Showing 1–20 of 20 results
/ Date/ Name
Nov 30, 1998Remark to ''On the Description of Fermion Systems in Boson Representations''Sep 17, 1997An application of the 3-dimensional q-deformed harmonic oscillator to the nuclear shell modelSep 19, 2006Gamma-soft Analog of the Confined Beta-soft Rotor ModelDec 13, 2005Analytical Special Solutions of the Bohr HamiltonianJun 2, 2004W(5): Wobbling Mode in the Framework of the X(5) ModelNov 27, 2003Deformed Harmonic Oscillators for Metal Clusters and Balian-Bloch TheoryMay 29, 2001Unified description of magic numbers of metal clusters in terms of the 3-dimensional q-deformed harmonic oscillatorOct 31, 2005X(3): An Exactly Separable Gamma-Rigid Version of the X(5) Critical Point SymmetryFeb 25, 2004E(5) and X(5) critical point symmetries obtained from Davidson potentials through a variational procedureNov 26, 2003Sequence of Potentials Lying Between the U(5) and X(5) SymmetriesJan 21, 1997Simplified boson realization of the $so_q(3)$ subalgebra of $u_q(3)$ and matrix elements of $so_q(3)$ quadrupole operatorsJul 8, 2005Gamma-rigid solution of the Bohr Hamiltonian for gamma = 30 degrees compared to the E(5) critical point symmetryNov 27, 2003Rotationally Invariant Hamiltonians for Nuclear Spectra Based on Quantum AlgebrasFeb 25, 2004Z(5): Critical point symmetry for the prolate to oblate nuclear shape phase transitionDec 29, 2003Sequence of Potentials Interpolating between the U(5) and E(5) SymmetriesMar 6, 2002Deformed Harmonic Oscillators for Metal Clusters: Analytic Properties and SupershellsDec 29, 2003Ground State Bands of the E(5) and X(5) Critical Symmetries Obtained from Davidson Potentials through a Variational ProcedureNov 27, 2003Molecular Spectra from Rotationally Invariant Hamiltonians Based on the Quantum Algebra SUq(2) and Irreducible Tensor Operators under SUq(2)Oct 31, 2005Critical Point Symmetries in NucleiSep 1, 1999The 3-Dimensional q-Deformed Harmonic Oscillator and Magic Numbers of Alkali Metal Clusters