Pages that link to "Item:Q2750574"

The following pages link to An equation for the quasiparticle RPA based on the \(\text{SO}(2N+1)\) Lie algebra of the fermion operators. (Q2750574):

Displaying 8 items.

• Nonlinear Bogolyubov-Valatin transformations: two modes (Q649620) (← links)
• Random-matrix approach to RPA equations. I. (Q842872) (← links)
• The two-level Lipkin model solution within the RPA approach for deformed fermions (Q2476306) (← links)
• Time dependent \(\text{SO}(2N+1)\) theory for unified description of Bose and Fermi type collective excitations. (Q2750693) (← links)
• Modified non-Euclidean transformation on the \(\frac{\mathrm{SO}(2N+2)}{U(N+1)}\) Grassmannian and \(\mathrm{SO}(2N+1)\) random phase approximation for unified description of Bose and Fermi type collective excitations (Q2805563) (← links)
• A new description of motion of the fermionic \(SO(2N+2)\) top in the classical limit under the quasi-anticommutation relation approximation (Q2919210) (← links)
• $\frac{{\rm SO}(2N)}{U(N)}$ Riccati–Hartree–Bogoliubov equation based on the <font>SO</font>(2N) Lie algebra of the fermion operators (Q5247570) (← links)
• Physical and unphysical solutions of the random-phase approximation equation: (Q5347165) (← links)