AbstractWe show how every bound state of a finite system of identical fermions, whether a ground state or an excited one, defines a density functional. Degeneracies created by a symmetry group can be trivially lifted by a pseudo-Zeeman effect. When complex scaling can be used to regularize a resonance into a square integrable state, a DF also exists
We present an alternative to the Kohn-Sham formulation of density-functional theory for the ground-s...
In quantal density functional theory (Q-DFT), the mapping from either a ground or excited state of t...
Recent applications of covariant density functional theory (CDFT) for the description of excited sta...
International audienceWe show how every bound state of a finite system of identical fermions, whethe...
We explain by quantal density functional theory the physics of mapping from any bound nondegenerate ...
In quantal density functional theory (Q‐DFT), any nondegenerate or degenerate ground or excited stat...
In the present work, we employ exact diagonalization for model systems on a real-space lattice to ex...
Density functional theory (DFT) has greatly expanded our ability to affordably compute and understan...
Density Functional Resonance Theory (DFRT) is a complex-scaled version of ground-state Density Funct...
The quantal density functional theory (Q‐DFT) of excited states is the description of the physics of...
The quantal density-functional theory (Q-DFT) of nondegenerate excited-states maps the pure state of...
A fermion ground state energy functional is set up in terms of particle density, relative pair densi...
International audienceA generalization of the Hohenberg-Kohn theorem for finite systems proves the e...
We analyze the inverse problem of Density Functional Theory using a regularized variational method. ...
Density functional theory provides the basis for uncounted studies of ground-state properties of man...
We present an alternative to the Kohn-Sham formulation of density-functional theory for the ground-s...
In quantal density functional theory (Q-DFT), the mapping from either a ground or excited state of t...
Recent applications of covariant density functional theory (CDFT) for the description of excited sta...
International audienceWe show how every bound state of a finite system of identical fermions, whethe...
We explain by quantal density functional theory the physics of mapping from any bound nondegenerate ...
In quantal density functional theory (Q‐DFT), any nondegenerate or degenerate ground or excited stat...
In the present work, we employ exact diagonalization for model systems on a real-space lattice to ex...
Density functional theory (DFT) has greatly expanded our ability to affordably compute and understan...
Density Functional Resonance Theory (DFRT) is a complex-scaled version of ground-state Density Funct...
The quantal density functional theory (Q‐DFT) of excited states is the description of the physics of...
The quantal density-functional theory (Q-DFT) of nondegenerate excited-states maps the pure state of...
A fermion ground state energy functional is set up in terms of particle density, relative pair densi...
International audienceA generalization of the Hohenberg-Kohn theorem for finite systems proves the e...
We analyze the inverse problem of Density Functional Theory using a regularized variational method. ...
Density functional theory provides the basis for uncounted studies of ground-state properties of man...
We present an alternative to the Kohn-Sham formulation of density-functional theory for the ground-s...
In quantal density functional theory (Q-DFT), the mapping from either a ground or excited state of t...
Recent applications of covariant density functional theory (CDFT) for the description of excited sta...
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