98 research outputs found
Coordinating choice in partial cooperative equilibrium
In this paper we consider symmetric aggregative games and investigate partial cooperation between a portion of the players that sign a cooperative agreement and the rest of the players. Existence results of partial cooperative equilibria are obtained when the players who do not sign the agreement play a Nash equilibrium game having multiple solutions. Some applications in the supermodular case are discussed.Noncooperative games, cooperation, aggregative games, supermodular games.
Partial Cooperation and Non-Signatories Multiple Decision
In this paper we investigate partial cooperation between a portion of the players and the rest of the players who do not cooperate and play a Nash game having multiple equilibria. Some properties of the partial cooperative equilibrium are studied and applied to a public goods situation.noncooperative games, cooperation, public goods games
Multi-Leader Multi-Follower Model with Aggregative Uncertainty
We study a non-cooperative game with aggregative structure, namely when the payoffs depend on the strategies of the opponent players through an aggregator function. We assume that a subset of players behave as leaders in a Stackelberg model. The leaders, as well the followers, act non-cooperatively between themselves and solve a Nash equilibrium problem. We assume an exogenous uncertainty affecting the aggregator and we obtain existence results for the stochastic resulting game. Some examples are illustrated
Softening bilevel problems via two-scale Gibbs measures
We introduce a new, and elementary, approximation method for bilevel optimization problems motivated by Stackelberg leader-follower games. Our technique is based on the notion of two-scale Gibbs measures. The first scale corresponds to the cost function of the follower and the second scale to that of the leader. We explain how to choose the weights corresponding to these two scales under very general assumptions and establish rigorous Γ-convergence results. An advantage of our method is that it is applicable both to optimistic and to pessimistic bilevel problems
Conflict & Cooperation under Stackelberg Assumption
EnIn a Game Theory context, we consider partial cooperation between a portion of the players and the rest of the players who do not cooperate and play a Nash game. The players may decide their strategy simultaneously or in a two-stage model. In both cases, some properties of the partial cooperative equilibrium are studied and applied to a different practical situations
Game theoretic foundations of the Gately power measure for directed networks
We introduce a new network centrality measure founded on the Gately value for
cooperative games with transferable utilities. A directed network is
interpreted as representing control or authority relations between
players--constituting a hierarchical network. The power distribution of a
hierarchical network can be represented through a TU-game. We investigate the
properties of this TU-representation and investigate the Gately value of the
TU-representation resulting in the Gately power measure. We establish when the
Gately measure is a Core power gauge, investigate the relationship of the
Gately with the -measure, and construct an axiomatisation of the Gately
measure
Gately Values of Cooperative Games
We investigate Gately's solution concept for cooperative games with
transferable utilities. Gately's conception introduced a bargaining solution
that minimises the maximal quantified ``propensity to disrupt'' the negotiation
process of the players over the allocation of the generated collective payoffs.
Gately's solution concept is well-defined for a broad class of games. We also
consider a generalisation based on a parameter-based quantification of the
propensity to disrupt. Furthermore, we investigate the relationship of these
generalised Gately values with the Core and the Nucleolus and show that
Gately's solution is in the Core for all regular 3-player games. We identify
exact conditions under which generally these Gately values are Core imputations
for arbitrary regular cooperative games. Finally, we investigate the
relationship of the Gately value with the Shapley value
Equilibrium and dominance in fuzzy games
In this paper, we study the generalization of (Nash) equilibrium and dominance solvability to interval fuzzy games in strategic form. We show that the more straightforward generalizations of these concepts do not inherit their most relevant results, either in terms of existence or refinement. To efficiently handle the fuzziness of the payoffs, we use the Hurwicz criterion and introduce new equilibrium concepts and dominance solutions which greatly overcome these drawbacks.Agencia Estatal de Investigación | Ref. PID2020-113440GB-I0
On location-allocation problems for dimensional facilities
This paper deals with a bilevel approach of the location-allocation problem with dimensional facilities. We present a general model that allows us to consider very general shapes of domains for the dimensional facilities and we prove the existence of optimal solutions under mild, natural assumptions. To achieve these results we borrow tools from optimal transport mass theory that allow us to give explicit solution structure of the considered lower level problem. We also provide a discretization approach that can approximate, up to any degree of accuracy, the optimal solution of the original problem. This discrete approximation can be optimally solved via a mixedinteger linear program. To address very large instance sizes we also provide a GRASP heuristic that performs rather well according to our experimental results. The paper also reports some experiments run on test data.Ministerio de Economía y Competitividad (MINECO). Españ
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