AbstractThe genesis of this study is a paper of A. A. Chuprov (1916) which reveals a very early understanding and manipulation (in a dispersion-theory setting) of general finitely exchangeable random variables: a mathematically elegant approach, allied with expectations, to exchangeability. (Hitherto-known historical approaches to exchangeability wer in essence via exchangeable events.) Equally little-known consequent developments of its themes by Chuprov (1922) and his student Ya. Mordukh (1923) are then sketched. The work is notable for its mathematical precision in a statistical setting, to a degree uncharacteristic of the time; and for its remarkable technical insights. In particular, precise formulas relating to moments of the sample c...
We derive an expression for the joint distribution of exchangeable multinomial random variables, whi...
[[abstract]]A necessary and sufficient condition is given for the strong law of large numbers to hol...
This paper deals with finite sequences of exchangeable 0–1 random variables. Our main purpose is to ...
AbstractThe genesis of this study is a paper of A. A. Chuprov (1916) which reveals a very early unde...
In the second volume of “An introduction to Probability Theory and Its Applications”, Feller (1966) ...
This thesis evolves around a probabilistic concept called exchangeability and its generalised forms....
The general concept of exchangeability allows the more flexible modelling of most experimental setup...
Doctor of Philosophy in Mathematics, Statistics and Computer Science. University of KwaZulu-Natal, D...
Exchangeability of observations corresponds to a condition shared by the vast majority of applicatio...
We examine the difference between Bayesian and frequentist statistics in making statements about the...
Exchangeability is a central notion in statistics and probability theory. The assumption that an inf...
The notion of exchangeability referring to random events is investigated by using a geometric scheme...
A set of random variables is exchangeable if its joint distribution function is invariant under perm...
ii Gábor J. Székely, Advisor The focus of this research was to explore the mathematical uses of si...
Exchangeability -- the probabilistic symmetry meaning ``invariance under the action of the symmetric...
We derive an expression for the joint distribution of exchangeable multinomial random variables, whi...
[[abstract]]A necessary and sufficient condition is given for the strong law of large numbers to hol...
This paper deals with finite sequences of exchangeable 0–1 random variables. Our main purpose is to ...
AbstractThe genesis of this study is a paper of A. A. Chuprov (1916) which reveals a very early unde...
In the second volume of “An introduction to Probability Theory and Its Applications”, Feller (1966) ...
This thesis evolves around a probabilistic concept called exchangeability and its generalised forms....
The general concept of exchangeability allows the more flexible modelling of most experimental setup...
Doctor of Philosophy in Mathematics, Statistics and Computer Science. University of KwaZulu-Natal, D...
Exchangeability of observations corresponds to a condition shared by the vast majority of applicatio...
We examine the difference between Bayesian and frequentist statistics in making statements about the...
Exchangeability is a central notion in statistics and probability theory. The assumption that an inf...
The notion of exchangeability referring to random events is investigated by using a geometric scheme...
A set of random variables is exchangeable if its joint distribution function is invariant under perm...
ii Gábor J. Székely, Advisor The focus of this research was to explore the mathematical uses of si...
Exchangeability -- the probabilistic symmetry meaning ``invariance under the action of the symmetric...
We derive an expression for the joint distribution of exchangeable multinomial random variables, whi...
[[abstract]]A necessary and sufficient condition is given for the strong law of large numbers to hol...
This paper deals with finite sequences of exchangeable 0–1 random variables. Our main purpose is to ...