The non-vanishing of the natural orbital (NO) occupation numbers of the one-particle density matrix of many-body systems has important consequences for the existence of a density matrix-potential mapping for nonlocal potentials in reduced density matrix functional theory and for the validity of the extended Koopmans’ theorem. On the basis of Weyl’s theorem we give a connection between the differentiability properties of the ground state wavefunction and the rate at which the natural occupations approach zero when ordered as a descending series. We show, in particular, that the presence of a Coulomb cusp in the wavefunction leads, in general, to a power law decay of the natural occupations, whereas infinitely differentiable wavefuncti...
The emergent integrability of the many-body localized phase is naturally understood in terms of loca...
A recently proposed series of corrections to the earliest JK -only functionals has considerably impr...
We study interacting fermions in one dimension subject to random, uncorrelated onsite disorder, a pa...
The non-vanishing of the natural orbital (NO) occupation numbers of the one-particle density matrix ...
Using the equations of motion for the occupation numbers of natural spin orbitals we show that adiab...
Using the equations of motion for the occupation numbers of natural spin orbitals we show that adiab...
In singlet two-electron systems, the natural occupation numbers of the one-particle reduced density ...
For a quantum system of N identical, harmonically interacting particles in a one-dimensional harmo...
We investigate the suitability of natural orbitals as a basis for describing many-body excitations. ...
In approximate Kohn-Sham density-functional theory, self-interaction manifests itself as the depende...
International audienceNatural orbitals (NOs) are central constituents for evaluating correlation ene...
The analysis in this paper shows that the Hohenberg-Kohn theorem is the constellation of two stateme...
By explicit construction of counterexamples having the same eigenvalue spectrum of one-matrix, but d...
Any rigorous approach to first-order reduced density matrix (Γ) functional theory faces the phase di...
A thesis submitted in partial fulfilment of the requirements for the degree of Doctor in Physics of ...
The emergent integrability of the many-body localized phase is naturally understood in terms of loca...
A recently proposed series of corrections to the earliest JK -only functionals has considerably impr...
We study interacting fermions in one dimension subject to random, uncorrelated onsite disorder, a pa...
The non-vanishing of the natural orbital (NO) occupation numbers of the one-particle density matrix ...
Using the equations of motion for the occupation numbers of natural spin orbitals we show that adiab...
Using the equations of motion for the occupation numbers of natural spin orbitals we show that adiab...
In singlet two-electron systems, the natural occupation numbers of the one-particle reduced density ...
For a quantum system of N identical, harmonically interacting particles in a one-dimensional harmo...
We investigate the suitability of natural orbitals as a basis for describing many-body excitations. ...
In approximate Kohn-Sham density-functional theory, self-interaction manifests itself as the depende...
International audienceNatural orbitals (NOs) are central constituents for evaluating correlation ene...
The analysis in this paper shows that the Hohenberg-Kohn theorem is the constellation of two stateme...
By explicit construction of counterexamples having the same eigenvalue spectrum of one-matrix, but d...
Any rigorous approach to first-order reduced density matrix (Γ) functional theory faces the phase di...
A thesis submitted in partial fulfilment of the requirements for the degree of Doctor in Physics of ...
The emergent integrability of the many-body localized phase is naturally understood in terms of loca...
A recently proposed series of corrections to the earliest JK -only functionals has considerably impr...
We study interacting fermions in one dimension subject to random, uncorrelated onsite disorder, a pa...