Study of A=6 System by Complex-Scaled 4 He+N+N Model

Study of A=6 System by Complex-Scaled 4He+N+N Model Nozomi Kurihara Division of Physics, Graduate School of Science, Hokkaido University Collaborators Yuma Kikuchi and Kiyoshi Kato Division of Physics, Graduate School of Science, Hokkaido University

Introduction –overview of A=6 nuclei– • spherical • described by the mean-field model General nuclei for example, 16O, 40,48Ca, 58Ni, etc…

Introduction –overview of A=6 nuclei– • strongly bound a particle • loosely bound two valence nucleons • cannot described by the mean-field model A=6 nuclei 6He 6Li 6Be a+d two-body a+n+p three-body two-neutron halo di-proton? • described by the three-body cluster model

Introduction –overview of A=6 nuclei– Energy level diagram of A=6 nuclei the lowest thresholds bound states resonant states There are lots of resonant states • Complex-Scaling Method (CSM) Ref : D. R. Tilley, et al., Nucl. Phys. A708(2002), 3-163

Introduction –overview of A=6 nuclei– a+n+p three-body resonant pole Complex-Scaling Method (ex : the 2+ state of 6Li) a+d two-body The resonant energy and the width obtained by the CSM

Introduction –overview of A=6 nuclei– • known as a two-neutron halo nucleus • di-neutron correlation • 6Be • candidate for the two-proton decay • di-proton correlation 6He • three-body cluster structure for T=1 states (isobaric analog states) • two-body cluster structure for T=0 states • 6Li Three-body cluster structure or two-body cluster structure?

Introduction –for 6He– • Di-neutron correlation has been suggested theoretically, and investigated experimentally using a Coulomb breakup reaction. di di-neutron cigar-like

Introduction –for 6Be– • 6Be ground state can decay with the direct two-proton decay process [1]. [1] : L. V. Grigorenko et al., Phys. Rev. C 80, 034602 (2009)

Introduction –for 6Li– • The ground state and the T=0 resonance states is investigated by the two-body cluster model [2]. • The two-body cluster model cannot explain the T=1 resonance states. • The three-body cluster model is needed [3]. T=0 T=1 a+dtwo-body a+n+p three-body [2] : Y. Sakuragi, et al., Prog. Theor. Phys. Suppl. 89(1986), 136 [3] : V.I. Kukukin, et al., Nucl. Phys. A 586(1995),151

In this research • Calculate the energies and the widths for the ground states and the lowly-excited states of A=6 nuclei with Complex-Scaled 4He+N+N model. • Using the method of Analytic Continuation in the Coupling Constant (ACCC), calculate the resonance energy and the widths of the 1+2 state of 6Li with higher accuracy. • Discuss the decay process of the ground states of each nuclei.

Method • Hamiltonian [4] Hybrid-TV model [5] + ECM (T-type) COSM (V-type) [4] : H. Kanada, et al., Prog. Theor. Phys. 61(1979), 1327 [5] : S. Aoyama, et al., Prog. Theor. Phys. 93(1995), 99

Results Energy level diagrams for A=6 nuclei (6He, 6Be) [6] [6] • Matter radius for 6He ground state [7] [6] : D. R. Tilley, et al., Nucl. Phys. A708(2002), 3-163 [7] : I.Tanihata, et al., Phys. Lett. B. 206(1988), 592

Results Energy level diagrams for A=6 nuclei (6Li) [6] [6] : D. R. Tilley, et al., Nucl. Phys. A. 708(2002), 3-163

Summary We calculate the energies and the widths of the ground states and the lowly-excited states of A=6 nuclei using the Complex-Scaled 4He+N+N Model. Future Work • Obtain the energy of the 1+2 state of 6Li with the Complex-Scaled 4He+N+N Model.

Study of A=6 System by Complex-Scaled 4 He+N+N Model