Keskin, K.Sağlam, Ç.2015-07-282015-07-2820140399-0559http://hdl.handle.net/11693/12516This paper studies the existence and the order structure of strong Berge equilibrium, a refinement of Nash equilibrium, for games with strategic complementarities a la strong Berge. It is shown that the equilibrium set is a nonempty complete lattice. Moreover, we provide a monotone comparative statics result such that the greatest and the lowest equilibria are increasing.EnglishStrong Berge equilibriumRefinementGames with strategic complementaritiesFixed point theorySupermodularityArticle10.1051/ro/2014012