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Coalescing Brownian flows: a new approach - MaRDI portal

Coalescing Brownian flows: a new approach

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Publication:5962536

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DOI10.1214/14-AOP957zbMath1345.60111arXiv1307.4313MaRDI QIDQ5962536

Arnab Sen, Nathanaël Berestycki, Christophe Garban

Publication date: 12 February 2016

Published in: The Annals of Probability (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1307.4313

zbMATH Keywords

invariance principle coalescing random walks Sierpinski gasket Arratia flow Brownian web coalescing Brownian flows non-crossing property

Mathematics Subject Classification ID

Sums of independent random variables; random walks (60G50) Brownian motion (60J65) Interacting random processes; statistical mechanics type models; percolation theory (60K35) Dynamic continuum models (systems of particles, etc.) in time-dependent statistical mechanics (82C21) Functional limit theorems; invariance principles (60F17)

Related Items (17)

Directed, cylindric and radial Brownian webs ⋮ Jumps and coalescence in the continuum: a numerical study ⋮ Random dynamical systems generated by coalescing stochastic flows on ℝ ⋮ Stationary points in coalescing stochastic flows on \(\mathbb{R}\) ⋮ On conditioning Brownian particles to coalesce ⋮ Coalescing-fragmentating Wasserstein dynamics: particle approach ⋮ The Brownian Web as a random \(\mathbb{R} \)-tree ⋮ Two directed non-planar random networks and their scaling limits ⋮ Reversible coalescing-fragmentating Wasserstein dynamics on the real line ⋮ Orthogonal intertwiners for infinite particle systems in the continuum ⋮ Time-reversal of coalescing diffusive flows and weak convergence of localized disturbance flows ⋮ The 2D-directed spanning forest converges to the Brownian web ⋮ Algorithm for numerical solutions to the kinetic equation of a spatial population dynamics model with coalescence and repulsive jumps ⋮ Random jumps and coalescence in the continuum: evolution of states of an infinite particle system ⋮ A Construction of the Stable Web ⋮ Deposition, diffusion, and nucleation on an interval ⋮ Stochastic n-point D-bifurcations of stochastic Lévy flows and their complexity on finite spaces

Cites Work

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