A Ciesielski-Taylor type identity for positive self-similar Markov processes
نویسنده
چکیده
The aim of this note is to give a straightforward proof of a general version of the Ciesielski-Taylor identity for positive self-similar Markov processes of the spectrally negative type which umbrellas all previously known Ciesielski-Taylor identities within the latter class. The approach makes use of three fundamental features. Firstly a new transformation which maps a subset of the family of Laplace exponents of spectrally negative Lévy processes into itself. Secondly some classical features of fluctuation theory for spectrally negative Lévy processes (see eg. [15]) as well as more recent fluctuation identities for positive self-similar Markov processes found in Patie [19].
منابع مشابه
Symmetric Stable Processes and Fubini ' s Theorem
In the first half of this paper, a Fubini type identity in law which was previously developed by two of the authors between quadratic functionals of Brownian motion is extended in two directions: an analogue of this identity in law holds when Brownian motion is replaced by a symmetric stable process of any order a E (0,2), provided the function: x -* x2 is replaced by: x -> I x la; such Fubini ...
متن کاملEXACT AND ASYMPTOTIC n - TUPLE LAWS AT FIRST AND LAST PASSAGE
Understanding the space–time features of how a Lévy process crosses a constant barrier for the first time, and indeed the last time, is a problem which is central to many models in applied probability such as queueing theory, financial and actuarial mathematics, optimal stopping problems, the theory of branching processes, to name but a few. In Doney and Kyprianou [Ann. Appl. Probab. 16 (2006) ...
متن کاملtype SDE approach to positive self - Similar Markov processes ∗
We present a new approach to positive self-similar Markov processes (pssMps) by reformulating Lamperti’s transformation via jump type SDEs. As applications, we give direct constructions of pssMps (re)started continuously at zero if the Lamperti transformed Lévy process is spectrally negative. Our paper can be seen as a continuation of similar studies for continuous state branching processes.
متن کاملSome Explicit Identities Associated with Positive Self-similar Markov Processes
We consider some special classes of Lévy processes with no gaussian component whose Lévy measure is of the type π(dx) = e γx ν(e x − 1) dx, where ν is the density of the stable Lévy measure and γ is a positive parameter which depends on its characteristics. These processes were introduced in [10] as the underlying Lévy processes in the Lamperti representation of conditioned stable Lévy processe...
متن کاملSome applications of duality for Lévy processes in a half-line
The central result of this paper is an analytic duality relation for real-valued Lévy processes killed upon exiting a half-line. By Nagasawa’s theorem, this yields a remarkable time-reversal identity involving the Lévy process conditioned to stay positive. As examples of applications, we construct a version of the Lévy process indexed by the entire real line and started from −∞ which enjoys a n...
متن کامل