Add to ORKGThe continuity equation in d-dimensional space with random velocity field defined by means of a vector-valued Gaussian process is studied. The expectation of corresponding evolution family of operators is explicitly derived, generalizing in a sense the evolution family corresponding to the conventional diffusion equation
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The continuity equation in d-dimensional space with random velocity field defined by means of a vect...
Abstract. The continuity equation in d-dimensional space with ran-dom velocity eld dened by means of...
AbstractThe continuity equation with the random velocity field in thed-dimensional space is studied ...
Processes driven by randomly interrupted Gaussian white noise are considered. An evolution equation...
Abstract We consider the processes defined by a Langevin equation and the associated continuity eq...
AbstractWe consider a stochastic differential equation with anticipating initial value and drift, an...
Motivated by the possibility of noise to cure equations of finite-time blowup, recent work arXiv:210...
peer-reviewedA quadrature expression is derived for the probability density function of passive trac...
summary:We prove a polynomial growth estimate for random fields satisfying the Kolmogorov continuity...
summary:We prove a polynomial growth estimate for random fields satisfying the Kolmogorov continuity...
We propose a random change of time for a class of generalized diffusion processes such that the cor...
We consider linear stochastic differential-algebraic equations with constant coefficients and additi...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The continuity equation in d-dimensional space with random velocity field defined by means of a vect...
Abstract. The continuity equation in d-dimensional space with ran-dom velocity eld dened by means of...
AbstractThe continuity equation with the random velocity field in thed-dimensional space is studied ...
Processes driven by randomly interrupted Gaussian white noise are considered. An evolution equation...
Abstract We consider the processes defined by a Langevin equation and the associated continuity eq...
AbstractWe consider a stochastic differential equation with anticipating initial value and drift, an...
Motivated by the possibility of noise to cure equations of finite-time blowup, recent work arXiv:210...
peer-reviewedA quadrature expression is derived for the probability density function of passive trac...
summary:We prove a polynomial growth estimate for random fields satisfying the Kolmogorov continuity...
summary:We prove a polynomial growth estimate for random fields satisfying the Kolmogorov continuity...
We propose a random change of time for a class of generalized diffusion processes such that the cor...
We consider linear stochastic differential-algebraic equations with constant coefficients and additi...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...
The problem of turbulent diffusion is posed as determining the time evolution of the probability den...