Add to ORKGAbstract. Recently it has been shown that when an equation that allows so-called pulled fronts in the mean-field limit is modelled with a stochastic model with a finite number N of particles per correlation volume, the convergence to the speed v for N ∞ is extremely slow — going only as ln 2 N. However, this convergence is seen only for very high values of N, while there can be significant deviations from it when N is not too large. Pulled fronts are fronts that propagate into an unstable state, and the asymptotic front speed is equal to the linear spreading speed v of infinitesimal perturbations around the unstable state. In this paper, we consider front propagation in a simple stochastic lattice model. The microscopic picture of the fr...
Depending on the nonlinear equation of motion and on the initial conditions, different regions of a ...
We consider a two type (red and blue or R and B) particle population that evolves on the d-dimension...
The problem of asymptotic features of front propagation in stirred media is addressed for laminar an...
Recently, it has been shown that when an equation that allows the so-called pulled fronts in the mea...
Fronts, propagating into an unstable state phi=0, whose asymptotic speed v(as) is equal to the linea...
We study two-dimensional (2D) fronts propagating up a comoving reaction rate gradient in finite numb...
We study a directed flipping process that underlies the performance of the random edge simplex algor...
Propagating fronts arising from bistable reaction-diffusion equations are a purely deterministic eff...
Traveling fronts arising from reaction diffusion equations model various phenomena observed in physi...
We analyse the effects of extrinsic multiplicative noise on front propagation in a scalar neural fie...
By analytical methods we study the large time properties of the solution of a simple one-dimensional...
We study front propagation problems for forced mean curvature flows and their phase field variants t...
We focus on the discrete-time stochastic model studied by E. Brunet and B. Derrida in 2004: a fixed ...
We analyze the dynamics of pattern forming fronts which propagate into an unstable state, and whose ...
We consider a system of N particles with a stochastic dynamics introduced by Brunet and Derrida. The...
Depending on the nonlinear equation of motion and on the initial conditions, different regions of a ...
We consider a two type (red and blue or R and B) particle population that evolves on the d-dimension...
The problem of asymptotic features of front propagation in stirred media is addressed for laminar an...
Recently, it has been shown that when an equation that allows the so-called pulled fronts in the mea...
Fronts, propagating into an unstable state phi=0, whose asymptotic speed v(as) is equal to the linea...
We study two-dimensional (2D) fronts propagating up a comoving reaction rate gradient in finite numb...
We study a directed flipping process that underlies the performance of the random edge simplex algor...
Propagating fronts arising from bistable reaction-diffusion equations are a purely deterministic eff...
Traveling fronts arising from reaction diffusion equations model various phenomena observed in physi...
We analyse the effects of extrinsic multiplicative noise on front propagation in a scalar neural fie...
By analytical methods we study the large time properties of the solution of a simple one-dimensional...
We study front propagation problems for forced mean curvature flows and their phase field variants t...
We focus on the discrete-time stochastic model studied by E. Brunet and B. Derrida in 2004: a fixed ...
We analyze the dynamics of pattern forming fronts which propagate into an unstable state, and whose ...
We consider a system of N particles with a stochastic dynamics introduced by Brunet and Derrida. The...
Depending on the nonlinear equation of motion and on the initial conditions, different regions of a ...
We consider a two type (red and blue or R and B) particle population that evolves on the d-dimension...
The problem of asymptotic features of front propagation in stirred media is addressed for laminar an...