Title of article
Characterizing a comonotonic random vector by the distribution of the sum of its components
Author/Authors
Cheung، نويسنده , , Ka Chun، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
7
From page
130
To page
136
Abstract
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 convex order, we show that comonotonicity can also be characterized by expected utility and distortion risk measures.
Keywords
Comonotonicity , Distortion risk measure , Distortion function , Convex order , Stop-loss order
Journal title
Insurance Mathematics and Economics
Serial Year
2010
Journal title
Insurance Mathematics and Economics
Record number
1544032
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