Add to ORKGMany classical variables (statistics) are selfdecomposable. They admit the random integral representations via L\'evy processes. In this note are given formulas for their background driving distribution functions (BDDF). This may be used for a simulation of those variables. Among the examples discussed are: gamma variables, hyperbolic characteristic functions, Student t-distributions, stochastic area under planar Brownian motions, inverse Gaussian variable, logistic distributions, non-central chi-square, Bessel densities and Fisher z-distributions. Found representations might be of use in statistical applications
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
In this paper, we study some aspects on random analysis on the L\'eevy stochastic processes with mar...
AbstractThe concept of selfdecomposability has been generalized to that of α-selfdecomposability, α∈...
For the selfdecomposable distributions (random variables) we identified background driving probabili...
We prove that the convolution of a selfdecomposable distribution with its background driving law is ...
Many engineering and scientific applications necessitate the estimation of statistics of various fun...
AbstractWolfe (Stochastic Process. Appl. 12(3) (1982) 301) and Sato (Probab. Theory Related Fields 8...
The concept of selfdecomposability has been generalized to that of [alpha]-selfdecomposability, , by...
Master of ScienceDepartment of MathematicsMarianne KortenDistribution theory is an important tool in...
AbstractFredholm's integral equation theory and Mittag-Leffler expansion is used for getting charact...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We summarize the relations among three classes of laws: infinitely divisible, selfdecomposable and s...
Graduation date: 2013This dissertation examines properties and representations of several isotropic ...
AbstractLet (Ut,Vt) be a bivariate Lévy process, where Vt is a subordinator and Ut is a Lévy process...
This book deals with topics in the area of Lévy processes and infinitely divisible distributions suc...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
In this paper, we study some aspects on random analysis on the L\'eevy stochastic processes with mar...
AbstractThe concept of selfdecomposability has been generalized to that of α-selfdecomposability, α∈...
For the selfdecomposable distributions (random variables) we identified background driving probabili...
We prove that the convolution of a selfdecomposable distribution with its background driving law is ...
Many engineering and scientific applications necessitate the estimation of statistics of various fun...
AbstractWolfe (Stochastic Process. Appl. 12(3) (1982) 301) and Sato (Probab. Theory Related Fields 8...
The concept of selfdecomposability has been generalized to that of [alpha]-selfdecomposability, , by...
Master of ScienceDepartment of MathematicsMarianne KortenDistribution theory is an important tool in...
AbstractFredholm's integral equation theory and Mittag-Leffler expansion is used for getting charact...
This thesis is composed of five chapters, regarding several models for dependence in stochastic proc...
We summarize the relations among three classes of laws: infinitely divisible, selfdecomposable and s...
Graduation date: 2013This dissertation examines properties and representations of several isotropic ...
AbstractLet (Ut,Vt) be a bivariate Lévy process, where Vt is a subordinator and Ut is a Lévy process...
This book deals with topics in the area of Lévy processes and infinitely divisible distributions suc...
AbstractLet X1,X2,… be i.i.d. random variables with a continuous distribution function. Let R0=0, Rk...
In this paper, we study some aspects on random analysis on the L\'eevy stochastic processes with mar...
AbstractThe concept of selfdecomposability has been generalized to that of α-selfdecomposability, α∈...