Add to ORKGWe explore a reaction-dispersal mechanism for the generation of wave fronts which consists of a set of particles traveling with random velocities (chosen from arbitrary distributions) which experience an autocatalytic reaction. The differences found between this mechanism and approaches based on the continuous-time random walks, where the particles are assumed to perform discrete jumps from one position to another, are analyzed and discussed. A complete analytical treatment of our velocity model is achieved, which allows us to predict the constant speed of traveling fronts or their time dependence in case they are accelerated. Also, a general criterion to distinguish the situations of fronts with constant speed from those accelerated is pro...
Traveling fronts arising from reaction diffusion equations model various phenomena observed in physi...
In this paper, we study the existence and stability of travelling wave solutions of a kinetic reacti...
We consider numerically the front propagation in a three-dimensional, diffusion-controlled $A+B\to...
PACS. 87.10.+e – General theory and mathematical aspects. PACS. 05.40.-a – Fluctuation phenomena, ra...
A model of propagating reaction fronts is given for simple autocatalytic reactions and the stability...
Self-activation coupled to a transport mechanism results in traveling waves that describe polymeriza...
Self-activation coupled to a transport mechanism results in traveling waves that describe polymeriza...
We present a geometric approach to the problem of propagating fronts into an unstable state, valid f...
We present a geometric approach to the problem of propagating fronts into an unstable state, valid f...
The speed of traveling fronts for a two-dimensional model of a delayed reaction-dispersal process is...
The speed and width of front solutions to reaction-dispersal models are analyzed both analytically a...
7 pagesInvasion fronts in ecology are well studied but very few mathematical results concern the cas...
We consider a random walk model that takes into account the velocity distribution of random walkers....
We study a discrete model of the irreversible autocatalytic reaction A + B -> 2A in one dimension. L...
The speed of pulled fronts for parabolic fractional-reaction-dispersal equations is derived and anal...
Traveling fronts arising from reaction diffusion equations model various phenomena observed in physi...
In this paper, we study the existence and stability of travelling wave solutions of a kinetic reacti...
We consider numerically the front propagation in a three-dimensional, diffusion-controlled $A+B\to...
PACS. 87.10.+e – General theory and mathematical aspects. PACS. 05.40.-a – Fluctuation phenomena, ra...
A model of propagating reaction fronts is given for simple autocatalytic reactions and the stability...
Self-activation coupled to a transport mechanism results in traveling waves that describe polymeriza...
Self-activation coupled to a transport mechanism results in traveling waves that describe polymeriza...
We present a geometric approach to the problem of propagating fronts into an unstable state, valid f...
We present a geometric approach to the problem of propagating fronts into an unstable state, valid f...
The speed of traveling fronts for a two-dimensional model of a delayed reaction-dispersal process is...
The speed and width of front solutions to reaction-dispersal models are analyzed both analytically a...
7 pagesInvasion fronts in ecology are well studied but very few mathematical results concern the cas...
We consider a random walk model that takes into account the velocity distribution of random walkers....
We study a discrete model of the irreversible autocatalytic reaction A + B -> 2A in one dimension. L...
The speed of pulled fronts for parabolic fractional-reaction-dispersal equations is derived and anal...
Traveling fronts arising from reaction diffusion equations model various phenomena observed in physi...
In this paper, we study the existence and stability of travelling wave solutions of a kinetic reacti...
We consider numerically the front propagation in a three-dimensional, diffusion-controlled $A+B\to...