Restricted Max-Min Fair Allocation

The restricted max-min fair allocation problem seeks an allocation of resources to players that maximizes the minimum total value obtained by any player. It is NP-hard to approximate the problem to a ratio less than 2. Comparing the current best algorithm for estimating the optimal value with the current best for constructing an allocation, there is quite a gap between the ratios that can be achieved in polynomial time: roughly 4 for estimation and roughly $6 + 2\sqrt{10}$ for construction. We propose an algorithm that constructs an allocation with value within a factor of $6 + \delta$ from the optimum for any constant $\delta > 0$. The running time is polynomial in the input size for any constant $\delta$ chosen.

[1]  Penny E. Haxell,et al.  A condition for matchability in hypergraphs , 1995, Graphs Comb..

[2]  T.-H. Hubert Chan,et al.  On (1, $$\epsilon $$ϵ)-Restricted Max–Min Fair Allocation Problem , 2018, Algorithmica.

[3]  Ola Svensson,et al.  Combinatorial Algorithm for Restricted Max-Min Fair Allocation , 2014, SODA.

[4]  Aravind Srinivasan,et al.  New Constructive Aspects of the Lovasz Local Lemma , 2010, 2010 IEEE 51st Annual Symposium on Foundations of Computer Science.

[5]  Jan Karel Lenstra,et al.  Approximation algorithms for scheduling unrelated parallel machines , 1987, 28th Annual Symposium on Foundations of Computer Science (sfcs 1987).

[6]  Ivona Bezáková,et al.  Allocating indivisible goods , 2005, SECO.

[7]  Uriel Feige,et al.  Santa claus meets hypergraph matchings , 2008, TALG.

[8]  Richard M. Karp,et al.  A n^5/2 Algorithm for Maximum Matchings in Bipartite Graphs , 1971, SWAT.

[9]  Amin Saberi,et al.  An Approximation Algorithm for Max-Min Fair Allocation of Indivisible Goods , 2010, SIAM J. Comput..

[10]  Nikhil Bansal,et al.  The Santa Claus problem , 2006, STOC '06.

[11]  Uriel Feige,et al.  On allocations that maximize fairness , 2008, SODA '08.

[12]  Klaus Jansen,et al.  A note on the integrality gap of the configuration LP for restricted Santa Claus , 2020, Inf. Process. Lett..

[13]  Siu-Wing Cheng,et al.  Integrality Gap of the Configuration LP for the Restricted Max-Min Fair Allocation , 2018, ArXiv.

[14]  Aravind Srinivasan,et al.  A new approximation technique for resource‐allocation problems , 2010, ICS.

[15]  D. Golovin Max-min fair allocation of indivisible goods , 2005 .

[16]  Sanjeev Khanna,et al.  On Allocating Goods to Maximize Fairness , 2009, 2009 50th Annual IEEE Symposium on Foundations of Computer Science.