In this paper we study the random approximate travelling wave solutions of the stochastic KPP equations. Two new properties of the stochastic KPP equations are obtained. We prove the ergodicity that for almost all sample paths, behind the wavefront x = gammat, the lower limit of 1/t integral (t)(0) u(s, x) ds as t --> infinity is positive, and ahead of the wavefront, the limit is zero. In some cases, behind the wavefront, the limit of 1/t integral (t)(0) u(s, x) ds as t --> infinity exists and is positive almost surely. We also prove that behind the wavefront, for almost every omega, the solution of some special stochastic KPP equations converges to a stationary trajectory of the corresponding stochastic differential equation. In front of t...
In this paper we consider approximating random wave phenomenon in terms of heat conductive model. As...
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
In this thesis we investigate stochastic evolution equations for random fields X: Omega x [0; T] x U...
AbstractConsider the stochastic partial differential equation [formula] where Ẇ =Ẇ(t, x) is two-para...
In this thesis we consider approximate travelling wave solutions for stochastic and generalised KPP...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
A reduction method is used to prove existence and uniqueness of strong solutions to stochastic KPP e...
We consider the one-dimensional KPP-equation driven by space-time white noise and extend the constru...
This paper is concerned with properties of the wave speed for the stochastically perturbed Fisher–Ko...
There are two different problems studied in this thesis. The first one is a travelling wave problem....
The space derivatives of Freidlin's travelling wave like solutions of generalized KPP equations are ...
In this thesis we aim to show the existence of a stationary travelling wave of a generalised stochas...
In this article, we consider the stochastic wave equation in spatial dimension $d=1$, with linear t...
In recent study of partial differential equations (PDEs) with random initial data and singular stoch...
We prove a characterization of the support of the law of the solution for a stochastic wave equation...
In this paper we consider approximating random wave phenomenon in terms of heat conductive model. As...
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
In this thesis we investigate stochastic evolution equations for random fields X: Omega x [0; T] x U...
AbstractConsider the stochastic partial differential equation [formula] where Ẇ =Ẇ(t, x) is two-para...
In this thesis we consider approximate travelling wave solutions for stochastic and generalised KPP...
We consider the one-dimensional Kolmogorov equation driven by a particular space-time white noise te...
A reduction method is used to prove existence and uniqueness of strong solutions to stochastic KPP e...
We consider the one-dimensional KPP-equation driven by space-time white noise and extend the constru...
This paper is concerned with properties of the wave speed for the stochastically perturbed Fisher–Ko...
There are two different problems studied in this thesis. The first one is a travelling wave problem....
The space derivatives of Freidlin's travelling wave like solutions of generalized KPP equations are ...
In this thesis we aim to show the existence of a stationary travelling wave of a generalised stochas...
In this article, we consider the stochastic wave equation in spatial dimension $d=1$, with linear t...
In recent study of partial differential equations (PDEs) with random initial data and singular stoch...
We prove a characterization of the support of the law of the solution for a stochastic wave equation...
In this paper we consider approximating random wave phenomenon in terms of heat conductive model. As...
We show that under a certain moderate deviation scaling, the multiplicative-noise stochastic heat eq...
In this thesis we investigate stochastic evolution equations for random fields X: Omega x [0; T] x U...