AbstractConsider the stochastic partial differential equation [formula] where Ẇ =Ẇ(t, x) is two-parameter while noise. Assume that u0 is a continuous function taking values in [0, 1] such that for some constant a > 0, we have (C1) u0(x) = 1 for x < −a.(C2) u0(x) = 0 for x > a. Let the wavefront b(t) = sup{x ∈ R: u(t, x) > 0}. We show that for ϵ small enough and with probability 1, • limt→∞b(t)/t exists and lies in (0, ∞). This limit depends only on ϵ. •The law of v(t, x) ≡ u(t, b(t) + x) tends toward a stationary limit as t → ∞. We also analyze the length of the region [a(t), b(t)], which is the smallest closed interval containing the points x at which 0 < u(t, x) < 1. We show that the length of this region tends toward a stationary distrib...
AbstractWe consider a stochastic Korteweg–de Vries equation forced by a random term of white noise t...
In this thesis, we develop a stochastic calculus for the space-time Lévy white noise introduced in [...
Consider the semilinear heat equation partial derivative(t)u = partial derivative(2)(x)u + lambda si...
AbstractConsider the stochastic partial differential equation [formula] where Ẇ =Ẇ(t, x) is two-para...
We consider the one-dimensional KPP-equation driven by space-time white noise and extend the constru...
Let me begin with a disclaimer. This is a report on work in progress, so not everything is in its na...
In this paper we study the random approximate travelling wave solutions of the stochastic KPP equati...
In this work we present examples of the effects of noise on the solution of a partial differential e...
We study the existence and propagation of approximate travelling waves of generalized KPP equations ...
In this thesis we aim to show the existence of a stationary travelling wave of a generalised stocha...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
This dissertation is devoted to the study of some aspects of the theory of stochastic partial differ...
Inspired by applications, we consider reaction-diffusion equations on R that are stochastically forc...
5 pagesWe calculate exactly the velocity and diffusion constant of a microscopic stochastic model of...
AbstractWe consider a stochastic Korteweg–de Vries equation forced by a random term of white noise t...
In this thesis, we develop a stochastic calculus for the space-time Lévy white noise introduced in [...
Consider the semilinear heat equation partial derivative(t)u = partial derivative(2)(x)u + lambda si...
AbstractConsider the stochastic partial differential equation [formula] where Ẇ =Ẇ(t, x) is two-para...
We consider the one-dimensional KPP-equation driven by space-time white noise and extend the constru...
Let me begin with a disclaimer. This is a report on work in progress, so not everything is in its na...
In this paper we study the random approximate travelling wave solutions of the stochastic KPP equati...
In this work we present examples of the effects of noise on the solution of a partial differential e...
We study the existence and propagation of approximate travelling waves of generalized KPP equations ...
In this thesis we aim to show the existence of a stationary travelling wave of a generalised stocha...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
This dissertation is devoted to the study of some aspects of the theory of stochastic partial differ...
Inspired by applications, we consider reaction-diffusion equations on R that are stochastically forc...
5 pagesWe calculate exactly the velocity and diffusion constant of a microscopic stochastic model of...
AbstractWe consider a stochastic Korteweg–de Vries equation forced by a random term of white noise t...
In this thesis, we develop a stochastic calculus for the space-time Lévy white noise introduced in [...
Consider the semilinear heat equation partial derivative(t)u = partial derivative(2)(x)u + lambda si...