Add to ORKGWe are studying stationary random processes with conditional polynomial moments that allow a continuous path modification. Processes with continuous path modification, are important because they are relatively easy to simulate. One does not have to care about the distribution of their jumps which is always difficult to find. Among them are the Ornstein-Uhlenbeck process, the Gamma process, the process with Arcsin margins and the Theta function transition densities and others. We give a simple criterion for the stationary process to have a continuous path modification expressed in terms of skewness and excess kurtosis of the marginal distribution
Continuous state branching processes arise as rescaled limits of discrete branching ones. Those proc...
The thesis deals with Cox point processes driven by processes of Ornstein-Uhlenbeck (OU) type. Proce...
The aim of this work is to describe the conditional law of a multidimensional Markov process knowing...
We first define several words. A stochastic process {Yt: t ≥ 0} is • stationary if, for all t1 < ...
We consider a sequence of stochastic processes Xn on C[0, 1] converging weakly to X and call it poly...
AbstractThe desymmetrization technique which was successfully used in C(S) spaces is carried over to...
AbstractConsider a continuous time Markov chain with stationary transition probabilities. A function...
Is there a sufficient condition for continuity of sample paths of a random process? Or, is it at lea...
Markov processes which are reversible with either Gamma, Normal, Poisson or Negative Binomial statio...
This work is concerned with the study of stochastic processes which are continuous in probability, o...
AbstractMarkov processes which are reversible with either Gamma, Normal, Poisson or Negative Binomia...
AbstractThe aim of the present paper is to discuss three types of coincidence properties (EPSTA, CEP...
International audienceWe study discretizations of polynomial processes using finite state Markov pro...
This work links the conditional probability structure of Lancaster probabilities to a construction o...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
Continuous state branching processes arise as rescaled limits of discrete branching ones. Those proc...
The thesis deals with Cox point processes driven by processes of Ornstein-Uhlenbeck (OU) type. Proce...
The aim of this work is to describe the conditional law of a multidimensional Markov process knowing...
We first define several words. A stochastic process {Yt: t ≥ 0} is • stationary if, for all t1 < ...
We consider a sequence of stochastic processes Xn on C[0, 1] converging weakly to X and call it poly...
AbstractThe desymmetrization technique which was successfully used in C(S) spaces is carried over to...
AbstractConsider a continuous time Markov chain with stationary transition probabilities. A function...
Is there a sufficient condition for continuity of sample paths of a random process? Or, is it at lea...
Markov processes which are reversible with either Gamma, Normal, Poisson or Negative Binomial statio...
This work is concerned with the study of stochastic processes which are continuous in probability, o...
AbstractMarkov processes which are reversible with either Gamma, Normal, Poisson or Negative Binomia...
AbstractThe aim of the present paper is to discuss three types of coincidence properties (EPSTA, CEP...
International audienceWe study discretizations of polynomial processes using finite state Markov pro...
This work links the conditional probability structure of Lancaster probabilities to a construction o...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
Continuous state branching processes arise as rescaled limits of discrete branching ones. Those proc...
The thesis deals with Cox point processes driven by processes of Ornstein-Uhlenbeck (OU) type. Proce...
The aim of this work is to describe the conditional law of a multidimensional Markov process knowing...