R. F. Casten Yale and MSU-FRIB SSNET17, Paris, Nov.6-10, 2017 A new approximate symmetry for heavy deformed nuclei: Proxy-SU(3) R. F. Casten Yale and MSU-FRIB SSNET17, Paris, Nov.6-10, 2017 Kerman’s warning to RFC (1981) about experimentalists talking about theory: “Experimentalists should not dabble in thought” (This advice should be squared when it comes to group theory!)
Motivation and Goal A simple approximation, a new scheme, Proxy – SU(3) -- present a Nilsson calculation that validates this new scheme What is the starting idea of this scheme? How does the model work? Predicting nuclear shapes -- b and g. Experimental evidence for a prolate-to-oblate shape/phase transition in the rare earth region around neutron number N = 116, in agreement with predictions by microscopic calculations. Consider in the framework of the proxy-SU(3) model, a new approximate symmetry scheme applicable in medium-mass and heavy deformed even-even nuclei The dominance of prolate (American football) over oblate (disk) shapes in the ground states of even-even nuclei is still a puzzling open problem in nuclear structure.
Evolutionary patterns of Structure Regularity suggests some form of symmetry at work Courtesy, R. B. Cakirli
The Path to Symmetry Regularity out of chaos Patterns Simple interpretations Geometry Symmetries – Quantum numbers Algebra
Fermionic Symmetries in the Shell Model Key idea: shell model is based on a harmonic oscillator -- with modifications (such as squaring off of the potential and the spin-orbit force). The harmonic oscillator can be described using group theory in terms of the SU(3) group. The requirement is: A set of single particle shell model levels consisting of orbital angular momenta (of a given parity) spanning from l = 0 (or 1 for odd parity) to some maximum value and that all the single particle total angular momenta, j = l + ½ and j = l- ½, are present. 2s-1d shell in light nuclei: l = 0 2 j = ½ 3/2, 5/2
Fermionic Symmetries in the Shell Model 1950’s: Elliott used this idea to interpret the properties of many light nuclei in the Mg-Ar region in terms of SU(3) in this 2s-1d shell: 2s1/2,1d3/2,1d5/2 Problem in heavier nuclei due to the intruder UPO
Here is the problem H.O H.O Heavier nuclei: 2 features break SU(3) Unique parity “intruder” orbit descends into next lower shell. This gives an extra orbit in that shell and the loss of the highest j orbit from the parent shell. Hence the s.p. levels no longer satisfy the requirements of a harmonic oscillator or SU(3). Example: 50-82: l = 0 2 4 j = ½ 3/2 5/2 7/2 + UPO NO j = 9/2 and extra UPO orbit H.O H.O
Broken symmetries are common in nature Question is: Can some form of SU(3) symmetry (approximate) be recovered in heavy nuclei?? Pseudo-SU(3) is a well known and much studied example that has had success. We want to propose another, called Proxy-SU(3).
Part 1 What is the Proxy symmetry and its motivation? Is it any good?
UPO h11/2 orbit and loss of g 9/2 The Proxy-SU(3) Scheme 82 sdg shell h11/2 (UPO) from the next pfh shell g9/2 lowered to the previous sdg shell UPO h11/2 orbit and loss of g 9/2 ruins SU(3) Solution: replace h11/2 with g9/2 Lose only one orbital UPO 50 40
NOW have full set of sdg l, j l = 0 2 4 J = 1/2, 3/2, 5/2 7/2, 9/2 Normal Proxy UPO NOW have full set of sdg l, j l = 0 2 4 J = 1/2, 3/2, 5/2 7/2, 9/2 Recovers H.O. SU(3). Lose one orbit: 30/32 particles Big problem: Parity issue Spurious matrix elements.
Short answer: Inspired by work on p-n interactions (from masses) Why make this choice? Short answer: Inspired by work on p-n interactions (from masses) Note peaks: largest p-n ints Nilsson orbits K[N, nz, L] 168 Er: p 7/2 [523]; n 7/2 [633] 172 Yb: p 1/2 [411]; n 1/2 [521] 178 Hf: p 7/2 [404]; n 7/2 [514] dK[dN, dnz, dL] = 0[110] Highly overlapping Cakirli et al, PRC 82, 061304(R) (2010).
