Oblate deformation of light neutron-rich even-even nuclei

Abstract

Light neutron-rich even-even nuclei, of which the ground state is oblately deformed, are looked for, examining the Nilsson diagram based on realistic Woods-Saxon potentials. One-particle energies of the Nilsson diagram are calculated by solving the coupled differential equations obtained from the Schr\"odinger equation in coordinate space with the proper asymptotic behavior for r → ∞ for both one-particle bound and resonant levels. The eigenphase formalism is used in the calculation of one-particle resonant energies. Large energy gaps on the oblate side of the Nilsson diagrams are found to be related to the magic numbers for the oblate deformation of the harmonic-oscillator potential where the frequency ratios (ω : ωz) are simple rational numbers. In contrast, for the prolate deformation the magic numbers obtained from simple rational ratios of (ω : ωz) of the harmonic-oscillator potential are hardly related to the particle numbers, at which large energy gaps appear in the Nilsson diagrams based on realistic Woods-Saxon potentials. The argument for an oblate shape of 4214Si28 is given. Among light nuclei the nucleus 206C14 is found to be a good candidate for having the oblate ground state. In the region of the mass number A ≈ 70 the oblate ground state may be found in the nuclei around 7628Ni48 in addition to 6428Ni36.