]  Jochen Könemann,et al.  Faster and simpler algorithms for multicommodity flow and other fractional packing problems , 1998, Proceedings 39th Annual Symposium on Foundations of Computer Science (Cat. No.98CB36280).

[12]  Sanjeev Khanna,et al.  A PTAS for the multiple knapsack problem , 2000, SODA '00.

[13]  Vijay Kumar,et al.  Approximation Algorithms for Budget-Constrained Auctions , 2001, RANDOM-APPROX.

[14]  Aravind Srinivasan,et al.  Distributions on level-sets with applications to approximation algorithms , 2001, Proceedings 2001 IEEE International Conference on Cluster Computing.

[15]  Rajmohan Rajaraman,et al.  Approximation algorithms for data placement in arbitrary networks , 2001, SODA '01.

[16]  Neal E. Young,et al.  Sequential and parallel algorithms for mixed packing and covering , 2001, Proceedings 2001 IEEE International Conference on Cluster Computing.

[17]  Aravind Srinivasan,et al.  Approximating the Domatic Number , 2002, SIAM J. Comput..

[18]  Adrian Vetta,et al.  Nash equilibria in competitive societies, with applications to facility location, traffic routing and auctions , 2002, The 43rd Annual IEEE Symposium on Foundations of Computer Science, 2002. Proceedings..

[19]  Hadas Shachnai,et al.  Approximation Schemes for Generalized 2-Dimensional Vector Packing with Application to Data Placement , 2003, RANDOM-APPROX.

[20]  David B. Shmoys,et al.  An improved approximation algorithm for the partial latin square extension problem , 2003, SODA '03.

[21]  Mohammad R. Salavatipour,et al.  Packing Steiner trees , 2003, SODA '03.

[22]  Klaus Jansen,et al.  On rectangle packing: maximizing benefits , 2004, SODA '04.

[23]  Maxim Sviridenko,et al.  A note on maximizing a submodular set function subject to a knapsack constraint , 2004, Oper. Res. Lett..

[24]  Maxim Sviridenko,et al.  Pipage Rounding: A New Method of Constructing Algorithms with Proven Performance Guarantee , 2004, J. Comb. Optim..

[25]  Yishay Mansour,et al.  Auctions with Budget Constraints , 2004, SWAT.

[26]  Vahab S. Mirrokni,et al.  Sink equilibria and convergence , 2005, 46th Annual IEEE Symposium on Foundations of Computer Science (FOCS'05).

[27]  Vahab Mirrokni,et al.  Approximation algorithms for distributed and selfish agents , 2005 .

[28]  Erez Petrank The hardness of approximation: Gap location , 2005, computational complexity.

[29]  Uriel Feige,et al.  Approximation algorithms for allocation problems: Improving the factor of 1 - 1/e , 2006, 2006 47th Annual IEEE Symposium on Foundations of Computer Science (FOCS'06).

[30]  Raphael Yuster,et al.  A (1-1/e)-approximation algorithm for the generalized assignment problem , 2006, Oper. Res. Lett..

[31]  Marina Thottan,et al.  Market sharing games applied to content distribution in ad hoc networks , 2004, IEEE Journal on Selected Areas in Communications.

[32]  Jan Vondrák,et al.  Maximizing a Submodular Set Function Subject to a Matroid Constraint (Extended Abstract) , 2007, IPCO.