In the paper a model of a random walk on the d-dimensional lattice Z^d, d = 1, 2, . . . , in a dynamic environment which is i.i.d. in space-time is considered. The environment is described by a field which locally takes values in a finite set. We prove that: - If the stochastic term is small the central limit theorem holds almost surely, with the same parameters as for the random walk with averaged transition probabilities (averaged RW). - The leading term in the asymptotics for large t differs from the corresponding term for the averaged walk by a factor depending on the field “as seen from the final point”
none1noWe prove the annealed Central Limit Theorem for random walks in bistochastic random environme...
The Domb-Joyce model in one dimension is a transformed path measure for simple random walk on Zin wh...
In this paper we started by explaining what a Markov chain is. After this we defined some key concep...
We consider a model of random walk on Z^d, d≥ 2, in a dynamical random environment described by a fi...
In the current paper, the authors extend earlier results for a one-particle random walk. First they ...
We consider a class of two-fold stochastic random walks in a random environment. The transition prob...
We consider a general model of discrete-time random walk X-t on the lattice (nu), nu = 1,..., in a r...
We consider branching random walks in d-dimensional integer lattice with time–space i.i.d. offspring...
We prove a quenched central limit theorem for random walks with bounded increments in a randomly ...
We study a discrete time random walk in v in a dynamic random environment, when the evolution of the...
The author considers a discrete-time random walk {X t } t=0 ∞ on ℤ ν for small dimension ν=1,2 with ...
AbstractWe study a discrete time random walk in Zv in a dynamic random environment, when the evoluti...
We consider a non-nestling random walk in a product random environment. We assume an exponential mom...
We consider a general model of directed polymers on the lattice Z^d, d≥3, weakly coupled to a random...
We propose a discrete-time random walk on R(d), d = 1, 2,..., as a variant of recent models of rando...
none1noWe prove the annealed Central Limit Theorem for random walks in bistochastic random environme...
The Domb-Joyce model in one dimension is a transformed path measure for simple random walk on Zin wh...
In this paper we started by explaining what a Markov chain is. After this we defined some key concep...
We consider a model of random walk on Z^d, d≥ 2, in a dynamical random environment described by a fi...
In the current paper, the authors extend earlier results for a one-particle random walk. First they ...
We consider a class of two-fold stochastic random walks in a random environment. The transition prob...
We consider a general model of discrete-time random walk X-t on the lattice (nu), nu = 1,..., in a r...
We consider branching random walks in d-dimensional integer lattice with time–space i.i.d. offspring...
We prove a quenched central limit theorem for random walks with bounded increments in a randomly ...
We study a discrete time random walk in v in a dynamic random environment, when the evolution of the...
The author considers a discrete-time random walk {X t } t=0 ∞ on ℤ ν for small dimension ν=1,2 with ...
AbstractWe study a discrete time random walk in Zv in a dynamic random environment, when the evoluti...
We consider a non-nestling random walk in a product random environment. We assume an exponential mom...
We consider a general model of directed polymers on the lattice Z^d, d≥3, weakly coupled to a random...
We propose a discrete-time random walk on R(d), d = 1, 2,..., as a variant of recent models of rando...
none1noWe prove the annealed Central Limit Theorem for random walks in bistochastic random environme...
The Domb-Joyce model in one dimension is a transformed path measure for simple random walk on Zin wh...
In this paper we started by explaining what a Markov chain is. After this we defined some key concep...