Spatial overlaps (yp2 yn2) of Nils. wave functions 0 [110] Overlap: 0.804 ½ [521] ½ [411] 0 [330] Overlap: 0.616 ½ [631] ½ [301]
Inspired the idea to focus on proton-proton and neutron-neutron orbits related by 0[110] as well
The Proxy Approximation - look at Nilsson orbits, quantum numbers, for these two h11/2 and g9/2 orbits Original shell model orbits Proxy-SU(3) orbits 0[110] dK[dN, dnz, dL] 0[110] No partner minor role A. Martinou
Spurious matrix elements: number and size Proxy Nilsson Hamiltonian matrix Spurious matrix elements: number and size Small off-diag and few: ~ 3- 5% So, maybe not so bad. We will see.
How to test if the spurious matrix elements are a real problem How to test if the spurious matrix elements are a real problem? Calculate a Nilsson diagram and see how different it is from the normal one.
How Good ? Fermionic SU(3) –Valid for deformed nuclei Nilsson diagrams for the N = 82-126 shell in normal and Proxy shells Similarity is clear Greater curvatures g9/2 orbitals interact with normal parity ones while h11/2 orbitals do not. Spurious result of approx scheme Similarity suggests proxy scheme is not too bad. Better the bigger the shell – heavy nuclei. So we will use it to predict some nuclear properties. For shell with N proxy particles, relevant group is U(N/2) which has sub-group SU(3). e.g., for 50-82, Proxy-SU(3) accounts for 30 particles, so U(15) > SU(3) For other shells same similarity Bigger the shell, better the approx heavy nuclei
Now lets look at how to predict things with this scheme. Now that we did this, we see that the Proxy substitution is not so bad. So, forget all the Nilsson stuff – that was just to vet the idea. Now lets look at how to predict things with this scheme. Start with ground state properties. Fermion Proxy SU(3) symmetry – need SU(3) quantum numbers. Called (l, m). These categorize sets of states. Analogy, a bosonic SU(3) Part 2
Typical Bosonic SU(3) Scheme (l, m) K bands in (l,m ) : K = 0, 2, 4, - - - - m Series of bands labelled by SU (3) Irreps. Note: Ground state band is (2N,0) where 2N is the number of valence nucleons. Need to get analogous irreps for Proxy SU(3).
Magical group theory stuff happens here Proxy-SU(3): For shell with N particles, group is U(N/2) with sub-group SU(3). Identify ground state with highest weight irreps labeled by SU(3) quantum numbers: (l, m) Magical group theory stuff happens here p -h asymm comes from Pauli Principle: asymmetric predictions of b, g (see Talk by Cakirli)
Combined (proton + neutron) Proxy-SU(3) irreps
Relation of (l, m) to (b, g) Relation obtained through a linear mapping between the eigenvalues of the invariant operators of the collective model, β2 and β3 cos 3γ, and the eigenvalues of the invariants of SU(3). The basic idea behind this approach is that if the invariant quantities of two theories are used to describe the same physical phenomena, their measures must agree. The derivation is based on the fact that SU(3) contracts to the quantum rotor algebra for low values of angular momentum and large values of the second order Casimir operator of SU(3). Large values of C2 occur for large values of λ and/or μ. The SU(3) irreps appearing in the Tables have λ and/or μ large, thus the use of the contraction limit is justified in these cases.
The next talk, by R. Burcu Cakirli, will start from here and discuss practical applications of this model for predicting nuclear shapes, and their comparison with the data. See also: Phys. Rev. C95, 064325(2017): Proxy-SU(3) symmetry in heavy deformed nuclei Phys. Rev. C95, 064326(2017): Analytic predictions for nuclear shapes, prolate dominance, and the prolate-oblate shape transition in the proxy-SU(3) model
Summary A new shell model scheme, based on an physics-motivated orbit substitution, recovers an approx SU(3) symmetry applicable to heavy deformed nuclei The Proxy Scheme is extremely simple but also has inherent flaws whose significance is assessed The result is a set of analytic parameter-free predictions for nuclear ground state shapes and shape changes. Needed improvements (e.g., incorporation of pairing) and extensions (e.g., higher intrinsic excitations)
THANKS Collaborators Dennis Bonatsos Nikolay Minkov R. Burcu Cakirli Klaus Blaum Andriana Martinou I.E. Assimakus S. Sarantopoulou THANKS