Operator geometric stable laws are the weak limits of operator normed and centered geometric random sums of independent, identically distributed random vectors. They generalize operator stable laws and geometric stable laws. In this work we characterize operator geometric stable distributions, their divisibility and domains of attraction, and present their application to finance. Operator geometric stable laws are useful for modeling financial portfolios where the cumulative price change vectors are sums of a random number of small random shocks with heavy tails, and each component has a different tail index
An introduction to the theory of stable distributions and their applications. It contains a modern o...
"By definition any stable distribution is semistable. For the converse relation we will show that ce...
AbstractThis paper is devoted to the theory and application of multidimensional stable distributions...
AbstractOperator geometric stable laws are the weak limits of operator normed and centered geometric...
this paper should provide a more useful and realistic class of distributions for portfolio modeling....
Abstract. Let (Xi) be a sequence of i.i.d. random variables, and let N be a geometric random variabl...
Stable laws and processes, geometric-stable laws, geometric domains of attraction,
AbstractBounds on the norming operators for distributions in the domain of attraction of an operator...
Abstract. Regular variation is an analytic condition on the tails of a probability distribution whic...
A sequence of independent, identically distributed random vectors X1, X2, X3,... is said to belong t...
In the present contribution, we consider the present value of a series of cash flows under stochasti...
AbstractOperator-stable laws and operator-semistable laws (introduced as limit distributions by M. S...
In this contribution, a basic theoretical approach to stable laws is described. There are mentioned ...
We introduce a concept of trimming in the context of q-probability and prove two limit theorems for ...
The aim of this article is to study geometric F-semistable and geometric F-stable distributions on t...
An introduction to the theory of stable distributions and their applications. It contains a modern o...
"By definition any stable distribution is semistable. For the converse relation we will show that ce...
AbstractThis paper is devoted to the theory and application of multidimensional stable distributions...
AbstractOperator geometric stable laws are the weak limits of operator normed and centered geometric...
this paper should provide a more useful and realistic class of distributions for portfolio modeling....
Abstract. Let (Xi) be a sequence of i.i.d. random variables, and let N be a geometric random variabl...
Stable laws and processes, geometric-stable laws, geometric domains of attraction,
AbstractBounds on the norming operators for distributions in the domain of attraction of an operator...
Abstract. Regular variation is an analytic condition on the tails of a probability distribution whic...
A sequence of independent, identically distributed random vectors X1, X2, X3,... is said to belong t...
In the present contribution, we consider the present value of a series of cash flows under stochasti...
AbstractOperator-stable laws and operator-semistable laws (introduced as limit distributions by M. S...
In this contribution, a basic theoretical approach to stable laws is described. There are mentioned ...
We introduce a concept of trimming in the context of q-probability and prove two limit theorems for ...
The aim of this article is to study geometric F-semistable and geometric F-stable distributions on t...
An introduction to the theory of stable distributions and their applications. It contains a modern o...
"By definition any stable distribution is semistable. For the converse relation we will show that ce...
AbstractThis paper is devoted to the theory and application of multidimensional stable distributions...