Characterising the Manipulability of Boolean Games

The existence of (Nash) equilibria with undesirable properties is a well-known problem in game theory, which has motivated much research directed at the possibility of mechanisms for modifying games in order to eliminate undesirable equilibria, or induce desirable ones. Taxation schemes are a well-known mechanism for modifying games in this way. In the multi-agent systems community, taxation mechanisms for incentive engineering have been studied in the context of Boolean games with costs. These are games in which each player assigns truth-values to a set of propositional variables she uniquely controls in pursuit of satisfying an individual propositional goal formula; different choices for the player are also associated with different costs. In such a game, each player prefers primarily to see the satisfaction of their goal, and secondarily, to minimise the cost of their choice, thereby giving rise to lexicographic preferences over goal-satisfaction and costs. Within this setting, where taxes operate on costs only, however, it may well happen that the elimination or introduction of equilibria can only be achieved at the cost of simultaneously introducing less desirable equilibria or eliminating more attractive ones. Although this framework has been studied extensively, the problem of precisely characterising the equilibria that may be induced or eliminated has remained open. In this paper we close this problem, giving a complete characterisation of those mechanisms that can induce a set of outcomes of the game to be exactly the set of Nash Equilibrium outcomes.

[1]  R. Coase,et al.  The Problem of Social Cost , 1960, The Journal of Law and Economics.

[2]  J. Tobin A Proposal for International Monetary Reform , 1978 .

[3]  H. O. Kerkmeester Journal of law and economics en Journal of legal studies , 2005 .

[4]  Arkadii Slinko,et al.  Additive Representability of Finite Measurement Structures , 2009, The Mathematics of Preference, Choice and Order.

[5]  Viktoria Gerner,et al.  Legitimization of the free market from two aspects: Hayek: Competition as a discovery procedure vs. Coase: The Problem of Social Cost , 2006 .

[6]  Sarit Kraus,et al.  Manipulating Boolean Games through Communication , 2011, IJCAI.

[7]  Yoav Shoham,et al.  Multiagent Systems - Algorithmic, Game-Theoretic, and Logical Foundations , 2009 .

[8]  Paolo Turrini,et al.  Endogenous Boolean Games , 2013, IJCAI.

[9]  J. Meade,et al.  External Economies and Diseconomies in a Competitive Situation , 1952 .

[10]  Sarit Kraus,et al.  Cooperative Boolean games , 2008, AAMAS.

[11]  S. Griffis EDITOR , 1997, Journal of Navigation.

[12]  Michael Wooldridge,et al.  Hard and soft equilibria in boolean games , 2014, AAMAS.

[13]  Patrick Suppes,et al.  Basic measurement theory , 1962 .

[14]  Martine De Cock,et al.  Multilateral Negotiation in Boolean Games with Incomplete Information Using Generalized Possibilistic Logic , 2015, IJCAI.

[15]  Paolo Turrini,et al.  Endogenous games with goals: side-payments among goal-directed agents , 2013, Autonomous Agents and Multi-Agent Systems.

[16]  Nils J. Nilsson,et al.  Artificial Intelligence , 1974, IFIP Congress.

[17]  Marios Mavronicolas,et al.  Weighted Boolean Formula Games , 2015, Algorithms, Probability, Networks, and Games.

[18]  Michael Wooldridge,et al.  Hard and Soft Preparation Sets in Boolean Games , 2015, Studia Logica.

[19]  James Nga-kwok Liu,et al.  Autonomous agents and multi-agent systems , 1999 .

[20]  W. Bossert,et al.  Ranking Sets of Objects , 2001 .