In this article, we characterize comonotonicity and related dependence structures among several random variables by the distribution of their sum. First we prove that if the sum has the same distribution as the corresponding comonotonic sum, then the underlying random variables must be comonotonic as long as each of them is integrable. In the literature, this result is only known to be true if either each random variable is square integrable or possesses a continuous distribution function. We then study the situation when the distribution of the sum only coincides with the corresponding comonotonic sum in the tail. This leads to the dependence structure known as tail comonotonicity. Finally, by establishing some new results concerning conve...
In the recent actuarial literature, several proofs have been given for the fact that if a random vec...
This article gives counterexamples for some conjectures about risk orders. One is that in risky situ...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...
It is well known that if a random vector with given marginal distributions is comonotonic, it has th...
It is well-known that if a random vector with given marginal distributions is comonotonic, it has th...
In actuarial mathematics we are often interested in distribution of a random vector. Sometimes these...
In this article, we study a new notion called upper comonotonicity, which is a generalization of the...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In an insurance context, one is often interested in the distribution function of a sum of random var...
It is well known that a random vector with given marginals is comonotonic if and only if it has the ...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In this contribution, the upper bounds for sums of dependent random variables X1 + X2 +···+Xn derive...
In an insurance context, one is often interested in the distribution function of a sum of random var...
Comonotonicity provides a convenient convex upper bound for a sum of random variables with arbitrary...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In the recent actuarial literature, several proofs have been given for the fact that if a random vec...
This article gives counterexamples for some conjectures about risk orders. One is that in risky situ...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...
It is well known that if a random vector with given marginal distributions is comonotonic, it has th...
It is well-known that if a random vector with given marginal distributions is comonotonic, it has th...
In actuarial mathematics we are often interested in distribution of a random vector. Sometimes these...
In this article, we study a new notion called upper comonotonicity, which is a generalization of the...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In an insurance context, one is often interested in the distribution function of a sum of random var...
It is well known that a random vector with given marginals is comonotonic if and only if it has the ...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In this contribution, the upper bounds for sums of dependent random variables X1 + X2 +···+Xn derive...
In an insurance context, one is often interested in the distribution function of a sum of random var...
Comonotonicity provides a convenient convex upper bound for a sum of random variables with arbitrary...
In an insurance context, one is often interested in the distribution function of a sum of random var...
In the recent actuarial literature, several proofs have been given for the fact that if a random vec...
This article gives counterexamples for some conjectures about risk orders. One is that in risky situ...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...