Lévy processes, i.e. processes in continuous time with stationary and independent increments, are named after Paul Lévy, who made the connection with infinitely divisible distributions and described their structure. They form a flexible class of models, which have been applied to the study of storage processes, insurance risk, queues, turbulence, laser cooling, ... and of course finance, where the feature that they include examples having "heavy tails" is particularly important. Their sample path behaviour poses a variety of difficult and fascinating problems. Such problems, and also some related distributional problems, are addressed in detail in these notes that reflect the content of the course given by R. Doney in St. Flour in 2005
General aspects of the Fluctuation–Dissipation Relation (FDR), and Response Theory are considered. A...
54 pages, 13 figuresWe address the question of condensation and extremes for three classes of intima...
A fluctuation theory and, in particular, a theory of scale functions is developed for upwards skip-f...
Lévy processes, i.e. processes in continuous time with stationary and independent increments, are na...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
The book provides an extensive introduction to queueing models driven by Lévy-processes as well as a...
This paper presents a framework for numerical computations in fluctuation theory for Lévy processes....
This three-chapter volume concerns the distributions of certain functionals of Lévy processes. The f...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing t...
We propose coalescent mechanism of economic grow because of redistribution of external resources. It...
Motivated by the time behavior of the functional arising in the variational approach to the KPZ equa...
Volchenkov D, Krüger T, Blanchard P. Heavy-tailed Distributions In Some Stochastic Dynamical Models....
This chapter provides a brief survey of some of the most salient features of the theory. It presents...
A class of infinitely divisible processes includes not only well-known L´ vy processes, e but also a...
General aspects of the Fluctuation–Dissipation Relation (FDR), and Response Theory are considered. A...
54 pages, 13 figuresWe address the question of condensation and extremes for three classes of intima...
A fluctuation theory and, in particular, a theory of scale functions is developed for upwards skip-f...
Lévy processes, i.e. processes in continuous time with stationary and independent increments, are na...
Lévy processes are the natural continuous-time analogue of random walks and form a rich class of sto...
The book provides an extensive introduction to queueing models driven by Lévy-processes as well as a...
This paper presents a framework for numerical computations in fluctuation theory for Lévy processes....
This three-chapter volume concerns the distributions of certain functionals of Lévy processes. The f...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing th...
We obtain a new fluctuation identity for a general Lévy process giving a quintuple law describing t...
We propose coalescent mechanism of economic grow because of redistribution of external resources. It...
Motivated by the time behavior of the functional arising in the variational approach to the KPZ equa...
Volchenkov D, Krüger T, Blanchard P. Heavy-tailed Distributions In Some Stochastic Dynamical Models....
This chapter provides a brief survey of some of the most salient features of the theory. It presents...
A class of infinitely divisible processes includes not only well-known L´ vy processes, e but also a...
General aspects of the Fluctuation–Dissipation Relation (FDR), and Response Theory are considered. A...
54 pages, 13 figuresWe address the question of condensation and extremes for three classes of intima...
A fluctuation theory and, in particular, a theory of scale functions is developed for upwards skip-f...