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dc.contributor.authorSTAUDIGL, Mathias
dc.date.accessioned2010-10-19T15:44:06Z
dc.date.available2010-10-19T15:44:06Z
dc.date.issued2010
dc.identifier.issn1830-7728
dc.identifier.urihttps://hdl.handle.net/1814/14737
dc.description.abstractIn a Bayesian interaction game players have diverse preferences and are randomly matched according to an inhomogeneous random graph. A co-evolutionary process of networks and play gives a dynamic formalism for the joint evolution of the random graph and the actions the players use per match. Assuming that the players select actions and links according to log-linear functions taking as arguments the reward per match, we provide closed form solutions for the joint invariant distribution of the co-evolutionary process. We give sufficient conditions for the general selection of potential maximizers in the small noise limit, and also discuss concentration of the invariant distribution in the large population limit. Further, we present a general characterization theorem that a co-evolutionary process generates inhomogeneous random graphs, a large and important class of random graphs recently discussed in the economic and mathematical literature on random networks.en
dc.format.mimetypeapplication/pdf
dc.language.isoenen
dc.relation.ispartofseriesEUI MWP;2010/35en
dc.rightsinfo:eu-repo/semantics/openAccess
dc.subjectPotential gamesen
dc.subjectNetwork evolutionen
dc.subjectHeterogeneous populationsen
dc.subjectInhomogeneous random graphsen
dc.subjectLarge deviationsen
dc.subjectC73en
dc.subjectD83en
dc.subjectD58en
dc.titleCo-evolutionary Dynamics and Bayesian Interaction Gamesen
dc.typeWorking Paperen
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