Abstract We study the tail behavior of the distribution of certain subadditive functionals acting on the sample paths of Levy processes The functionals we consider have roughly speaking the following property only the points of the process that lie above a certain curve contribute to the value of the functional Our assumptions will make sure that the process ends up eventually below the curve Our results apply to ruin probabilities distributions of sojourn times over curves last hitting times and other functional
A description of the weak and strong limiting behaviour of weighted uniform tail empirical and tail ...
For a given Levy process X = ( X t ) t 2 R + and for xed s 2 R + [f1g and t 2 R + we analyse the fut...
Motivated by recent studies in financial mathematics and other areas, we investigate the exponential...
AbstractFor symmetric stable processes with negative drift and continuous or discrete time the proba...
AbstractWe investigate the tail behavior of the distributions of subadditive functionals of the samp...
We study tail probabilities of suprema of L\'evy processes with subexponential or exponential margin...
Distributions of subadditive functionals of sample paths of infinitely divisible processe
We study tail probabilities of suprema of L\\u27evy processes with subexponential or exponential mar...
AbstractWe study tail probabilities of the suprema of Lévy processes with subexponential or exponent...
Abstract: Motivated by recent studies in financial mathematics and other areas, we investigate the e...
We study tail probabilities of superexponential infinite divisible distributions as well as tail pro...
This chapter provides a brief survey of some of the most salient features of the theory. It presents...
A recent result of Bertoin, Doney and Maller (Ann. Prob., 2007) gives an integral condition to chara...
Abstract: It is shown that the tail behavior of the function of nonnegative random variables can be ...
We provide exact large-time equivalents of the density and upper tail distributions of the exponenti...
A description of the weak and strong limiting behaviour of weighted uniform tail empirical and tail ...
For a given Levy process X = ( X t ) t 2 R + and for xed s 2 R + [f1g and t 2 R + we analyse the fut...
Motivated by recent studies in financial mathematics and other areas, we investigate the exponential...
AbstractFor symmetric stable processes with negative drift and continuous or discrete time the proba...
AbstractWe investigate the tail behavior of the distributions of subadditive functionals of the samp...
We study tail probabilities of suprema of L\'evy processes with subexponential or exponential margin...
Distributions of subadditive functionals of sample paths of infinitely divisible processe
We study tail probabilities of suprema of L\\u27evy processes with subexponential or exponential mar...
AbstractWe study tail probabilities of the suprema of Lévy processes with subexponential or exponent...
Abstract: Motivated by recent studies in financial mathematics and other areas, we investigate the e...
We study tail probabilities of superexponential infinite divisible distributions as well as tail pro...
This chapter provides a brief survey of some of the most salient features of the theory. It presents...
A recent result of Bertoin, Doney and Maller (Ann. Prob., 2007) gives an integral condition to chara...
Abstract: It is shown that the tail behavior of the function of nonnegative random variables can be ...
We provide exact large-time equivalents of the density and upper tail distributions of the exponenti...
A description of the weak and strong limiting behaviour of weighted uniform tail empirical and tail ...
For a given Levy process X = ( X t ) t 2 R + and for xed s 2 R + [f1g and t 2 R + we analyse the fut...
Motivated by recent studies in financial mathematics and other areas, we investigate the exponential...