NPSC-2003Gabriela Popa Microscopic interpretation of the excited K  = 0 +, 2 + bands of deformed nuclei Gabriela Popa Rochester Institute of Technology.

Slides:

Advertisements

Similar presentations

Collective properties of even- even nuclei Vibrators and rotors With three Appendices.

Advertisements

Valence shell excitations in even-even spherical nuclei within microscopic model Ch. Stoyanov Institute for Nuclear Research and Nuclear Energy Sofia,

Coulomb excitation with radioactive ion beams

n_TOF meeting November 2007, BARI.

Electromagnetic Properties of

Silvia Lenzi – ARIS 2014, Tokyo, June 2-6, 2014 Mirror Symmetry Silvia Lenzi University of Padova and INFN Silvia M. Lenzi Dipartimento di Fisica e Astronomia“Galileo.

II. Spontaneous symmetry breaking. II.1 Weinberg’s chair Hamiltonian rotational invariant Why do we see the chair shape? States of different IM are so.

Structure of odd-odd nuclei in the interacting boson fermion-fermion model 3.

Projected-shell-model study for the structure of transfermium nuclei Yang Sun Shanghai Jiao Tong University Beijing, June 9, 2009.

Single Particle Energies

Effect of non-axial deformations of higher multipolarity on the fission-barrier height of heavy and superheavy nuclei I. Introduction II. Method of the.

Fission barriers of heavy and superheavy nuclei analyzed in multidimensional deformation space I.Introduction II.Method III.Deformation space IV.Results.

W. Udo Schröder, 2005 Rotational Spectroscopy 1. W. Udo Schröder, 2005 Rotational Spectroscopy 2 Rigid-Body Rotations Axially symmetric nucleus 

Nuclear Low-lying Spectrum and Quantum Phase Transition Zhipan Li School of Physical Science and Technology Southwest University 17th Nuclear Physics Workshop,

NUCLEAR STRUCTURE PHENOMENOLOGICAL MODELS

Description of experimental fission barriers of heavy nuclei I.Introduction II.Experimental barriers III.Method of description IV.Deformation space V.Results.

Rotational bands in the rare-earth proton emitters and neighboring nuclei Darek Seweryniak Argonne National Laboratory PROCON Rotational landscape.

Masses (Binding energies) and the IBA Extra structure-dependent binding: energy depression of the lowest collective state.

IBA Lecture part 2. Most general IBA Hamiltonian in terms with up to four boson operators (given N) IBA Hamiltonian Mixes d and s components of the wave.

M. Girod, F.Chappert, CEA Bruyères-le-Châtel Neutron Matter and Binding Energies with a New Gogny Force.

Structure of Be hyper-isotopes Masahiro ISAKA (RIKEN) Collaborators: H. Homma and M. Kimura (Hokkaido University)

NSDD Workshop, Trieste, February 2006 Nuclear Structure (II) Collective models P. Van Isacker, GANIL, France.

1 New formulation of the Interacting Boson Model and the structure of exotic nuclei 10 th International Spring Seminar on Nuclear Physics Vietri sul Mare,

Lecture 20: More on the deuteron 18/11/ Analysis so far: (N.B., see Krane, Chapter 4) Quantum numbers: (J , T) = (1 +, 0) favor a 3 S 1 configuration.

Shape phase transition in neutron-rich even-even light nuclei with Z=20-28 H.B.Bai X.W.Li H.F.Dong W.C.Cao Department of Physics, Chifeng University, Chifeng.

原子核配对壳模型的相关研究 Yanan Luo( 罗延安 ), Lei Li( 李磊 ) School of Physics, Nankai University, Tianjin Yu Zhang( 张宇 ), Feng Pan( 潘峰 ) Department of Physics, Liaoning.

Lecture 16: Beta Decay Spectrum 29/10/2003 (and related processes...) Goals: understand the shape of the energy spectrum total decay rate sheds.

The Algebraic Approach 1.Introduction 2.The building blocks 3.Dynamical symmetries 4.Single nucleon description 5.Critical point symmetries 6.Symmetry.

Realistic Calculations of Neutrino-Nucleus Reaction Cross sections T.S. Kosmas Realistic Calculations of Neutrino-Nucleus Reaction Cross sections T.S.

Nuclear Models Nuclear force is not yet fully understood.

Core-excited states in 101 Sn Darek Seweryniak, ANL GS/FMA collaboration.

