This paper deals with finite sequences of exchangeable 0–1 random variables. Our main purpose is to exhibit the dependence structure between such indicators. Working with Kendall's representation by mixture, we prove that a convex order of higher degree on the mixing variable implies a supermodular order of same degree on the indicators, and conversely. The convex order condition is then discussed for three standard distributions (binomial, hypergeometric and Stirling) in which the parameter is randomized. Distributional properties of exchangeable indicators are also revisited using an underlying Schur-constant property. Finally, two applications in insurance and credit risk illustrate some of the results.SCOPUS: ar.jinfo:eu-repo/semantics/...
As a motivating problem, we aim to study some special aspects of the marginal distributions of the o...
Abstract Sets of desirable gambles constitute a quite general type of un-certainty model with an int...
We prove a Kolmogorov-Feller weak law of large numbers for exchangeable sequences, under a second or...
We present a novel analogue for finite exchangeable sequences of the de Finetti, Hewitt and Savage t...
This paper deals with a surprising connection between exchangeable distributions on {0, 1}n and the ...
Assuming that the probability distribution of a finite sequence has a density depending solely on th...
ii Gábor J. Székely, Advisor The focus of this research was to explore the mathematical uses of si...
A finite exchangeable sequence (ξ1,...,ξN) need not satisfy de Finetti's conditional representation,...
We consider a finite sequence of exchangeable binary random variables and assume that the conditiona...
This thesis evolves around a probabilistic concept called exchangeability and its generalised forms....
Let S be a Polish space and (Xn : n = 1) an exchangeable sequence of S-valued random variables. Let ...
AbstractSets of desirable gambles constitute a quite general type of uncertainty model with an inter...
In the second volume of “An introduction to Probability Theory and Its Applications”, Feller (1966) ...
We derive an expression for the joint distribution of exchangeable multinomial random variables, whi...
none3noA new type of stochastic dependence for a sequence of random variables is introduced and stu...
As a motivating problem, we aim to study some special aspects of the marginal distributions of the o...
Abstract Sets of desirable gambles constitute a quite general type of un-certainty model with an int...
We prove a Kolmogorov-Feller weak law of large numbers for exchangeable sequences, under a second or...
We present a novel analogue for finite exchangeable sequences of the de Finetti, Hewitt and Savage t...
This paper deals with a surprising connection between exchangeable distributions on {0, 1}n and the ...
Assuming that the probability distribution of a finite sequence has a density depending solely on th...
ii Gábor J. Székely, Advisor The focus of this research was to explore the mathematical uses of si...
A finite exchangeable sequence (ξ1,...,ξN) need not satisfy de Finetti's conditional representation,...
We consider a finite sequence of exchangeable binary random variables and assume that the conditiona...
This thesis evolves around a probabilistic concept called exchangeability and its generalised forms....
Let S be a Polish space and (Xn : n = 1) an exchangeable sequence of S-valued random variables. Let ...
AbstractSets of desirable gambles constitute a quite general type of uncertainty model with an inter...
In the second volume of “An introduction to Probability Theory and Its Applications”, Feller (1966) ...
We derive an expression for the joint distribution of exchangeable multinomial random variables, whi...
none3noA new type of stochastic dependence for a sequence of random variables is introduced and stu...
As a motivating problem, we aim to study some special aspects of the marginal distributions of the o...
Abstract Sets of desirable gambles constitute a quite general type of un-certainty model with an int...
We prove a Kolmogorov-Feller weak law of large numbers for exchangeable sequences, under a second or...