Add to ORKGParticle number fluctuations are studied in the microcanonical ensemble. For the Boltzmann statistics we deduce exact analytical formulae for the microcanonical partition functions in the case of non-interacting massless neutral particles and charged particles with zero net charge. The particle number fluctuations are calculated and we find that in the microcanonical ensemble they are suppressed in comparison to the fluctuations in the canonical and grand canonical ensembles. This remains valid in the thermodynamic limit too, so that the well-known equivalence of all statistical ensembles refers to the average quantities, but does not apply to the fluctuations
The thermodynamic properties of bosons moving in a harmonic trap in an arbitrary number of dimension...
This thesis presents an in-depth study of statistical mechanical systems having microcanonical equi...
We illustrate a novel characterization of nonequivalent statistical mechanical ensembles using the m...
Statistics of distinguishable particles has become relevant in systems of colloidal particles and in...
In microcanonical molecular dynamics the conservation of total momentum implies that the trajectorie...
Fluctuations of charged particle number are studied in the canonical ensemble. In the infinite volum...
In statistical mechanics, microcanonical factorial counting applied to systems in an ensemble is app...
Clusters are treated in the microcanonical ensemble. Two classical choices for the partition functio...
The statistical mechanics of small clusters (n ∼ 10-50 elements) of harmonic oscillators and two-lev...
4 pages, 4 figuresWe investigate the relation between various statistical ensembles of finite system...
The microcanonical ensemble is a natural starting point of statistical mechanics. However, when it c...
Particle number fluctuations are studied in relativistic Bose and Fermi gases. The calculations are ...
Using the Fluctuation Theorem (FT), we give a first-principles derivation of Boltzmann’s postulate o...
A Hamiltonian model living in a bounded phase space and with long-range interactions is studied. It ...
We present a Monte Carlo calculation of the microcanonical ensemble of the of the ideal hadron-reson...
The thermodynamic properties of bosons moving in a harmonic trap in an arbitrary number of dimension...
This thesis presents an in-depth study of statistical mechanical systems having microcanonical equi...
We illustrate a novel characterization of nonequivalent statistical mechanical ensembles using the m...
Statistics of distinguishable particles has become relevant in systems of colloidal particles and in...
In microcanonical molecular dynamics the conservation of total momentum implies that the trajectorie...
Fluctuations of charged particle number are studied in the canonical ensemble. In the infinite volum...
In statistical mechanics, microcanonical factorial counting applied to systems in an ensemble is app...
Clusters are treated in the microcanonical ensemble. Two classical choices for the partition functio...
The statistical mechanics of small clusters (n ∼ 10-50 elements) of harmonic oscillators and two-lev...
4 pages, 4 figuresWe investigate the relation between various statistical ensembles of finite system...
The microcanonical ensemble is a natural starting point of statistical mechanics. However, when it c...
Particle number fluctuations are studied in relativistic Bose and Fermi gases. The calculations are ...
Using the Fluctuation Theorem (FT), we give a first-principles derivation of Boltzmann’s postulate o...
A Hamiltonian model living in a bounded phase space and with long-range interactions is studied. It ...
We present a Monte Carlo calculation of the microcanonical ensemble of the of the ideal hadron-reson...
The thermodynamic properties of bosons moving in a harmonic trap in an arbitrary number of dimension...
This thesis presents an in-depth study of statistical mechanical systems having microcanonical equi...
We illustrate a novel characterization of nonequivalent statistical mechanical ensembles using the m...