We consider a strong Markov process with killing and prove an approximation method for the distribution of the process conditioned not to be killed when it is observed. The method is based on a Fleming−Viot type particle system with rebirths, whose particles evolve as independent copies of the original strong Markov process and jump onto each others instead of being killed. Our only assumption is that the number of rebirths of the Fleming−Viot type system doesn’t explode in finite time almost surely and that the survival probability of the original process remains positive in finite time. The approximation method generalizes previous results and comes with a s...
This paper contains a survey of results related to quasi-stationary distributions, which arise in th...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
Abstract. The Karlin-McGregor representation for the transition probabili-ties of a birth-death proc...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
33 pages, revision of the paper formerly entitled "Interacting particle processes and approximation ...
38 pagesFleming-Viot type particle systems represent a classical way to approximate the distribution...
International audienceFleming–Viot type particle systems represent a classical way to approximate th...
The new version provides an original Lyapunov-type criterion for the $\xi_1$-positive recurrence of ...
39 pages, 3 figuresThis article presents a variant of Fleming-Viot particle systems, which are a sta...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
Preprint ArxivThe distribution of a Markov process with killing, conditioned to be still alive at a ...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
We prove the ergodicity and the convergence of a Fleming-Viot type particle system to the minimal qu...
This paper is concerned with the circumstances under which a discrete-time absorbing Markov chain ha...
AbstractConsider a sequence of independent Brownian motions in Rd whose initial positions are distri...
This paper contains a survey of results related to quasi-stationary distributions, which arise in th...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
Abstract. The Karlin-McGregor representation for the transition probabili-ties of a birth-death proc...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
33 pages, revision of the paper formerly entitled "Interacting particle processes and approximation ...
38 pagesFleming-Viot type particle systems represent a classical way to approximate the distribution...
International audienceFleming–Viot type particle systems represent a classical way to approximate th...
The new version provides an original Lyapunov-type criterion for the $\xi_1$-positive recurrence of ...
39 pages, 3 figuresThis article presents a variant of Fleming-Viot particle systems, which are a sta...
We consider birth-death processes on the nonnegative integers, where $\{1,2,...\}$ is an irreducible...
Preprint ArxivThe distribution of a Markov process with killing, conditioned to be still alive at a ...
AbstractWe consider birth–death processes on the nonnegative integers, where {1,2,…} is an irreducib...
We prove the ergodicity and the convergence of a Fleming-Viot type particle system to the minimal qu...
This paper is concerned with the circumstances under which a discrete-time absorbing Markov chain ha...
AbstractConsider a sequence of independent Brownian motions in Rd whose initial positions are distri...
This paper contains a survey of results related to quasi-stationary distributions, which arise in th...
This article studies the quasi-stationary behaviour of multidimensional birth and death processes, m...
Abstract. The Karlin-McGregor representation for the transition probabili-ties of a birth-death proc...