Add to ORKG39 pages, 3 figuresThis article presents a variant of Fleming-Viot particle systems, which are a standard way to approximate the law of a Markov process with killing as well as related quantities. Classical Fleming-Viot particle systems proceed by simulating $N$ trajectories, or particles, according to the dynamics of the underlying process, until one of them is killed. At this killing time, the particle is instantaneously branched on one of the $(N-1)$ other ones, and so on until a fixed and finite final time $T$. In our variant, we propose to wait until $K$ particles are killed and then rebranch them independently on the $(N-K)$ alive ones. Specifically, we focus our attention on the large population limit and the regime where $K/N$ has a...
This is an introduction to the volume dedicated to the meeting Interacting Random Systems coordinate...
International audienceWe study the Fleming-Viot particle process formed by N interacting continuous-...
The aim of this paper is to study the large population limit of a binary branching particle system w...
39 pages, 3 figuresInternational audienceThis article presents a variant of Fleming-Viot particle sy...
Preprint ArxivThe distribution of a Markov process with killing, conditioned to be still alive at a ...
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...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
The purpose of this paper is to extend the investigation of the Fleming-Viot process in discrete spa...
33 pages, revision of the paper formerly entitled "Interacting particle processes and approximation ...
We consider a strong Markov process with killing and prove an approximation method for the...
11 pages, changed title, added typos, references removedConsider a continuous time Markov chain with...
Let $\Lambda$ be a finite measure on the unit interval. A $\Lambda$-Fleming-Viot process is a proba...
We consider the $N$-particle Fleming-Viot process associated to a normally reflected diffusion with ...
Let $Lambda$ be a finite measure on the unit interval. A $Lambda$-Fleming-Viot process is a probabil...
This is an introduction to the volume dedicated to the meeting Interacting Random Systems coordinate...
International audienceWe study the Fleming-Viot particle process formed by N interacting continuous-...
The aim of this paper is to study the large population limit of a binary branching particle system w...
39 pages, 3 figuresInternational audienceThis article presents a variant of Fleming-Viot particle sy...
Preprint ArxivThe distribution of a Markov process with killing, conditioned to be still alive at a ...
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...
We consider a strong Markov process with killing and prove an approximation method for the distribut...
The purpose of this paper is to extend the investigation of the Fleming-Viot process in discrete spa...
33 pages, revision of the paper formerly entitled "Interacting particle processes and approximation ...
We consider a strong Markov process with killing and prove an approximation method for the...
11 pages, changed title, added typos, references removedConsider a continuous time Markov chain with...
Let $\Lambda$ be a finite measure on the unit interval. A $\Lambda$-Fleming-Viot process is a proba...
We consider the $N$-particle Fleming-Viot process associated to a normally reflected diffusion with ...
Let $Lambda$ be a finite measure on the unit interval. A $Lambda$-Fleming-Viot process is a probabil...
This is an introduction to the volume dedicated to the meeting Interacting Random Systems coordinate...
International audienceWe study the Fleming-Viot particle process formed by N interacting continuous-...
The aim of this paper is to study the large population limit of a binary branching particle system w...