Showing 1 - 10 of 412
Persistent link: https://www.econbiz.de/10012236130
This paper discusses the implications of learning theory for the analysis of Bayesian games. One goal is to illuminate the issues that arise when modeling situations where players are learning about the distribution of Nature's move as well as learning about the opponents' strategies. A second...
Persistent link: https://www.econbiz.de/10014126917
Persistent link: https://www.econbiz.de/10005708240
Persistent link: https://www.econbiz.de/10005588596
Persistent link: https://www.econbiz.de/10005636460
This paper discusses the implications of learning theory for the analysis of Bayesian games. One goal is to illuminate the issues that arise when modeling situations where players are learning about the distribution of Nature's move as well as learning about the opponents' strategies. A second...
Persistent link: https://www.econbiz.de/10005478817
We define and analyze a "strategic topology'' on types in the Harsanyi-Mertens-Zamir universal type space, where two types are close if their strategic behavior is similar in all strategic situations. For a fixed game and action define the distance between a pair of types as the difference...
Persistent link: https://www.econbiz.de/10011599372
This paper proposes the solution concept of interim correlated rationalizability, and shows that all types that have the same hierarchies of beliefs have the same set of interim-correlated-rationalizable outcomes. This solution concept characterizes common certainty of rationality in the...
Persistent link: https://www.econbiz.de/10011599381
We de.ne and analyze a strategic topology on types in the Harsanyi-Mertens-Zamir universal type space, where two types are close if their strategic behavior is similar in all strategic situations. For a .xed game and action de.ne the distance be-tween a pair of types as the diþerence between...
Persistent link: https://www.econbiz.de/10010272319
We define and analyze a "strategic topology" on types in the Harsanyi-Mertens-Zamir universal type space, where two types are close if their strategic behavior is similar in all strategic situations. For a fixed game and action define the distance between a pair of types as the difference...
Persistent link: https://www.econbiz.de/10003780874