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Discovery of a Quasi Dynamical Symmetry and Study of a possible Giant Pairing Vibration. R.F. Casten WNSL, Yale May 11,2011. Evidence for a Quasi Dynamical Symmetry along the arc of regularity with an intro to the relevant Group Theory of dynamical symmetries
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Discovery of a Quasi Dynamical Symmetry and Study of a possible Giant Pairing Vibration R.F. Casten WNSL, Yale May 11,2011 • Evidence for a Quasi Dynamical Symmetry along the arc of regularity with an intro to the relevant Group Theory of dynamical symmetries • What and where is the Giant Pairing Vibration and why?
Symmetries, degeneracies, and Group theory • Illustrate using the IBA • Valence nucleons, in pairs as bosons. Number of bosons is half number of valence nucleons – fixed for a given nucleus. • Only certain configurations. Only pairs of • nucleons coupled to angular momentum • 0(s) and 2(d). N = ns + nd • Simple Hamiltonian in terms of s an d boson creation, destruction operators – simple interactions • Group theoretical underpinning
Group Structure of the IBA U(5) vibrator Sph. SU(3) rotor O(6) γ-soft 6-Dim. problem U(6) Magical group theory stuff happens here R4/2= 2.5 Three Dynamic symmetries, nuclear shapes Symmetry Triangle of the IBA Def. R4/2= 2.0 R4/2= 3.33
Arc of RegularityOrder amidst chaos An isolated region of regularity inside the triangle The boundary distinguishing different structural regions Degeneracies along the arc The first example of an SU(3) Quasi-dynamical symmetry in nuclei
U(5) – Vibrator – Order and regularity 6+,4+,3+,2+,0+ 3 2 4+,2+,0+ 1 2+ 0 0+ nd
SU(3) – Rotor – Order and regularity SU(3) O(3)
What happens inside the triangle? Whelan, Alhassid, ca 1989
+2.0 +2.9 +1.4 +0.4 +0.1 -1 -0.1 -0.4 -2.0 -3.0
Let’s illustrate group chains and degeneracy-breaking. Consider a Hamiltonian that is a function ONLY of: s†s + d†d That is: H = a(s†s + d†d) = a (ns + nd ) = aN H “counts” the numbers of bosons and multiplies by a boson energy, a. The energies depend ONLY on total number of bosons -- the total number of valence nucleons. The states with given N are degenerate and constitute a “representation” of the group U(6) with the quantum number N. U(6) has OTHER representations, corresponding to OTHER values of N, but THOSE states are in DIFFERENT NUCLEI. Of course, a nucleus with all levels degenerate is not realistic (!!!) and suggests that we should add more terms to the Hamiltonian. I use this example to illustrate the idea of successive steps of degeneracy breaking related to different groups and the quantum numbers they conserve. Note thats†s = ns and d†d = nd and that ns + nd = N = ½ val nucleons
H = H + b d†d = aN + b nd Now, add a term to this Hamiltonian Now the energies depend not only on N but also on nd States of different ndare no longer degenerate. They are “representations” of the group U(5).
H = aN + b d†d = a N + b nd U(6) U(5) N + 2 2a N + 1 a 2 2b Etc. with further terms 1 b N 0 0 0 nd E U(6) U(5) H = aN + b d†d
Example of a nuclear dynamical symmetry -- O(6) Spectrum generating algebra • Each successive term: • Introduces a new sub-group • A new quantum number to label the states described by that group • Adds an eigenvalue term that is a function of the new quantum number, and thus • Breaks a previous degeneracy N
Quasi-dynamical symmetries • Dynamical symmetries where some or all of the degeneracies and quantum numbers of the symmetry are preserved despite large changes in the wave functions from those of the symmetry itself. • Are there such QDS in the “triangle”? • Long standing question for 20 years.
Degeneracies along the Arc of RegularityAll of them persist as well as the analytic ratios of the 0+ “bandheads” First example of a non-trivial QDS in nuclei
Search for the Giant Pairing Vibration • What is the GPV • Where should it be and why don’t we see it • The experimental situation and hopes • Why it may not be where we think it should be • a little known feature of mixing of bound and unbound states
Pairing in nuclei Pair correlations in nucleonic motion have provided a key to understanding the excitation spectra of even-A nuclei, including the famous pairing gap, compression of energies in odd-A nuclei, odd-even mass differences, rotational moments of inertia, and other phenomena. Pairing “vibrations” were predicted and discovered around 1970, confirming simple models of these 2-particle states. The Giant Pairing Vibration – a pairing mode in the next higher major shell – should also exist, roughly at ~ 14 MeV in heavy nuclei, and be strongly populated in Q-matched two-nucleon transfer reactions. As pairing is such a fundamental feature of nuclei, searches for the GPV are extremely important. However, they have never been seen, despite extensive searches.
