Finding the Core for Coalition Structure Utilizing Dual Solution

When forming the grand coalition is not possible/optimal, agents need to create a coalition structure. The idea of the core can be extended to such a case. In this paper, we propose an innovative algorithm called CoreD to check core-non-emptiness for coalition structures. A more straightforward algorithm based on existing techniques, which we call CoreP, first obtains the value of optimal coalition structure by solving an integer programming problem. Then, it checks whether that value can be divided without making a blocking (dissatisfied) coalition. In contrast, CoreD first finds a minimal amount value of optimal coalition structure so that there exists no blocking coalition. Then, it checks whether the optimal value can be equal to the minimal value. We empirically show that when the core is empty, CoreD is by far superior to CoreP. Also, to find a second-best payoff vector when the core is empty, we propose a new solution concept called the weak ε-core+, which can utilize the approximate value of the optimal coalition structure. Based on the idea of CoreD, we further develop an algorithm for checking the non-emptiness of the weak ε-core+.

[1]  Luigi Palopoli,et al.  On the complexity of core, kernel, and bargaining set , 2008, Artif. Intell..

[2]  Nicholas R. Jennings,et al.  Coalition Structure Generation over Graphs , 2012, J. Artif. Intell. Res..

[3]  R. J. Aumann,et al.  Cooperative games with coalition structures , 1974 .

[4]  Morton D. Davis,et al.  The kernel of a cooperative game , 1965 .

[5]  L. S. Shapley,et al.  Geometric Properties of the Kernel, Nucleolus, and Related Solution Concepts , 1979, Math. Oper. Res..

[6]  L. Shapley,et al.  QUASI-CORES IN A MONETARY ECONOMY WITH NONCONVEX PREFERENCES , 1966 .

[7]  Sarit Kraus,et al.  Methods for Task Allocation via Agent Coalition Formation , 1998, Artif. Intell..

[8]  Tuomas Sandholm,et al.  Algorithm for optimal winner determination in combinatorial auctions , 2002, Artif. Intell..

[9]  Haris Aziz,et al.  Complexity of coalition structure generation , 2011, AAMAS.

[10]  Nicholas R. Jennings,et al.  An algorithm for distributing coalitional value calculations among cooperating agents , 2007, Artif. Intell..

[11]  Roger B. Myerson,et al.  Graphs and Cooperation in Games , 1977, Math. Oper. Res..

[12]  E. Kohlberg On the Nucleolus of a Characteristic Function Game , 1971 .

[13]  Michael Wooldridge,et al.  Computational Aspects of Cooperative Game Theory , 2011, KES-AMSTA.

[14]  Jörg Rothe,et al.  The Cost of Stability in Coalitional Games , 2009, SAGT.

[15]  Noam Nisan,et al.  Bidding and allocation in combinatorial auctions , 2000, EC '00.

[16]  Sandip Sen,et al.  On the stability of an Optimal Coalition Structure , 2010, ECAI.

[17]  Onn Shehory,et al.  Coalition structure generation with worst case guarantees , 2022 .

[18]  Edith Elkind,et al.  Stability Via Convexity and LP Duality in OCF Games , 2012, AAAI.

[19]  Morteza Zadimoghaddam,et al.  Optimal Coalition Structure Generation in Cooperative Graph Games , 2013, AAAI.

[20]  Israel Zang,et al.  The Limits of Monopolization Through Acquisition , 1990 .

[21]  L. Shapley A Value for n-person Games , 1988 .

[22]  Yoav Shoham,et al.  Towards a universal test suite for combinatorial auction algorithms , 2000, EC '00.

[23]  N. Jennings,et al.  Computational Coalition Formation , 2013 .

[24]  Nicholas R. Jennings,et al.  An improved dynamic programming algorithm for coalition structure generation , 2008, AAMAS.

[25]  Makoto Yokoo,et al.  Finding core for coalition structure utilizing dual solution , 2015, Artif. Intell..

[26]  Vincent Conitzer,et al.  Coalition Structure Generation Utilizing Compact Characteristic Function Representations , 2009, CP.

[27]  Piotr Faliszewski,et al.  Constrained Coalition Formation , 2011, AAAI.

[28]  Vincent Conitzer,et al.  Complexity of constructing solutions in the core based on synergies among coalitions , 2006, Artif. Intell..

[29]  Gabrielle Demange,et al.  The strategy structure of some coalition formation games , 2009, Games Econ. Behav..

[30]  E. Rowland Theory of Games and Economic Behavior , 1946, Nature.

[31]  Tri-Dung Nguyen,et al.  A fast approximation algorithm for solving the complete set packing problem , 2014, Eur. J. Oper. Res..

[32]  Michel Gendreau,et al.  Combinatorial auctions , 2007, Ann. Oper. Res..

[33]  Luigi Palopoli,et al.  On the Complexity of the Core over Coalition Structures , 2011, IJCAI.

[34]  Jeffrey S. Rosenschein,et al.  Subsidies, Stability, and Restricted Cooperation in Coalitional Games , 2011, IJCAI.

[35]  H. Young,et al.  Cost allocation in water resources development , 1982 .

[36]  Vincent Conitzer,et al.  A Compact Representation Scheme for Coalitional Games in Open Anonymous Environments , 2006, AAAI.

[37]  Nicholas R. Jennings,et al.  An Anytime Algorithm for Finding the ?-Core in Nontransferable Utility Coalitional Games , 2012, ECAI.

[38]  Yoav Shoham,et al.  Marginal contribution nets: a compact representation scheme for coalitional games , 2005, EC '05.

[39]  Ariel Rubinstein,et al.  A Course in Game Theory , 1995 .

[40]  Kyomin Jung,et al.  Coalitional Structure Generation in Skill Games , 2010, AAAI.

[41]  J. Pérez-Castrillo,et al.  Cooperative Outcomes through Noncooperative Games , 1994 .

[42]  Sarvapali D. Ramchurn,et al.  An Anytime Algorithm for Optimal Coalition Structure Generation , 2014, J. Artif. Intell. Res..

[43]  Sarvapali D. Ramchurn,et al.  Coalition formation with spatial and temporal constraints , 2010, AAMAS.

[44]  Nicholas R. Jennings,et al.  Minimum Search to Establish Worst-Case Guarantees in Coalition Structure Generation , 2011, IJCAI.

[45]  Nicholas R. Jennings,et al.  A Hybrid Algorithm for Coalition Structure Generation , 2012, AAAI.

[46]  Nicholas R. Jennings,et al.  A distributed algorithm for anytime coalition structure generation , 2010, AAMAS.