Add to ORKGThe notion of common prior is well-understood and widely-used in the incomplete information games literature. For ordinary type spaces the common prior is defined. Pinter and Udvari (2011) introduce the notion of generalized type space. Generalized type spaces are models for various bonded rationality issues, for finite belief hierarchies, unawareness among others. In this paper we define the notion of common prior for generalized types spaces. Our results are as follows: the generalization (1) suggests a new form of common prior for ordinary type spaces, (2) shows some quantum game theoretic results (Brandenburger and La Mura, 2011) in new light
The existence of a common prior is a property of the state space used to model the players' incomple...
We prove that under some technical assumptions on a general, non-classical probability space, the pr...
Every abstract type of a belief-closed type space corresponds to an infinite belief hierarchy. But o...
The notion of common prior is well-understood and widely-used in the incomplete information games li...
The type function of an agent, in a type space, associates with each state a probability distributio...
Ordinary type spaces (Heifetz and Samet, 1998) are essential ingredients of incomplete information g...
Ordinary type spaces (Heifetz and Samet, 1998) are essential ingre-dients of incomplete information ...
Extending to infinite state spaces that are compact metric spaces a result previously attained by Do...
Abandoning the oft-presumed common prior assumption, partitioned type spaces with disparate priors a...
We show that in the Merterns-Zamir universal type space the strategic closure of finite common-prior...
The existence of a common prior is a property of the state space used to model the players' asymmetr...
Several game theoretical topics require the analysis of hierarchical beliefs, particularly in incomp...
Several game theoretical topics require the analysis of hierarchical beliefs, particularly in incomp...
The existence of a common prior is a property of the state space used to model the players' incomple...
We prove that under some technical assumptions on a general, non-classical probability space, the pr...
Every abstract type of a belief-closed type space corresponds to an infinite belief hierarchy. But o...
The notion of common prior is well-understood and widely-used in the incomplete information games li...
The type function of an agent, in a type space, associates with each state a probability distributio...
Ordinary type spaces (Heifetz and Samet, 1998) are essential ingredients of incomplete information g...
Ordinary type spaces (Heifetz and Samet, 1998) are essential ingre-dients of incomplete information ...
Extending to infinite state spaces that are compact metric spaces a result previously attained by Do...
Abandoning the oft-presumed common prior assumption, partitioned type spaces with disparate priors a...
We show that in the Merterns-Zamir universal type space the strategic closure of finite common-prior...
The existence of a common prior is a property of the state space used to model the players' asymmetr...
Several game theoretical topics require the analysis of hierarchical beliefs, particularly in incomp...
Several game theoretical topics require the analysis of hierarchical beliefs, particularly in incomp...
The existence of a common prior is a property of the state space used to model the players' incomple...
We prove that under some technical assumptions on a general, non-classical probability space, the pr...
Every abstract type of a belief-closed type space corresponds to an infinite belief hierarchy. But o...