Add to ORKGWe study behavior for negative times t of the 2D periodic Navier-Stokes equations and Burgers' original model for turbulence. Both systems are proved to have rich sets of solutions that exist for all t - R and increase exponentially as t -> -(Infinity) However, our study shows that the behavior of these solutions as well as the geometrical structure of the sets of their initial data are very different. As a consequence, Burgers original model for turbulence becomes the first known dissipative system that despite possessing a rich set of backward-time exponentially growing solutions, does not display any similarities, as t -> -(Infinity), to the linear case
The paper analyzes the structure and the inner long-term dynamics of the invariant compact sets for ...
We experimentally explore solutions to a model Hamiltonian dynamical system recently derived to stud...
The global asymptotic nonlinear behavior of 1 1 explicit and implicit time discretizations for four ...
Abstract We prove that every solution of a KdV-Burgers-Sivashinsky type equation blows up in the ene...
AbstractThe sets of solutions to the Lorenz equations that exist backward in time and are bounded at...
There are two parts in this dissertation. The backward stochastic Lorenz system is studied in the fi...
Since one can rarely write down the analytical solutions to nonlinear dissipative partial differenti...
Turbulence displays a number of remarkable features. It is a super dissipator, able to efficiently ...
We consider a two-dimensional model of double-diffusive convection and its time discretisation using...
Transient chaos and unbounded dynamics are two outstanding phenomena that dominate in chaotic system...
AbstractWe prove that any solution of the Kuramoto–Sivashinsky equation either belongs to the global...
In this work, we have introduced and then computed the so-called crest factor associated with soluti...
We consider the generalised Burgers equation $$\frac{\partial u}{\partial t} + f'(u)\frac{\partial u...
Several turbulent and nonturbulent solutions of the Navier-Stokes equations are obtained. The unaver...
It has become clear over the last few years that many deterministic dynamical systems described by s...
The paper analyzes the structure and the inner long-term dynamics of the invariant compact sets for ...
We experimentally explore solutions to a model Hamiltonian dynamical system recently derived to stud...
The global asymptotic nonlinear behavior of 1 1 explicit and implicit time discretizations for four ...
Abstract We prove that every solution of a KdV-Burgers-Sivashinsky type equation blows up in the ene...
AbstractThe sets of solutions to the Lorenz equations that exist backward in time and are bounded at...
There are two parts in this dissertation. The backward stochastic Lorenz system is studied in the fi...
Since one can rarely write down the analytical solutions to nonlinear dissipative partial differenti...
Turbulence displays a number of remarkable features. It is a super dissipator, able to efficiently ...
We consider a two-dimensional model of double-diffusive convection and its time discretisation using...
Transient chaos and unbounded dynamics are two outstanding phenomena that dominate in chaotic system...
AbstractWe prove that any solution of the Kuramoto–Sivashinsky equation either belongs to the global...
In this work, we have introduced and then computed the so-called crest factor associated with soluti...
We consider the generalised Burgers equation $$\frac{\partial u}{\partial t} + f'(u)\frac{\partial u...
Several turbulent and nonturbulent solutions of the Navier-Stokes equations are obtained. The unaver...
It has become clear over the last few years that many deterministic dynamical systems described by s...
The paper analyzes the structure and the inner long-term dynamics of the invariant compact sets for ...
We experimentally explore solutions to a model Hamiltonian dynamical system recently derived to stud...
The global asymptotic nonlinear behavior of 1 1 explicit and implicit time discretizations for four ...