This paper is concerned with the problem of regularization by noise of systems of reaction–diffusion equations with mass control. It is known that strong solutions to such systems of PDEs may blow-up in finite time. Moreover, for many systems of practical interest, establishing whether the blow-up occurs or not is an open question. Here we prove that a suitable multiplicative noise of transport type has a regularizing effect. More precisely, for both a sufficiently noise intensity and a high spectrum, the blow-up of strong solutions is delayed up to an arbitrary large time. Global existence is shown for the case of exponentially decreasing mass. The proofs combine and extend recent developments in regularization by noise and in the Lp(Lq)-a...
We consider regularity properties of stochastic kinetic equations with multiplicative noise and drif...
Inspired by applications, we consider reaction-diffusion equations on R that are stochastically forc...
For random measure-valued stochastic partial differential equations for biological processes, growth...
This paper is concerned with the problem of regularization by noise of systems of reaction-diffusion...
We consider a class of stochastic reaction-diffusion equations with additive noise. We show that in ...
In this work we present examples of the effects of noise on the solution of a partial differential e...
For some deterministic nonlinear PDEs on the torus whose solutions may blow up in finite time, we sh...
A stochastic linear transport equation with multiplicative noise is considered and the question of n...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
This paper is a continuation of Part I of this project, where we developed a new local well-posednes...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
we prove large deviation estimates for the small noise limit of systems of sto-chastic reaction–diff...
The current paper is devoted to the regularity of the mild solution for a stochastic fractional dela...
Röckner M, Zhu R, Zhu X. Local existence and non-explosion of solutions for stochastic fractional pa...
Time regularity of solutions to SPDEs driven by Wiener process can be studied using either Kolmogoro...
We consider regularity properties of stochastic kinetic equations with multiplicative noise and drif...
Inspired by applications, we consider reaction-diffusion equations on R that are stochastically forc...
For random measure-valued stochastic partial differential equations for biological processes, growth...
This paper is concerned with the problem of regularization by noise of systems of reaction-diffusion...
We consider a class of stochastic reaction-diffusion equations with additive noise. We show that in ...
In this work we present examples of the effects of noise on the solution of a partial differential e...
For some deterministic nonlinear PDEs on the torus whose solutions may blow up in finite time, we sh...
A stochastic linear transport equation with multiplicative noise is considered and the question of n...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
This paper is a continuation of Part I of this project, where we developed a new local well-posednes...
This volume deals with the random perturbation of PDEs which lack well-posedness, mainly because of ...
we prove large deviation estimates for the small noise limit of systems of sto-chastic reaction–diff...
The current paper is devoted to the regularity of the mild solution for a stochastic fractional dela...
Röckner M, Zhu R, Zhu X. Local existence and non-explosion of solutions for stochastic fractional pa...
Time regularity of solutions to SPDEs driven by Wiener process can be studied using either Kolmogoro...
We consider regularity properties of stochastic kinetic equations with multiplicative noise and drif...
Inspired by applications, we consider reaction-diffusion equations on R that are stochastically forc...
For random measure-valued stochastic partial differential equations for biological processes, growth...