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Generator-coordinate methods with symmetry-restored Hartree-Fock-Bogoliubov wave functions for large-scale shell-model calculations

Noritaka Shimizu, T. Mizusaki, Kazunari Kaneko, Y. Tsunoda

2021Physical review. C30 citationsDOI

Abstract

The generator coordinate method (GCM) combined with the projection method is applied to large-scale shell-model calculations. The quadrupole deformation is taken as a generator coordinate and the GCM basis states are prepared by the quadrupole-constrained Hartree-Fock Bogoliubov method with the variation after particle-number projection. The resultant GCM wave function is a linear combination of the angular-momentum and parity projected basis states. We discuss how well the present method approximates the exact solution of the shell-model diagonalization method by the benchmark tests of $^{48}\mathrm{Ca}$, $^{56}\mathrm{Ni}$, and $^{48}\mathrm{Cr}$ in the $pf$-shell model space and those of $^{132}\mathrm{Ba}$ and $^{133}\mathrm{Ba}$ in the $50<N,\phantom{\rule{0.28em}{0ex}}Z<82$ model space.

Topics & Concepts

PhysicsQuadrupoleWave functionGenerator (circuit theory)Hartree–Fock methodMathematical physicsCoordinate spaceSHELL modelProjection (relational algebra)GCM transcription factorsAngular momentumAtomic physicsQuantum mechanicsGeometryClimate changeBiologyGeneral Circulation ModelPower (physics)Computer scienceMathematicsAlgorithmEcologyNuclear physics research studiesAdvanced NMR Techniques and ApplicationsAdvanced Chemical Physics Studies
Generator-coordinate methods with symmetry-restored Hartree-Fock-Bogoliubov wave functions for large-scale shell-model calculations | Litcius