Add to ORKGIn the probability representation of quantum mechanics, quantum states are represented by a classical probability distribution, the marginal distribution function (MDF), whose time dependence is governed by a classical evolution equation. We find and explicitly solve, for a wide class of Hamiltonians, new equations for the Green's function of such an equation, the so-called classical propagator. We elucidate the connection of the classical propagator to the quantum propagator for the density matrix and to the Green's function of the Schrödinger equation. Within the new description of quantum mechanics we give a definition of coherence solely in terms of properties of the MDF and we test the new definition recovering well known results. As a...
In (1), we noted that a Gaussian wavefunction may be a solution to the time-independent Schrodinger ...
We consider the possibility that both classical statistical mechanical systems as well as quantum me...
The statistical mechanics of systems whose evolution is governed by mixed quantum-classical dynamics...
The recently proposed probability representation of quantum mechanics is generalized to quantum fiel...
We explore the properties of quantum states and operators that are conjugate to the Hamiltonian eige...
In this thesis I focus on what can be called quantum-classical divide. I consider the Liouville equa...
We derive the equations of quantum mechanics and quantum thermodynamics from the assumption that a q...
Equilibrium classical statistical mechanical distributions are often derived from maximizing (in a v...
In the operatorial formulation of quantum statistics, the time evolution of density matrices is gove...
The statistical mechanics of quantum-classical systems with holonomic constraints is formulated rig...
We consider the dynamics of a quantum joint phase-space probability density in an exactly solvable m...
A quantum spin system can be modelled by an equivalent classical system, with an effective Hamiltoni...
The one particle quantum mechanics is considered in the frame of a N-body classical kinetics in the ...
In a previous article [H. Bergeron, J. Math. Phys. 42, 3983 (2001)], we presented a method to obtain...
A gauge-invariant wave equation for the dynamics of hybrid quantum-classical systems is formulated b...
In (1), we noted that a Gaussian wavefunction may be a solution to the time-independent Schrodinger ...
We consider the possibility that both classical statistical mechanical systems as well as quantum me...
The statistical mechanics of systems whose evolution is governed by mixed quantum-classical dynamics...
The recently proposed probability representation of quantum mechanics is generalized to quantum fiel...
We explore the properties of quantum states and operators that are conjugate to the Hamiltonian eige...
In this thesis I focus on what can be called quantum-classical divide. I consider the Liouville equa...
We derive the equations of quantum mechanics and quantum thermodynamics from the assumption that a q...
Equilibrium classical statistical mechanical distributions are often derived from maximizing (in a v...
In the operatorial formulation of quantum statistics, the time evolution of density matrices is gove...
The statistical mechanics of quantum-classical systems with holonomic constraints is formulated rig...
We consider the dynamics of a quantum joint phase-space probability density in an exactly solvable m...
A quantum spin system can be modelled by an equivalent classical system, with an effective Hamiltoni...
The one particle quantum mechanics is considered in the frame of a N-body classical kinetics in the ...
In a previous article [H. Bergeron, J. Math. Phys. 42, 3983 (2001)], we presented a method to obtain...
A gauge-invariant wave equation for the dynamics of hybrid quantum-classical systems is formulated b...
In (1), we noted that a Gaussian wavefunction may be a solution to the time-independent Schrodinger ...
We consider the possibility that both classical statistical mechanical systems as well as quantum me...
The statistical mechanics of systems whose evolution is governed by mixed quantum-classical dynamics...