A new statistical scission-point model fed with microscopic ingredients Sophie Heinrich CEA/DAM-Dif/DPTA/Service de Physique Nucléaire CEA/DAM-Dif/DPTA/Service.

ESNT Saclay February 2, Structure properties of even-even actinides at normal- and super-deformed shapes J.P. Delaroche, M. Girod, H. Goutte, J.

Hψ = E ψ Hamiltonian for the H atom. The wave function is usually represented by ψ.

How do nuclei rotate? The nucleus rotates as a whole.

Héloïse Goutte CERN Summer student program 2009 Introduction to Nuclear physics; The nucleus a complex system Héloïse Goutte CEA, DAM, DIF

ShuangQuan Zhang School of Physics, Peking University Static chirality and chiral vibration of atomic nucleus in particle rotor model.

NEUTRON SKIN AND GIANT RESONANCES Shalom Shlomo Cyclotron Institute Texas A&M University.

1 Systematic calculations of alpha decay half-lives of well- deformed nuclei Zhongzhou REN ( 任中洲 ) Department of Physics, Nanjing University, Nanjing,

Lecture 23: Applications of the Shell Model 27/11/ Generic pattern of single particle states solved in a Woods-Saxon (rounded square well)

K. P. Drumev Institute for Nuclear Research and Nuclear Energy, Bulgarian Academy of Sciences, Sofia, Bulgaria.

Quantum Phase Transitions (QPT) in Finite Nuclei R. F. Casten June 21, 2010, CERN/ISOLDE.

Nuclear and Radiation Physics, BAU, 1 st Semester, (Saed Dababneh). 1 Shell model Notes: 1. The shell model is most useful when applied to closed-shell.

ON E0 TRANSITIONS IN HEAVY EVEN – EVEN NUCLEI VLADIMIR GARISTOV, A. GEORGIEVA* Institute for Nuclear Research and Nuclear Energy, Sofia, Bulgaria,

July 29-30, 2010, Dresden 1 Forbidden Beta Transitions in Neutrinoless Double Beta Decay Kazuo Muto Department of Physics, Tokyo Institute of Technology.

F. C HAPPERT N. P ILLET, M. G IROD AND J.-F. B ERGER CEA, DAM, DIF THE D2 GOGNY INTERACTION F. C HAPPERT ET AL., P HYS. R EV. C 91, (2015)

Abstract: While large-scale shell-model calculations may be useful, perhaps even essential, for reproducing experimental data, insight into the physical.

Quantum Phase Transitions in Nuclei

Algebraic collective model and its applications Gabriela Thiamová Laboratoire de Physique Subatomique et de Cosmologie Institut National Polytechnique.

Faddeev Calculation for Neutron-Rich Nuclei Eizo Uzu (Tokyo Univ. of Science) Collaborators Masahiro Yamaguchi (RCNP) Hiroyuki Kamada (Kyusyu Inst. Tech.)

Variational Multiparticle-Multihole Configuration Mixing Method with the D1S Gogny force INPC2007, Tokyo, 06/06/2007 Nathalie Pillet (CEA Bruyères-le-Châtel,

Quantum Phase Transition from Spherical to γ-unstable for Bose-Fermi System Mahmut Böyükata Kırıkkale University Turkey collabration with Padova–Sevilla.

Time dependent GCM+GOA method applied to the fission process ESNT janvier / 316 H. Goutte, J.-F. Berger, D. Gogny CEA/DAM Ile de France.

Nordita Workshop on chiral bands /04/2015 Multiple chiral bands associated with the same strongly asymmetric many- particle nucleon configuration.

Nuclear Low-lying Spectrum and Quantum Phase Transition 李志攀西南大学物理科学与技术学院.

Lecture 4 1.The role of orientation angles of the colliding nuclei relative to the beam energy in fusion-fission and quasifission reactions. 2.The effect.

Rotational energy term in the empirical formula for the yrast energies in even-even nuclei Eunja Ha and S. W. Hong Department of Physics, Sungkyunkwan.

超重原子核的结构孙扬上海交通大学合作者：清华大学龙桂鲁， F. Al-Khudair 中国原子能研究院陈永寿，高早春济南，山东大学, 2008 年 9 月 20 日.

Determining Reduced Transition Probabilities for 152 ≤ A ≤ 248 Nuclei using Interacting Boson Approximation (IBA-1) Model By Dr. Sardool Singh Ghumman.

