Starting from a genuine discrete version of the Feynman path-integral representation for the partition function, calculations have been made of the energy, specific heat, and the static density-density correlation functions for a one-dimensional lattice model at nonzero temperatures. A Monte Carlo technique has been used to calculate the temperature-dependent properties. The results are compared with exact calculations for short chains, the Hartree-Fock approximation, and a classical model
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We present a history-dependent Monte Carlo scheme for the efficient calculation of the free energy o...
We present a novel quantum Monte Carlo method based on a path integral in Fock space, which allows t...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We present a history-dependent Monte Carlo scheme for the efficient calculation of the free energy o...
We present a novel quantum Monte Carlo method based on a path integral in Fock space, which allows t...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
Starting from a genuine discrete version of the Feynman path-integral representation for the partiti...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
The generalized Trotter formula is used to derive two different classical representations of the par...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We discuss a Monte Carlo technique to calculate the thermodynamic properties of quantum lattice mode...
We present a history-dependent Monte Carlo scheme for the efficient calculation of the free energy o...
We present a novel quantum Monte Carlo method based on a path integral in Fock space, which allows t...