Pairing Vibrations 0+ states 132Sn(t,p) 134Sn Collective mode: The two nucleons occupy many final 0+ levels with coherent wave functions Strongly populated in 2-nucleon transfer reactions like (p,t) and (t,p). This PAIR transfer is exactly analogous to the quadrupole phonon creation in the GEOMETRIC VIBRATOR model. Multi-phonon states. Extensively studied in 1970’s. Model verified
Pairing Vibrations 0+ states 132Sn(p,t) 130Sn Pair Removal mode (different cross section than pair addition)
Concept of Pairing Vibrations(analogy to geometrical vibrational phonon model except there are two modes – pair creation and pair removal) 3B 3A A B 2B 2A B A
Giant Pairing Vibration 90Zr(t,p) 92Zr Collective mode TWO shells up: The two nucleons occupy many final 0+ levels with coherent wave functions. Predicted at energies from ~ 7 to ~14 Mev by different models Should be strongly populated in 2-nucleon transfer reactions like (p,t) and (t,p). Never found – why?
Why has the GPV never been observed? • Despite efforts using conventional pair transfer reactions, such as (t, p) and (p,t) (G. M. Crawley et al., Phys. Rev. Lett. 39 (1977) 1451), the GPV has never been identified. • Fortunatoet al. (Eur. Phys. J. A14 (2002) 37) suggests • that beams, such as t or 14C, do not favor excitation of high-energy collective pairing modes due to a large energy mismatch. • Q-values in a stripping reaction involving weakly bound 6He are much • closer to the optimum.
Some Recent Calculations L. Fortunatoet al.,somewhere L. Fortunato, Yad. Fiz. 66 (2003) 1491 • pp RPA calculations on 208Pb. • Two-neutron transfer form factors • from collective model • DWBA (Ptolemy) calculation of sGPV
What we did and why(progress report, not final story) • Basic idea is that mixing with UNbound levels with widths, has two effects: • Gives width to GPV, making it hard to see –spread out in energy • Increases its energy relative to mixing with bound levels
2-Level mixing Normal mixing of bound levels Mixing of bound level with unbound level GPV Lower level (GPV) gets width and is lowered LESS
Width of upper unperturbed level (Constant mixing matrix element)
Principal Collaborators QDS Dennis Bonatsos Libby McCutchan Jan Jolie Robert Casperson GPV Augusto Macchiavelli Rod Clark Michael Laskin With huge help from Peter von Brentano and Hans Weidenmuller who actually understand the mixing of bound and unbound levels THANKS ! Summary: QDS + GPV
What happens inside the triangle? Whelan, Alhassid, ca 1989
Investigating the Giant Pairing Vibration • Fundamental excitation mode of the nucleus predicted nearly 30 years ago • (R. A. Broglia and D. R. Bès, Phys. Lett. B69 (1977) 129), but never seen. • Schematic of the dispersion relation. The two bunches of vertical lines represent • the unperturbed energy of a pair of particles placed in a given potential. The GPV • is the collective state relative to the second major shell. • The GPV is a coherent superposition of pp excitations analogous to the more • familiar Giant Shape Vibrations based on ph excitations.
Rutherford Counter Annular Si DE-E detectors Thin Au foil a 6He 208Pb target ~10 mg/cm2 Experimental Considerations 6He beams with EBEAM~4-7 MeV/A at intensities of I≥106 particles/sec. Experimental set-up is simple: L=0 transfer favors forward scattering angles Rate estimate: Target = 10 mg/cm2 sGPV = 3mb 2000 counts/day in GPV eDET = 25% IBEAM = 106 p/s
3 2 1 0 nd 6+, 4+, 3+, 2+, 0+ 4+, 2+, 0+ 2+ 0+ Dynamical Symmetries Note regularities, degeneracies U(5) -- vibrator SU(3) -- Deformed rotor