Workshop Spiral II - Caen 4-6th October 2005

The role of isospin symmetry in medium-mass N ~ Z nuclei

Yu Zhang(张宇), Feng Pan(潘峰)

Ch. Stoyanov Two-Phonon Mixed-Symmetry States in the Domain N=52

Beyond mean-field methods: why and how

R. F. Casten Yale and MSU-FRIB SSNET17, Paris, Nov.6-10, 2017

Isospin Symmetry test on the semimagic 44Cr

EXOTIC NUCLEAR STRUCTURE PHENOMENA the complex EXCITED VAMPIR approach

Nuclear Physics, JU, Second Semester,

Coupled-channel study of fine structure in the alpha decay of well-deformed nuclei Zhongzhou REN (任中洲) Department of Physics, Nanjing University, Nanjing,

Magnetic dipole excitation and its sum rule for valence nucleon pair

Presentation transcript:

NPSC-2003Gabriela Popa Microscopic interpretation of the excited K  = 0 +, 2 + bands of deformed nuclei Gabriela Popa Rochester Institute of Technology Collaborators: J. P. Draayer Louisiana State University J. G. Hirsch UNAM, Mexico A.Georgieva Bulgarian Academy of Science

NPSC-2003Gabriela Popa Outline Introduction Introduction What we know about the nucleus Characteristic energy spectra Theoretical Model Configuration space System Hamiltonian Results Conclusion and future work

Nuclear Physics Summer School June 15-27, 2003Gabriela Popa Chart of the nuclei N (number of neutrons) Z (protons)

NPSC-2003Gabriela Popa Nuclear vibrations  -vibration  -vibration 1 2

0, 2, spherical deformed E = n   E = I(I+1)/(2  ) Schematic level schemes of spherical and deformed nuclei

NPSC-2003Gabriela Popa Experimental energy levels

Nuclear Physics Summer School June 15-27, 2003Gabriela Popa Experimental Experimental energy spectra of 162 Dy

NPSC-2003Gabriela Popa Single particle energy levels 1s 1p 2s 1g N = 3 N = 2 N = 1 N = 0 N = 4 1d l·l l·s d5/2 d3/2 s1/2 1f 2p 3s 2d 1h N = 5 s1/2 p1/2 p3/2 f7/2 f5/2 p5/2 f9/2 p1/2 d3/2 d5/2 h11/2 s1/2 g7/2

NPSC-2003Gabriela Popa Valence space: U(   )  U(  ) total normal unique   =32  n  =20  u  =12  =44  n =30  u =14 Particle distributions:  protons: neutrons:  total 152 Nd (12,0) (18,0) (30, 0)  156 Sm (12,0) (18,0) (30, 0)  160 Gd (10,4) (18,4) (28, 4)  164 Dy (10,4) (20,4) (30, 4)  168 Er (10,4) (20,4) (30, 4)  172 Yb (36,0) (12,0) (24, 0)  176 Hf (8,30) (0,12) (8, 18)  Particle distribution

NPSC-2003Gabriela Popa Wave Function |    =  C  i |  i  |  i  = |{   ;  }  (,  )KL S; JM    (  = , ) = n  [f  ] ( ,   ), S  ( ,   )  (,  ) =  (,  ) 

NPSC-2003Gabriela Popa Coupling proton and neutron irreps to total (coupled) SU(3):           +      +      +   -   +   +     +     +   -     +   -    +   -     m,l   +  -2m+l   +  +m-2l) k with the multiplicity denoted by k = k(m,l) Direct Product Coupling

NPSC-2003Gabriela Popa (10,4)(18,4)(28,8)(29,6)(30,4)(31,2)(32,0)(26,9)(27,7) (10,4)(20,0)(30,4) (10,4)(16,5)(26,9)(27,7) (10,4)(17,3)(27,7) (12,0)(18,4)(30,4) (12,0)(20,0)(32,0) (8,5)(18,4)(26,9)(27,7) (9,3)(18,4)(27,7) (7,7)(18,4)(25,11)(26,9)(27,7) (7,7)(20,0)(27,7) (4,10)(18,4)(22,14) ( ,   )(,  )(,  ) 21 st SU(3) irreps corresponding to the highest C 2 values were used in 160 Gd

