AbstractFrom the predictable reduction of a marked point process to Poisson, we derive a similar reduction theorem for purely discontinuous martingales to processes with independent increments. Both results are then used to examine the existence of stochastic integrals with respect to stable Lévy processes, and to prove a variety of time change representations for such integrals. The Knight phenomenon, where possibly dependent but orthogonal processes become independent after individual time changes, emerges as a general principle
Examples of square integrable martingales adapted to processes with independent increments and ortho...
We consider time-changed Poisson processes, and derive the governing difference-differential equatio...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
From the predictable reduction of a marked point process to Poisson, we derive a similar reduction t...
Abstract. The paper is a contribution to the theory of martingales of processes whose sample paths a...
In this note we develop the theory of stochastic integration w.r.t. continuous local martingales usi...
The framework of the stochastic calculus of variations on the standard Wiener and Poisson space is e...
This is the published version, also available here: http://dx.doi.org/10.1214/aop/1176992378.Watanab...
AbstractThe only normal martingales which posses the chaotic representation property and the weaker ...
Abstract. It is shown that the class of conditionally Gaussian processes with inde-pendent increment...
AbstractAn arbitrary jump process is considered without any assumption about the jump times and allo...
AbstractUsing a perturbation of the rate of a Poisson process and an inverse time change, an integra...
Abstract. We study continuous additive functionals of zero quadratic variation of strong Markov cont...
Let {X(t),t∈ T} be a continuous homogeneous stochastic process with independent increments. A review...
We propose a theory of stochastic integration with respect to a sequence of semimartingales, start...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
We consider time-changed Poisson processes, and derive the governing difference-differential equatio...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...
From the predictable reduction of a marked point process to Poisson, we derive a similar reduction t...
Abstract. The paper is a contribution to the theory of martingales of processes whose sample paths a...
In this note we develop the theory of stochastic integration w.r.t. continuous local martingales usi...
The framework of the stochastic calculus of variations on the standard Wiener and Poisson space is e...
This is the published version, also available here: http://dx.doi.org/10.1214/aop/1176992378.Watanab...
AbstractThe only normal martingales which posses the chaotic representation property and the weaker ...
Abstract. It is shown that the class of conditionally Gaussian processes with inde-pendent increment...
AbstractAn arbitrary jump process is considered without any assumption about the jump times and allo...
AbstractUsing a perturbation of the rate of a Poisson process and an inverse time change, an integra...
Abstract. We study continuous additive functionals of zero quadratic variation of strong Markov cont...
Let {X(t),t∈ T} be a continuous homogeneous stochastic process with independent increments. A review...
We propose a theory of stochastic integration with respect to a sequence of semimartingales, start...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
We consider time-changed Poisson processes, and derive the governing difference-differential equatio...
The classical Ray-Knight theorems for Brownian motion determine the law of its local time process ei...