Add to ORKGThe work presented in this dissertation is centered around the phenomena of correlations between members of a system, and how these correlations lead to unique effects which the system is in a non-equilibrium state. The systems described in this work are divided into two sections: dynamical systems and networks. The work on dynamical systems is focused on how correlated systems can gradually evolve when strongly driven. The work on networks is focused on how percolation is affected by correlations.Dynamical systems focuses on the motion of particles in the presence of an external driving force, specifically focusing on nonlinear effects observable in three different examples of correlated systems which are strongly driven by an external f...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
This thesis is a collection of three exact results on correlation and response functions in integrab...
Progress in the creation of large scale, artificial quantum coherent structures demands the investig...
The dynamical mean field theory is extended using the Keldysh Green's function formalism to study st...
A numerical approach is presented that allows to compute nonequilibrium steady-state properties of s...
In the first part of the Thesis we mostly concentrate on spectral properties of strongly correlated ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
As in the previous period, our work has been concerned with the study of the properties of nonequili...
Correlated systems are a wide class of materials in which the strong electron-electron repulsion is ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
Correlated systems are a wide class of materials in which the strong electron-electron repulsion is ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
We review recent developments in the theory of interacting quantum many-particle systems that are no...
Many social, biological and technological systems can be viewed as complex networks with a large num...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
This thesis is a collection of three exact results on correlation and response functions in integrab...
Progress in the creation of large scale, artificial quantum coherent structures demands the investig...
The dynamical mean field theory is extended using the Keldysh Green's function formalism to study st...
A numerical approach is presented that allows to compute nonequilibrium steady-state properties of s...
In the first part of the Thesis we mostly concentrate on spectral properties of strongly correlated ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
As in the previous period, our work has been concerned with the study of the properties of nonequili...
Correlated systems are a wide class of materials in which the strong electron-electron repulsion is ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
Correlated systems are a wide class of materials in which the strong electron-electron repulsion is ...
Hamiltonian systems can be classified according Poincaré into integrable and non-integrable systems....
We review recent developments in the theory of interacting quantum many-particle systems that are no...
Many social, biological and technological systems can be viewed as complex networks with a large num...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
In this work, we study the non-equilibrium dynamics of low-dimensional strongly correlated quantum s...
This thesis is a collection of three exact results on correlation and response functions in integrab...