Linear and superlinear spread for stochastic combustion growth process
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Publication:6616031
DOI10.1214/23-aihp1395MaRDI QIDQ6616031
Viktor Bezborodov, Tyll Krueger
Publication date: 8 October 2024
Published in: Annales de l'Institut Henri Poincaré. Probabilités et Statistiques (Search for Journal in Brave)
Sums of independent random variables; random walks (60G50) Interacting random processes; statistical mechanics type models; percolation theory (60K35) Markov chains (discrete-time Markov processes on discrete state spaces) (60J10)
Cites Work
- Title not available (Why is that?)
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- From transience to recurrence with Poisson tree frogs
- Fluctuations of the front in a one-dimensional model for the spread of an infection
- On a one-dimensional model of infection spreading
- Fluctuations of the front in a stochastic combustion model
- Large deviations of the front in a one-dimensional model of \(X+Y\rightarrow 2X\)
- Maxima of branching random walks vs. independent random walks
- Greedy lattice animals. I: Upper bounds
- Greedy lattice animals. II: Linear growth
- Recurrence and transience for the frog model on trees
- Recurrence and transience of contractive autoregressive processes and related Markov chains
- Linear growth for greedy lattice animals.
- The maximum of a branching random walk with semiexponential increments
- The shape theorem for the frog model
- Asymptotic behavior of a stochastic combustion growth process
- The growth and spread of the general branching random walk
- Recurrence and transience of frogs with drift on \(\mathbb{Z}^d\)
- Asymptotic behavior of the Brownian frog model
- On the minimal drift for recurrence in the frog model on \(d\)-ary trees
- On an epidemic model on finite graphs
- Continuity for the asymptotic shape in the frog model with random initial configurations
- Spread of an infection on the zero range process
- Non-triviality in a totally asymmetric one-dimensional Boolean percolation model on a half-line
- The continuous-time frog model can spread arbitrarily fast
- Boolean percolation on doubling graphs
- First passage time of the frog model has a sublinear variance
- Multi-particle diffusion limited aggregation
- A zero-one law for recurrence and transience of frog processes
- The spread of a rumor or infection in a moving population
- Continuous first-passage percolation and continuous greedy paths model: Linear growth
- A shape theorem for the spread of an infection
- The frog model with drift on \(\mathbb{R} \)
- Spatial growth processes with long range dispersion: microscopics, mesoscopics and discrepancy in spread rate
- Asymptotic Shape and Propagation of Fronts for Growth Models in Dynamic Random Environment
- 50 Years of First-Passage Percolation
- ON SUMS OF INDEPENDENT RANDOM VARIABLES WITH INFINITE MOMENTS AND „FAIR” GAMES
- RANDOM DYNAMICAL SYSTEMS ON ORDERED TOPOLOGICAL SPACES
- Fluctuations of the front in a one dimensional model of $X+Y\to 2X$
- Contact processes in several dimensions
- Maxima of branching random walks
- Asymptotic shape in a continuum growth model
- Continuum Percolation
- Asymptotic shape and the speed of propagation of continuous-time continuous-space birth processes
- On the range of the transient frog model on ℤ
- Random Networks for Communication
- Maximal branching processes and ‘long-range percolation’
- Coexistence of lazy frogs on
- Probability
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