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4. Heavy fermion quantum criticality. Nazario Z; Santiago DI Phys Rev Lett; 2008 Sep; 101(13):136408. PubMed ID: 18851474 [TBL] [Abstract][Full Text] [Related]
5. Correspondence between the interacting boson model and the fermion dynamical symmetry model of nuclei. Chen JQ; Feng DH; Wu CL Phys Rev C Nucl Phys; 1986 Dec; 34(6):2269-2279. PubMed ID: 9953708 [No Abstract] [Full Text] [Related]
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7. Random phase approximation studies in the fermion dynamical symmetry model: SO(8). Wenes G; Ginocchio JN Phys Rev C Nucl Phys; 1989 Jun; 39(6):2426-2437. PubMed ID: 9955487 [No Abstract] [Full Text] [Related]
8. Geometrical structure and critical phenomena in the fermion dynamical symmetry model: Sp(6). Zhang WM; Wu CL; Feng DH; Ginocchio JN; Guidry MW Phys Rev C Nucl Phys; 1988 Sep; 38(3):1475-1487. PubMed ID: 9954951 [No Abstract] [Full Text] [Related]
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12. Fermion dynamical symmetry model of nuclei: Basis, Hamiltonian, and symmetries. Wu CL; Da Hsuan Feng ; Chen XG; Chen JQ; Guidry MW Phys Rev C Nucl Phys; 1987 Sep; 36(3):1157-1180. PubMed ID: 9954193 [No Abstract] [Full Text] [Related]
13. Test of the fermion dynamical symmetry model microscopy in the sd shell. Halse P Phys Rev C Nucl Phys; 1987 Jul; 36(1):372-379. PubMed ID: 9954081 [No Abstract] [Full Text] [Related]
14. Normal and exotic collective states in the fermion dynamical symmetry model. Pan XW; Feng DH Phys Rev C Nucl Phys; 1994 Aug; 50(2):818-821. PubMed ID: 9969724 [No Abstract] [Full Text] [Related]
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18. Quantum rotational band formulas from a two-parameter potential and the microscopic explanation from the fermion dynamical symmetry model. Wu LA; Lou JZ; Jing XG Phys Rev C Nucl Phys; 1995 Jun; 51(6):2998-3007. PubMed ID: 9970400 [No Abstract] [Full Text] [Related]
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20. Electron mass operator in a strong magnetic field and dynamical chiral symmetry breaking. Kuznetsov AV; Mikheev NV Phys Rev Lett; 2002 Jul; 89(1):011601. PubMed ID: 12097029 [TBL] [Abstract][Full Text] [Related] [Next] [New Search]