Abstract. There is a Dutch Book argument for the axiom of countable additivity for subjective probability functions, but de Finetti famously rejected the axiom, arguing that it wrongly renders a uniform distribution impermissible over a countably infinite lottery. Dubins however showed that rejecting countable additivity has a strongly paradoxical consequence which a much weaker rule than countable additivity blocks. I argue that this rule, which also prohibits the de Finetti lottery itself, has powerful independent support in a desirable closure principle. I leave it as an open question whether countable additivity itself should be adopted
This paper addresses the issue of finite versus countable additivity in Bayesian probability and dec...
Non-Archimedean probability functions allow us to combine regularity with perfect additivity. We dis...
Bruno de Finetti was one of the most convinced advocates of finitely additive probabilities. The pre...
Abstract. There is a Dutch Book argument for the axiom of countable additivity for subjective probab...
The aim of this paper is to present and analyse Bruno de Finetti's view that the axiom of countable ...
In this paper I argue that de Finetti provided compelling reasons for rejecting countable additivity...
Many people believe that there is a Dutch Book argument establishing that the principle of countable...
Our aim here is to present a result that connects some approaches to justifying countable additivity...
A number of philosophers have thought that fair lotteries over countably infinite sets of outcomes a...
A randomly selected number from the infinite set of positive integers—the so-called de Finetti lotte...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
AbstractThis paper addresses the issue of finite versus countable additivity in Bayesian probability...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
This paper addresses the issue of finite versus countable additivity in Bayesian probability and dec...
Non-Archimedean probability functions allow us to combine regularity with perfect additivity. We dis...
Bruno de Finetti was one of the most convinced advocates of finitely additive probabilities. The pre...
Abstract. There is a Dutch Book argument for the axiom of countable additivity for subjective probab...
The aim of this paper is to present and analyse Bruno de Finetti's view that the axiom of countable ...
In this paper I argue that de Finetti provided compelling reasons for rejecting countable additivity...
Many people believe that there is a Dutch Book argument establishing that the principle of countable...
Our aim here is to present a result that connects some approaches to justifying countable additivity...
A number of philosophers have thought that fair lotteries over countably infinite sets of outcomes a...
A randomly selected number from the infinite set of positive integers—the so-called de Finetti lotte...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
AbstractThis paper addresses the issue of finite versus countable additivity in Bayesian probability...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
This paper addresses the issue of finite versus countable additivity in Bayesian probability and dec...
Non-Archimedean probability functions allow us to combine regularity with perfect additivity. We dis...
Bruno de Finetti was one of the most convinced advocates of finitely additive probabilities. The pre...