Following Baurdoux and Kyprianou (2008) we consider the McKean stochastic game, a game version of the McKean optimal stopping problem (American put), driven by a spectrally negative Levy process. We improve their characterisation of a saddle point for this game when the driving process has a Gaussian component and negative jumps. In particular, we show that the exercise region of the minimiser consists of a singleton when the penalty parameter is larger than some threshold and 'thickens' to a full interval when the penalty parameter drops below this threshold. Expressions in terms of scale functions for the general case and in terms of polynomials for a specific jump diffusion case are provided
In recent years the study of Levy processes has received considerable attention in the literature. I...
The theory of Markov Decision Processes is the theory of controlled Markov chains. Its origins can b...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
Following Baurdoux and Kyprianou (2008) we consider the McKean stochastic game, a game version of th...
We consider the stochastic-game-analogue of McKean's optimal stopping problem when the underlying so...
Recently Kifer introduced the concept of an Israeli (or Game) option. That is a general American-typ...
In [15], the stochastic-game-analogue of Shepp and Shiryaev’s optimal stopping problem (cf. [23] and...
In Gapeev and Kuhn (2005) [8], the Dynkin game corresponding to perpetual convertible bonds was cons...
We consider the stochastic-game-analogue of McKean’s optimal stopping problem when the underlying so...
Lévy processes have stationary, independent increments. This seemingly unassuming (defining) propert...
In Gapeev and Kühn (2005) [8], the Dynkin game corresponding to perpetual convertible bonds was cons...
We introduce a general algorithm for the computation of the scale functions of a spectrally negative...
Exit problems for one-dimensional Lévy processes are easier when jumps only occur in one direction. ...
This thesis contains six papers on the topics of optimal stopping and stochastic games. Paper I ext...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
In recent years the study of Levy processes has received considerable attention in the literature. I...
The theory of Markov Decision Processes is the theory of controlled Markov chains. Its origins can b...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...
Following Baurdoux and Kyprianou (2008) we consider the McKean stochastic game, a game version of th...
We consider the stochastic-game-analogue of McKean's optimal stopping problem when the underlying so...
Recently Kifer introduced the concept of an Israeli (or Game) option. That is a general American-typ...
In [15], the stochastic-game-analogue of Shepp and Shiryaev’s optimal stopping problem (cf. [23] and...
In Gapeev and Kuhn (2005) [8], the Dynkin game corresponding to perpetual convertible bonds was cons...
We consider the stochastic-game-analogue of McKean’s optimal stopping problem when the underlying so...
Lévy processes have stationary, independent increments. This seemingly unassuming (defining) propert...
In Gapeev and Kühn (2005) [8], the Dynkin game corresponding to perpetual convertible bonds was cons...
We introduce a general algorithm for the computation of the scale functions of a spectrally negative...
Exit problems for one-dimensional Lévy processes are easier when jumps only occur in one direction. ...
This thesis contains six papers on the topics of optimal stopping and stochastic games. Paper I ext...
We consider spectrally negative Levy process and determine the joint Laplace trans form of the exit ...
In recent years the study of Levy processes has received considerable attention in the literature. I...
The theory of Markov Decision Processes is the theory of controlled Markov chains. Its origins can b...
Given a spectrally negative L\'evy process $X$ drifting to infinity, (inspired on the early ideas of...