Some results concerning the stability and stabilisation of stochastic linear partial differential equations in the sense of Stratonovich are proved. The main result ensures that a deterministic linear PDE can be stabilised by adding a suitable Stratonovich noise if and only if the linear partial di erential operator has negative trace
Noise-induced stabilization is the phenomenon in which the addition of randomness to an unstable det...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
For many stochastic hybrid systems in the real world, it is inappropriate to study if their solution...
Some results concerning the stability and stabilisation of stochastic linear partial differential eq...
In this paper, we point out the different long-time behaviour of stochastic partial differential equ...
Some results on stabilization of (deterministic and stochastic) partial differential equations are e...
Some sufficient conditions concerning stability of solutions of stochastic differential evolution eq...
AbstractWe provide an example of a class of partial differential equations being stabilized (in term...
AbstractThe class of stochastic processes is characterized which, as multiplicative noise with large...
The main aim of this thesis is to examine stability properties of the solutions to stochastic diffe...
We prove that the asymptotic behaviour of partial differential inclusions and partial differential e...
This paper considers the stabilisation and destabilisa- tion by a Brownian noise perturbation which ...
This paper extends, by an alternative method, a result of Mao (Systems and Con-trol Letters, 1994) w...
A number of problems in mechanics, physics and applications are described by linear Ito stochastic d...
A notion of stability for a special type of test equations is proposed. These are stochastic differe...
Noise-induced stabilization is the phenomenon in which the addition of randomness to an unstable det...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
For many stochastic hybrid systems in the real world, it is inappropriate to study if their solution...
Some results concerning the stability and stabilisation of stochastic linear partial differential eq...
In this paper, we point out the different long-time behaviour of stochastic partial differential equ...
Some results on stabilization of (deterministic and stochastic) partial differential equations are e...
Some sufficient conditions concerning stability of solutions of stochastic differential evolution eq...
AbstractWe provide an example of a class of partial differential equations being stabilized (in term...
AbstractThe class of stochastic processes is characterized which, as multiplicative noise with large...
The main aim of this thesis is to examine stability properties of the solutions to stochastic diffe...
We prove that the asymptotic behaviour of partial differential inclusions and partial differential e...
This paper considers the stabilisation and destabilisa- tion by a Brownian noise perturbation which ...
This paper extends, by an alternative method, a result of Mao (Systems and Con-trol Letters, 1994) w...
A number of problems in mechanics, physics and applications are described by linear Ito stochastic d...
A notion of stability for a special type of test equations is proposed. These are stochastic differe...
Noise-induced stabilization is the phenomenon in which the addition of randomness to an unstable det...
We investigate the perturbation of the non-linear differential equation dx(t)dt = f(x(t)) by random ...
For many stochastic hybrid systems in the real world, it is inappropriate to study if their solution...