Add to ORKGA diffusion equation including source terms, representing randomly distributed sources and sinks is considered. For quasilinear growth rates the eigenvalue problem is equivalent to that of the quantum mechanical motion of electrons in random fields. Correspondingly there exist localized and extended ensity distributions dependent on the statistics of the random field and on the dimension of the space. Besides applications in physics (nonequilibrium processes in pumped disordered solid materials) a new evolution model is discussed which considers evolution as hill climbing in a random landscape
AbstractSpatially homogeneous random evolutions arise in the study of the growth of a population in ...
The spectacular success of probability theory within the hard sciences is well known since its pivot...
This thesis explores the effects of fluctuations and discreteness on the growth of physical systems ...
This book presents, in an accessible and self-consistent way, the theory of diffusion in random velo...
AbstractConsider evolution of density of a mass or a population, geographically situated in a compac...
In this thesis we study several problems from biophysics and astrophysics, which can be all be descr...
This paper deals with homogenization of diffusion processes in a locally stationary random environme...
Fluctuating parameters appear in a variety of physical systems and phenomena. They typically come ei...
We consider a class of stochastic evolution models for particles diffusing on a lattice and interact...
International audienceWe investigate the evolution of a population of non-interacting particles whic...
AbstractThe continuity equation with the random velocity field in thed-dimensional space is studied ...
Evolution of interacting particles in a random medium is studied by treating their spatial distribut...
A reaction-diffusion model is presented in which spatial structure is maintained by means of a diffu...
The growth of a population in a randomly varying environment is modeled by replacing the Malthusian ...
This thesis is the report of a study of several different problems in statistical physics. The first...
AbstractSpatially homogeneous random evolutions arise in the study of the growth of a population in ...
The spectacular success of probability theory within the hard sciences is well known since its pivot...
This thesis explores the effects of fluctuations and discreteness on the growth of physical systems ...
This book presents, in an accessible and self-consistent way, the theory of diffusion in random velo...
AbstractConsider evolution of density of a mass or a population, geographically situated in a compac...
In this thesis we study several problems from biophysics and astrophysics, which can be all be descr...
This paper deals with homogenization of diffusion processes in a locally stationary random environme...
Fluctuating parameters appear in a variety of physical systems and phenomena. They typically come ei...
We consider a class of stochastic evolution models for particles diffusing on a lattice and interact...
International audienceWe investigate the evolution of a population of non-interacting particles whic...
AbstractThe continuity equation with the random velocity field in thed-dimensional space is studied ...
Evolution of interacting particles in a random medium is studied by treating their spatial distribut...
A reaction-diffusion model is presented in which spatial structure is maintained by means of a diffu...
The growth of a population in a randomly varying environment is modeled by replacing the Malthusian ...
This thesis is the report of a study of several different problems in statistical physics. The first...
AbstractSpatially homogeneous random evolutions arise in the study of the growth of a population in ...
The spectacular success of probability theory within the hard sciences is well known since its pivot...
This thesis explores the effects of fluctuations and discreteness on the growth of physical systems ...