Long time average of mean field games

The fractional Poisson field (fPf) is constructed by considering the number of balls falling down on each point of R D , when the centers and the radii of the balls are thrown at

Based on the analysis of 50 to 125 years of time series of annual mean temperature at 56 stations in 18 groups selected from 10 mountainous regions of the world, the Alps, Kashmir,

Our empirical analysis for Swiss cantons over the period 1984–2005 suggests that fiscal rules have an economically and statistically significant negative effect on the probability of

Our main results are (i) Theorem 5.1, stating the existence of an equilibrium for the mean field game model we propose in this paper, and (ii) Theorem 6.1, stating that

The shared assumption underlying all these concepts is that players accept a game world, their characters and social situations as ‘real’, important, and meaningful so that their

The fact that in general, the soft constraints problem is NP-hard means that – unless P = NP – it is not feasibly possible to always produce the exact solution to this

We assume two types of players: myopic players make choices based on observed history of play while sophisticated players have correct beliefs about the actions of all other