Add to ORKGWe consider a model of interface growth in two dimensions, given by a height function on the sites of the one--dimensional integer lattice. According to the discrete time update rule, the height above the site $x$ increases to the height above $x-1$, if the latter height is larger; otherwise the height above $x$ increases by 1 with probability $p_x$. We assume that $p_x$ are chosen independently at random with a common distribution $F$, and that the initial state is such that the origin is far above the other sites. We explicitly identify the asymptotic shape and prove that, in the pure regime, the fluctuations about that shape, normalized by the square root of time, are asympto...
A model is proposed for the evolution of the profile of a growing interface. The deterministic growt...
We study stability of a growth process generated by sequential adsorption of particles on a one-dime...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We consider a model of interface growth in two dimensions, given by a height function on th...
We continue to study a model of disordered interface growth in two dimensions. The interfac...
We describe a class of exactly solvable random growth models of one and two-dimensional interfaces. ...
We construct a family of stochastic growth models in 2+1 dimen-sions, that belong to the anisotropic...
The random average process is a randomly evolving d-dimensional surface whose heights are updated by...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We study the dynamics of growth at the interface level for two different kinetic models. Both of the...
We study time-dependent correlation functions in a family of one-dimensional biased stochastic latti...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We introduce a class of one-dimensional discrete space-discrete time stochastic growth mode...
PACS 02.50.-r – Probability theory, stochastic processes, and statistics PACS 75.10.Nr – Spin-glass ...
An unbounded one-dimensional solid-on-solid model with integer heights is studied. Unbounded here me...
A model is proposed for the evolution of the profile of a growing interface. The deterministic growt...
We study stability of a growth process generated by sequential adsorption of particles on a one-dime...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We consider a model of interface growth in two dimensions, given by a height function on th...
We continue to study a model of disordered interface growth in two dimensions. The interfac...
We describe a class of exactly solvable random growth models of one and two-dimensional interfaces. ...
We construct a family of stochastic growth models in 2+1 dimen-sions, that belong to the anisotropic...
The random average process is a randomly evolving d-dimensional surface whose heights are updated by...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We study the dynamics of growth at the interface level for two different kinetic models. Both of the...
We study time-dependent correlation functions in a family of one-dimensional biased stochastic latti...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...
We introduce a class of one-dimensional discrete space-discrete time stochastic growth mode...
PACS 02.50.-r – Probability theory, stochastic processes, and statistics PACS 75.10.Nr – Spin-glass ...
An unbounded one-dimensional solid-on-solid model with integer heights is studied. Unbounded here me...
A model is proposed for the evolution of the profile of a growing interface. The deterministic growt...
We study stability of a growth process generated by sequential adsorption of particles on a one-dime...
We construct a family of stochastic growth models in $2+1$ dimensions, that belong to the anisotropi...