Law of large numbers for random walk with unbounded jumps and birth and death process with bounded jumps in random environment
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Publication:1661577
DOI10.1007/S10959-016-0731-3zbMath1412.60138arXiv1406.6222OpenAlexW2567191393MaRDI QIDQ1661577
Publication date: 16 August 2018
Published in: Journal of Theoretical Probability (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1406.6222
Strong limit theorems (60F15) Processes in random environments (60K37) Branching processes (Galton-Watson, birth-and-death, etc.) (60J80)
Cites Work
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- Ballistic regime for random walks in random environment with unbounded jumps and Knudsen billiards
- Random walks with unbounded jumps among random conductances. I: Uniform quenched CLT
- Recurrence and transience criteria for random walk in a random environment
- One-dimensional finite range random walk in random medium and invariant measure equation
- A zero or one law for one dimensional random walks in random environments
- Continuous-time Markov chains. An applications-oriented approach
- Random walks in random medium on \(\mathbb Z\) and Lyapunov spectrum
- Large deviations for martingales.
- Transient random walks on a strip in a random environment
- INTRINSIC BRANCHING STRUCTURE WITHIN (L-1) RANDOM WALK IN RANDOM ENVIRONMENT AND ITS APPLICATIONS
- Random walks with unbounded jumps among random conductances II: Conditional quenched CLT
- BRANCHING STRUCTURE FOR THE TRANSIENT (1, R)-RANDOM WALK IN RANDOM ENVIRONMENT AND ITS APPLICATIONS
- A continuous-time analogue of random walk in a random environment
- The method of averaging and walks in inhomogeneous environments
- Asymptotic behaviour for random walks in random environments
- Intrinsic Branching Structure within Random Walk on Z
- Probability
- Random walks in a random environment
- Recurrence and transience of random walks in random environments on a strip
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