In this paper we consider the problem of studying the gap between bounds of risk measures of sums of non-independent random variables. Owing to the choice of the context where to set the problem, namely that of distortion risk measures, we first deduce an explicit formula for the risk measure of a discrete risk by referring to its writing as sum of layers. Then, we examine the case of sums of discrete risks with identical distribution. Upper and lower bounds for risk measures of sums of risks are presented in the case of concave distortion functions. Finally, the attention is devoted to the analysis of the gap between risk measures of upper and lower bounds, with the aim of optimizing it
In the last few years the properties of risk measures that can be considered as suiting 'best practi...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...
In this paper, explicit lower and upper bounds on the value-at-risk (VaR) for the sum of possibly de...
In this paper we consider the problem of studying the gap between bounds of risk measures of sums of...
In this paper we consider the problem of studying the gap between bounds of risk measures for sums o...
In this paper we consider the problem of determining approximations for distortion risk measures of ...
In this paper we consider the problem of determining approximations for distortion risk measures of ...
In quantitative risk management, it is important and challenging to find sharp bounds for the distri...
Sharp tail bounds for the sum of d random variables with given marginal distributions and arbitrary ...
In this paper we examine and summarize properties of several well-known risk measures that can be us...
In this paper we examine and summarize properties of several well-known risk mea-sures that can be u...
Abstract: This paper introduces two techniques for computing bounds for several quantile-based risk ...
We describe several analytical and numerical procedures to obtain bounds on the distribution functio...
In this contribution, the upper bounds for sums of dependent random variables X1 + X2 +···+Xn derive...
In this paper we examine and summarize properties of several well-known risk measures that can be us...
In the last few years the properties of risk measures that can be considered as suiting 'best practi...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...
In this paper, explicit lower and upper bounds on the value-at-risk (VaR) for the sum of possibly de...
In this paper we consider the problem of studying the gap between bounds of risk measures of sums of...
In this paper we consider the problem of studying the gap between bounds of risk measures for sums o...
In this paper we consider the problem of determining approximations for distortion risk measures of ...
In this paper we consider the problem of determining approximations for distortion risk measures of ...
In quantitative risk management, it is important and challenging to find sharp bounds for the distri...
Sharp tail bounds for the sum of d random variables with given marginal distributions and arbitrary ...
In this paper we examine and summarize properties of several well-known risk measures that can be us...
In this paper we examine and summarize properties of several well-known risk mea-sures that can be u...
Abstract: This paper introduces two techniques for computing bounds for several quantile-based risk ...
We describe several analytical and numerical procedures to obtain bounds on the distribution functio...
In this contribution, the upper bounds for sums of dependent random variables X1 + X2 +···+Xn derive...
In this paper we examine and summarize properties of several well-known risk measures that can be us...
In the last few years the properties of risk measures that can be considered as suiting 'best practi...
In this contribution, the upper bounds for sums of dependent random variables X-1 + X-2 + ... + X-n ...
In this paper, explicit lower and upper bounds on the value-at-risk (VaR) for the sum of possibly de...