We present an explicit solution to the Skorokhod embedding problem for spectrally negative L\'evy processes. Given a process $X$ and a target measure $\mu$ satisfying an explicit admissibility condition we define functions $\f_\pm$ such that the stopping time $T = \inf\{t>0: X_t \in \{-\f_-(L_t), \f_+(L_t)\}\}$ induces $X_T\sim \mu$. We also treat versions of $T$ which take into account the sign of the excursion straddling time $t$. We prove that our stopping times are minimal and we describe criteria under which they are integrable. We compare our solution with the one proposed by Bertoin and Le Jan (1992) and we compute explicitly their general quantities in our setup. Our method relies on some new explicit calculations relating scale f...
We consider the stochastic-game-analogue of McKean’s optimal stopping problem when the underlying so...
Let X be a Levy process and V the reflection at boundaries 0 and b > 0. A number of properties of V ...
Previous authors have considered optimal stopping problems driven by the running maximum of a spectr...
We develop an explicit non-randomized solution to the Skorokhod embedding problem in an abstract set...
Lévy processes have stationary, independent increments. This seemingly unassuming (defining) propert...
A general methodology allowing to solve the Skorokhod stopping problem for positive functionals of B...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
AbstractA general methodology allowing to solve the Skorokhod stopping problem for positive function...
Path decomposition is performed to characterize the law of the pre-/post-supremum, post-infimum and ...
This article is about right inverses of Lévy processes as first introduced by Evans in the symmetric...
The classical Skorokhod embedding problem for a Brownian motion W asks to find a stopping time τ so ...
ABSTRACT. This paper is concerned with a class of infinite-time horizon optimal stopping problems fo...
We discuss a new strategy to solve the Skorokhod problem which is generic in the sense that it can b...
In this note we give, for a spectrally negative Levy process, a compact formula for the Parisian rui...
We consider here an n-marginal Skorokhod embedding problem (SEP). We construct an explicit solution ...
We consider the stochastic-game-analogue of McKean’s optimal stopping problem when the underlying so...
Let X be a Levy process and V the reflection at boundaries 0 and b > 0. A number of properties of V ...
Previous authors have considered optimal stopping problems driven by the running maximum of a spectr...
We develop an explicit non-randomized solution to the Skorokhod embedding problem in an abstract set...
Lévy processes have stationary, independent increments. This seemingly unassuming (defining) propert...
A general methodology allowing to solve the Skorokhod stopping problem for positive functionals of B...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
AbstractA general methodology allowing to solve the Skorokhod stopping problem for positive function...
Path decomposition is performed to characterize the law of the pre-/post-supremum, post-infimum and ...
This article is about right inverses of Lévy processes as first introduced by Evans in the symmetric...
The classical Skorokhod embedding problem for a Brownian motion W asks to find a stopping time τ so ...
ABSTRACT. This paper is concerned with a class of infinite-time horizon optimal stopping problems fo...
We discuss a new strategy to solve the Skorokhod problem which is generic in the sense that it can b...
In this note we give, for a spectrally negative Levy process, a compact formula for the Parisian rui...
We consider here an n-marginal Skorokhod embedding problem (SEP). We construct an explicit solution ...
We consider the stochastic-game-analogue of McKean’s optimal stopping problem when the underlying so...
Let X be a Levy process and V the reflection at boundaries 0 and b > 0. A number of properties of V ...
Previous authors have considered optimal stopping problems driven by the running maximum of a spectr...