5 pages, 4 figures, RevTexAn analytical method to compute thermodynamic properties of a given Hamiltonian system is proposed. This method combines ideas of both dynamical systems and ensemble approaches to thermodynamics, providing de facto a possible alternative to traditional Ensemble methods. Thermodynamic properties are extracted from effective motion equations. These equations are obtained by introducing a general variational principle applied to an action averaged over a statistical ensemble of paths defined on the constant energy surface. The method is applied first to the one dimensional (\\beta)-FPU chain and to the two dimensional lattice (\\phi ^{4}) model. In both cases the method gives a good insight of some of their statistica...
A Hamiltonian model living in a bounded phase space and with long-range interactions is studied. It ...
Equilibrium statistics of finite Hamiltonian systems is fundamentally described by the microcanonica...
The microscopic foundation of the generalized equilibrium statistical mechanics based on the Tsallis...
5 pages, 4 figures, RevTexAn analytical method to compute thermodynamic properties of a given Hamilt...
We consider the micro-canonical ensemble of classical Hamiltonian mechanics from a geometric and dyn...
We present a geometric and dynamical approach to the micro-canonical ensemble of classical Hamiltoni...
In microcanonical molecular dynamics the conservation of total momentum implies that the trajectorie...
We develop a geometric theory of phase transitions (PTs) for Hamiltonian systems in the microcanonic...
We present a geometric and dynamical approach to the micro-canonical ensemble of classical Hamiltoni...
The relation between chaotic dynamics of nonlinear Hamiltonian systems and equilibrium statistical m...
7 pages, 6 figures; Added references and figures, corrected typos, improved notationInternational au...
The microcanonical ensemble is a natural starting point of statistical mechanics. However, when it c...
Equilibrium statistics of Hamiltonian systems is correctly described by the microcanonical ensemble...
In the general case of a many-body Hamiltonian system described by an autonomous Hamiltonian H and w...
A microcanonical first-order transition, connecting a clustered to a homogeneous phase, is studied f...
A Hamiltonian model living in a bounded phase space and with long-range interactions is studied. It ...
Equilibrium statistics of finite Hamiltonian systems is fundamentally described by the microcanonica...
The microscopic foundation of the generalized equilibrium statistical mechanics based on the Tsallis...
5 pages, 4 figures, RevTexAn analytical method to compute thermodynamic properties of a given Hamilt...
We consider the micro-canonical ensemble of classical Hamiltonian mechanics from a geometric and dyn...
We present a geometric and dynamical approach to the micro-canonical ensemble of classical Hamiltoni...
In microcanonical molecular dynamics the conservation of total momentum implies that the trajectorie...
We develop a geometric theory of phase transitions (PTs) for Hamiltonian systems in the microcanonic...
We present a geometric and dynamical approach to the micro-canonical ensemble of classical Hamiltoni...
The relation between chaotic dynamics of nonlinear Hamiltonian systems and equilibrium statistical m...
7 pages, 6 figures; Added references and figures, corrected typos, improved notationInternational au...
The microcanonical ensemble is a natural starting point of statistical mechanics. However, when it c...
Equilibrium statistics of Hamiltonian systems is correctly described by the microcanonical ensemble...
In the general case of a many-body Hamiltonian system described by an autonomous Hamiltonian H and w...
A microcanonical first-order transition, connecting a clustered to a homogeneous phase, is studied f...
A Hamiltonian model living in a bounded phase space and with long-range interactions is studied. It ...
Equilibrium statistics of finite Hamiltonian systems is fundamentally described by the microcanonica...
The microscopic foundation of the generalized equilibrium statistical mechanics based on the Tsallis...