Add to ORKGIn classical physics there is a well-known theorem in which it is established that the energy per degree of freedom is the same. However, in quantum mechanics due to the non-commutativity of some pairs of observables and the possibility of having non-Markovian dynamics, the energy is not equally distributed. We propose a correspondence between what we know about the classical energy equipartition theorem and its possible counterpart in phase-space formulation in quantum mechanics based on the Wigner representation. Also, we show that in the high-temperature regime, the classical result is recovered
We argue that classical statistical mechanics (say of an ideal gas) is based on a single equilibrati...
Quantum energy coherences represent a thermodynamic resource, which can be exploited to extract ener...
Recently, the quantum counterpart of energy equipartition theorem has drawn considerable attention. ...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
The principle of the equipartition of energy was one of the most definite and important results of t...
We prove that the energy of any eigenvector of a sum of several independent large Wigner matrices is...
In this brief report, following the recent developments on formulating a quantum analogue of the cla...
It is shown that the recently proposed quantum analogue of classical energy equipartition theorem f...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
The problem of mutual equilibration between two finite, identical quantum systems, A and B, prepared...
AbstractLet H be a self-adjoint operator on a complex Hilbert space H. The solution of the abstract ...
Let H be a self-adjoint operator on a complex Hilbert space H. The solution of the abstract Schrödin...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
We argue that classical statistical mechanics (say of an ideal gas) is based on a single equilibrati...
Quantum energy coherences represent a thermodynamic resource, which can be exploited to extract ener...
Recently, the quantum counterpart of energy equipartition theorem has drawn considerable attention. ...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
The principle of the equipartition of energy was one of the most definite and important results of t...
We prove that the energy of any eigenvector of a sum of several independent large Wigner matrices is...
In this brief report, following the recent developments on formulating a quantum analogue of the cla...
It is shown that the recently proposed quantum analogue of classical energy equipartition theorem f...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
The problem of mutual equilibration between two finite, identical quantum systems, A and B, prepared...
AbstractLet H be a self-adjoint operator on a complex Hilbert space H. The solution of the abstract ...
Let H be a self-adjoint operator on a complex Hilbert space H. The solution of the abstract Schrödin...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
A general proof of the energy equipartition theorem is given. Our derivation holds for any distribut...
We argue that classical statistical mechanics (say of an ideal gas) is based on a single equilibrati...
Quantum energy coherences represent a thermodynamic resource, which can be exploited to extract ener...
Recently, the quantum counterpart of energy equipartition theorem has drawn considerable attention. ...