The distribution of the spine of a Fleming-Viot type process
From MaRDI portal
Publication:1615910
DOI10.1016/j.spa.2017.12.003zbMath1401.60060arXiv1507.06855OpenAlexW2962778437MaRDI QIDQ1615910
Krzysztof Burdzy, Mariusz Bieniek
Publication date: 31 October 2018
Published in: Stochastic Processes and their Applications (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1507.06855
Related Items (5)
Stochastic approximation of the paths of killed Markov processes conditioned on survival ⋮ Scaling limit of the Fleming-Viot multicolor process ⋮ Fleming-Viot couples live forever ⋮ The Fleming-Viot process with McKean-Vlasov dynamics ⋮ Stochastic fixed-point equation and local dependence measure
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Extinction of Fleming-Viot-type particle systems with strong drift
- Immortal particle for a catalytic branching process
- Non-extinction of a Fleming-Viot particle model
- Representation theorems for interacting Moran models, interacting Fisher-Wright diffusions and applications
- The measurability of hitting times
- Point processes and queues. Martingale dynamics
- Local extinction versus local exponential growth for spatial branching processes.
- Conceptual proofs of \(L\log L\) criteria for mean behavior of branching processes
- Tree-valued Fleming-Viot dynamics with mutation and selection
- Tree-valued resampling dynamics martingale problems and applications
- Change of measure in the lookdown particle system
- A countable representation of the Fleming-Viot measure-valued diffusion
- Quasi-Stationary Distributions
- Historical processes
- Two representations of a conditioned superprocess
- General approximation method for the distribution of Markov processes conditioned not to be killed
- On quasi-stationary distributions in absorbing continuous-time finite Markov chains
- Distances of Probability Measures and Random Variables
- A Fleming-Viot particle representation of the Dirichlet Laplacian
This page was built for publication: The distribution of the spine of a Fleming-Viot type process
