Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite sequence of zeros and ones. If each agent starts with a prior belief about the true sequence and updates this belief on revelation of successive observations, what is the chance that the two agents will come to agree on the likelihood that the next draw is a one? In this paper we show that there is no chance. More formally, we show that under a very unrestrictive definition of what it means to draw priors "randomly," the probability that two priors have any chance of weakly merging is zero. Indeed, almost surely, the two measures will be singular--one prior will think certain a set of sequences that the other thinks impossible, and vice vers...
Isn't probability 1 certainty? If the probability is objective, so is the certainty: whatever has ch...
A central result in the rational learning literature is that if the true measure is absolutely conti...
The robustness of Aumann’s seminal agreement theorem with respect to the common prior assumption is ...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Most economic analyses presume that there are limited differences in the prior beliefs of individual...
Most economic analyses presume that there are limited differences in the prior beliefs of individual...
In this thesis we investigate some global desiderata for probabilistic knowledge merging given sever...
Two agents with different priors watch a sequence unfold over time, updating their priors about the ...
Merging of opinions results underwrite Bayesian rejoinders to complaints about the subjective nature...
This paper presents and defends an argument that the continuum hypothesis is false, based on conside...
Bayesians have a seemingly attractive account of rational credal states in terms of coherence. An ag...
Wenmackers and Romeijn [38] formalize ideas going back to Shimony [33] and Putnam [28] into an open-...
Under the assumption that individuals know the conditional distributions of signals given the payoff...
Isn't probability 1 certainty? If the probability is objective, so is the certainty: whatever has ch...
A central result in the rational learning literature is that if the true measure is absolutely conti...
The robustness of Aumann’s seminal agreement theorem with respect to the common prior assumption is ...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Suppose we randomly pull two agents from a population and ask them to observe an unfolding, infinite...
Most economic analyses presume that there are limited differences in the prior beliefs of individual...
Most economic analyses presume that there are limited differences in the prior beliefs of individual...
In this thesis we investigate some global desiderata for probabilistic knowledge merging given sever...
Two agents with different priors watch a sequence unfold over time, updating their priors about the ...
Merging of opinions results underwrite Bayesian rejoinders to complaints about the subjective nature...
This paper presents and defends an argument that the continuum hypothesis is false, based on conside...
Bayesians have a seemingly attractive account of rational credal states in terms of coherence. An ag...
Wenmackers and Romeijn [38] formalize ideas going back to Shimony [33] and Putnam [28] into an open-...
Under the assumption that individuals know the conditional distributions of signals given the payoff...
Isn't probability 1 certainty? If the probability is objective, so is the certainty: whatever has ch...
A central result in the rational learning literature is that if the true measure is absolutely conti...
The robustness of Aumann’s seminal agreement theorem with respect to the common prior assumption is ...