NPSC-2003Gabriela Popa Tricks Invariants  Invariants Rot(3) SU(3) Tr(Q 2 )  C 2 Tr(Q 3 )  C 3    ~    +  +  +  +   =  tan   + 

NPSC-2003Gabriela Popa SU(3) conserving Hamiltonian: H =  Q   Q + a L 2 + b K J 2 + a sym C 2 + a 3 C 3 this Hamiltonian becomes... + one-body and two-body terms + H s.p.  H s.p.   G  H P  G H P Rewriting H = H sp  +  H sp  +  G  H P  +  G H P +  Q Q + a L 2 + b K J 2 + a sym C 2 + a 3 C 3. System Hamiltonian

NPSC-2003Gabriela Popa Parameters of the Pseudo-SU(3) Hamiltonian Fit to experiment(fine tuning): a, b, a sym and a 3   =   = 0.60  =  = 0.60 From systematics:  = 35/A 5/3 MeV G  = 21/A MeV G  = 19/A MeV h  = 41/A 1/3 MeV

NPSC-2003Gabriela Popa K   0 + K   + K   Gd Exp. Th. Energy spectrum for 160 Gd

NPSC-2003Gabriela Popa Coupling proton and neutron irreps to total (coupled) SU(3):           +      +      +   -   +   +     +     +   -     +   -    +   -     m,l   +  -2m+l   +  +m-2l) k Twist Scissors Scissors + Twist … Orientation of the  - system is quantized with the multiplicity denoted by k = k(m,l) Direct Product Coupling

NPSC-2003Gabriela Popa NucleusB(M1)mode 160,162 Dy(10,4)(18,4)(28,8)(29,6)0.56t (26,9)1.77s (27;7) s+t (27;7) t+s 164 Dy(10,4)(20,4)(30,8)(31,6)0.56t (28,9)1.83s (29,7)1.88s+t (29,7)0.09t+s (    ) (  ) (  )(  ) 1+ M1 Transition Strengths [  2 N ] in the Pure Symmetry Limit of the Pseudo SU(3) Model

NPSC-2003Gabriela Popa Dy e) K = 2 K = g.s. c) Energy [MeV] Exp. Th. Exp. Th. Energy levels of 164 Dy … and M1 Strengths

NPSC-2003Gabriela Popa Er K = 0 K = g.s. Energy [MeV] Exp. Th. a) Energy Levels of 168 Er … and M1 Strengths

NPSC-2003Gabriela Popa Nucleus Experiment Calculated PureSU(3)Theory 160 Dy Dy Dy B(M1)[  N 2 ] Total B(M1) strength (  N 2 )

NPSC-2003Gabriela Popa First excited K=0 + and K=2 + states

NPSC-2003Gabriela Popa

NPSC-2003Gabriela Popa

NPSC-2003Gabriela Popa

NPSC-2003Gabriela Popa

NPSC-2003Gabriela Popa gs a = (36,0)(12,0)x(24,0) b = (28,10)(12,0)x(16,10) c = (20,20)(4,10)x(16,10) SU(3) content in 172 Yb

NPSC-2003Gabriela Popa Conclusions B(E2) transitions within the g.s. band well reproduced ground state, , first and second excited K = 0 + bands well described by a few representations calculated results in good agreement with the low- energy spectra 1 + energies fall in the correct energy range fragmentation in the B(M1) transition probabilities correctly predicted

NPSC-2003Gabriela Popa Conclusions A proper description of collective properties of the first excited K  = 0 + and K=2 + states must take into account the mixing of different SU(3)-irreps, which is driven by the Hamiltonian. A microscopic interpretation of the relative position of the collective band, as well as that of the levels within the band, follows from an evaluation of the primary SU(3) content of the collective states. The latter are closely linked to nuclear deformation. If the leading configuration is triaxial (nonzero  ), the ground and  bands belong to the same SU(3) irrep; if the leading SU(3) configuration is axial (  =0), the K =0 and  bands come from the same SU(3) irrep.

NPSC-2003Gabriela Popa Future work In some nuclei total strength of the M1 distribution is larger than the experimental value Investigate the energy spectra in super-heavy nuclei Investigate the M1 transitions in light nuclei There are new experiments that determine the inter- band B(E2) transitions Improve the model to calculate these transitions Consider the abnormal parity levels Consider the states with J = 1 in the configuration space

NPSC-2003Gabriela Popa