Recently Timothy Williamson asked ‘How probable is an infinite sequence of heads?’ In this paper, I suggest the probability of an infinite sequence of heads
AbstractThis paper presents an extension of the theory of finite random sets to infinite random sets...
This article discusses the connection between the Zenonian paradox of magnitude and probability on i...
Plenary talk at IFSA 2005, Beijing, China.International audiencePossibility theory is a simple uncer...
Recently Timothy Williamson asked ‘How probable is an infinite sequence of heads?’ In this paper, I ...
Isn't probability 1 certainty? If the probability is objective, so is the certainty: whatever has ch...
Everyone knows some of the basics of probability, perhaps enough to play cards. Beyond the introduct...
Some philosophers have claimed that it is meaningless or paradoxical to consider the probability of ...
For a homework assignment in a statistics course, half the class was asked to record the actual resu...
This dissertation is a contribution to formal and computational philosophy. In ...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
It is natural to think that questions in the metaphysics of chance are independent of the mathematic...
Six versions of finite frequentism and criticisms [Hájek, 1996]. A problem for infinite frequentism...
This is the sequel to my "Fifteen Arguments Against Finite Frequentism" (Erkenntnis 1997), the secon...
some operations on these things. • The universe is the set of all possible results. Sometimes, the u...
Consider the infinite sequences of 0’s and 1’s, often called reals. Some of them are sufficiently “d...
AbstractThis paper presents an extension of the theory of finite random sets to infinite random sets...
This article discusses the connection between the Zenonian paradox of magnitude and probability on i...
Plenary talk at IFSA 2005, Beijing, China.International audiencePossibility theory is a simple uncer...
Recently Timothy Williamson asked ‘How probable is an infinite sequence of heads?’ In this paper, I ...
Isn't probability 1 certainty? If the probability is objective, so is the certainty: whatever has ch...
Everyone knows some of the basics of probability, perhaps enough to play cards. Beyond the introduct...
Some philosophers have claimed that it is meaningless or paradoxical to consider the probability of ...
For a homework assignment in a statistics course, half the class was asked to record the actual resu...
This dissertation is a contribution to formal and computational philosophy. In ...
Many epistemologists have responded to the lottery paradox by proposing formal rules according to wh...
It is natural to think that questions in the metaphysics of chance are independent of the mathematic...
Six versions of finite frequentism and criticisms [Hájek, 1996]. A problem for infinite frequentism...
This is the sequel to my "Fifteen Arguments Against Finite Frequentism" (Erkenntnis 1997), the secon...
some operations on these things. • The universe is the set of all possible results. Sometimes, the u...
Consider the infinite sequences of 0’s and 1’s, often called reals. Some of them are sufficiently “d...
AbstractThis paper presents an extension of the theory of finite random sets to infinite random sets...
This article discusses the connection between the Zenonian paradox of magnitude and probability on i...
Plenary talk at IFSA 2005, Beijing, China.International audiencePossibility theory is a simple uncer...