ThéorieThe exactly solvable model with fermion boson coupling proposed by Schütte and Da Providencia is considered with spontaneously broken symmetry within the so-called self-consistent random phase approximation. Encouraging results for ground and excited states are obtained. A possible extension of the present approach is discussed
A comparative stdy of the random phase approximation is reported in the case of the following three ...
A microscopic formalism is developed that includes the coupling to two particle-hole phonons in the ...
The so-called self-consistent quasiparticle random phase approximation, accounting for a better trea...
PTHWithin the one-dimensional Hubbard model linear closed chains with various numbers of sites are c...
Self-consistent random-phase approximation is rederived in a consistent way with the help of the cou...
13 pages, 8 figuresInternational audienceThe Self-Consistent RPA (SCRPA) approach is elaborated for ...
The Self-Consistent RPA (SCRPA) approach is elaborated for cases with a continuously broke...
The Self-consistent random phase approximation (SCRPA) is a method which allows to include in the me...
We present a new extension of the random-phase approximation method: the quasiboson approximation is...
Self Consistent Quasiparticle Random Phase Approximation (SCQRPA) is considered in application to th...
We present an ideal system of interacting fermions where the solutions of the many-body Schrodinger ...
International audienceCoupled equations for even and odd particle number correlation functions are s...
A self-consistent version of the Thermal Random Phase Approximation (TSCRPA) is developed within the...
We describe a random matrix approach that can provide generic and readily soluble mean-field descrip...
To study collective excitations in hot finite Fermi systems (atomic nuclei, metallic clusters), a me...
A comparative stdy of the random phase approximation is reported in the case of the following three ...
A microscopic formalism is developed that includes the coupling to two particle-hole phonons in the ...
The so-called self-consistent quasiparticle random phase approximation, accounting for a better trea...
PTHWithin the one-dimensional Hubbard model linear closed chains with various numbers of sites are c...
Self-consistent random-phase approximation is rederived in a consistent way with the help of the cou...
13 pages, 8 figuresInternational audienceThe Self-Consistent RPA (SCRPA) approach is elaborated for ...
The Self-Consistent RPA (SCRPA) approach is elaborated for cases with a continuously broke...
The Self-consistent random phase approximation (SCRPA) is a method which allows to include in the me...
We present a new extension of the random-phase approximation method: the quasiboson approximation is...
Self Consistent Quasiparticle Random Phase Approximation (SCQRPA) is considered in application to th...
We present an ideal system of interacting fermions where the solutions of the many-body Schrodinger ...
International audienceCoupled equations for even and odd particle number correlation functions are s...
A self-consistent version of the Thermal Random Phase Approximation (TSCRPA) is developed within the...
We describe a random matrix approach that can provide generic and readily soluble mean-field descrip...
To study collective excitations in hot finite Fermi systems (atomic nuclei, metallic clusters), a me...
A comparative stdy of the random phase approximation is reported in the case of the following three ...
A microscopic formalism is developed that includes the coupling to two particle-hole phonons in the ...
The so-called self-consistent quasiparticle random phase approximation, accounting for a better trea...
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