Single Particle and Collective Modes in Nuclei
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Single Particle and Collective Modes in Nuclei
Lecture SeriesR. F. CastenWNSL, YaleSept., 2008
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TINSTAASQ
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So, an example of a really really stupid question that leads to a useful discussion:
Are nuclei blue?
nucleus
You disagree?
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Sizes and forces
Uncertainty Principle: E t > h m x/c > h
Nuclear force mediated by pion exchange: m ~ 140 MeV
Range of nuclear force / nuclear sizes ~ fermis
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Uncertainty Principle: x p > h
Characteristic nuclear energies are 105 times atomic energies: 10 ev 1 MeV
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Probes and “probees”
E = h /
Energy of probe correlated with sizes of probee and production devicesAtoms – lasers – table top
Nuclei – tandems, cyclotrons, etc – room sizeQuarks, gluons – LHC – city size
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Overview of nuclear structure
also
Some preliminaries
Independent particle modeland clustering in simple potentials
Concept of collectivity
(Note: many slides are VG images – and contain typos I can’t easily correct)
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1 12 4 2( ; )B E
1000 4+
2+
0
400
0+
E (keV) Jπ
Sim
ple
Ob
serv
able
s -
Eve
n-E
ven
Nu
clei
1 12 2 0( ; )B E
212 2
2 1( ; )i f i f
i
B E J J EJ
. .
)2(
)4(
1
12/4
E
ER
Masses
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Evolution of structure – First, the data
• Magic numbers, shell gaps, and shell structure
• 2-particle spectra
• Emergence of collective features, deformation and rotation
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The magic numbers:” special benchmark numbers of nucleons
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B(E2: 0+1 2+
1) 2+1 E20+
122+
0+
Be astonished by this: Nuclei with 100’s of nucleons orbiting 1021 times/s, not colliding, and acting in concert !!!
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The empirical magic numbers near stability
• 2, 8, 20, 28, (40), 50, (64), 82, 126
• This is the only thing I ask you to memorize.
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“Magic plus 2”: Characteristic spectra
)2(
)4(
1
12/4
E
ER < 2.0
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What happens with both valence neutrons and protons? Case of few valence nucleons:
Lowering of energies, development of multiplets. R4/2 ~2
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Vibrator (H.O.)
E(I) = n ( 0 )
R4/2= 2.0
Spherical vibrational
nuclei
n = 0,1,2,3,4,5 !!n = phonon No.
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Neutron number 68 70 72 74 76 78 80 82
Val. Neutr. number 14 12 10 8 6 4 2 0
(Z = 52)
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Lots of valence nucleons of both types
R4/2 ~3.33
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0+2+4+
6+
8+
Rotor
E(I) ( ħ2/2I )I(I+1)
R4/2= 3.33
Deformed nuclei – rotational spectra
BTW, note value of paradigm in
spotting physics (otherwise invisible)
from deviations
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Broad perspective on structural evolution: R4/2
Note the characteristic, repeated patterns
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Sudden changes in R4/2 signify changes in structure, usually from spherical to deformed structure
Onset of deformation Onset of deformation as a phase transition
Sph.
Def.
Sph.
Def.
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1/E2 – Note
similarity to R4/2
Observable
Nucleon number, Z or N
R4/2
E2
E2, or 1/E2,
is among the first pieces of data
obtainable in nuclei far from stability. Can we use just this quantity
alone?
Another, simpler observable
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B(E2; 2+ 0+ )
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Basic Models
• (Ab initio calculations using free nucleon forces, up to A ~ 12)
• (Microscopic approaches, such as Density Functional Theory)
• Independent Particle Model Shell Modeland its extensions to weakly bound nuclei
• Collective Models – vibrator, transitional, rotor
• Algebraic Models – IBA
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One on-going success story
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Independent particle model: magic numbers, shell structure, valence nucleons.
Three key ingredients
Vij
r
Uir = |ri - rj|
Nucleon-nucleon force – very
complex
One-body potential – very simple: Particle
in a box~This extreme approximation cannot be the full story.
Will need “residual” interactions. But it works surprisingly well in special cases.
First:
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3
2
1
Energy ~ 1 / wave length
n = 1,2,3 is principal quantum number
E up with n because wave length is shorter
Particles in a “box” or “potential”
well
Confinement is origin of
quantized energies levels
Second key ingredient: Quantum mechanics
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=
-
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22 2
2 2( ) ( 1)( ) ( ) 0
2 2nl
nl nld R rh h l lE U r R r
m mdr r
Radial Schroedinger
wave function
Higher Ang Mom: potential well is raised and squeezed. Wave functions have smaller wave lengths. Energies rise
But nuclei are 3- dimensional. What’s new in 3-dimensions?Angular momentum, hence centrifugal effects.
Energies also rise with principal quantum number, n.
Hence raising one and lowering the other can lead to similar energies and
to “level clustering”:
H.O: E = ħ (2n+l) E (n,l) = E (n-1, l+2) e.g., E (2s) = E (1d) Add spin-orbit force
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nlj: Pauli Prin. 2j + 1 nucleons
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Too low by 10
Too low by 12
Too low by 14
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We can see how to improve the
potential by looking at nuclear Binding
Energies.
The plot gives B.E.s PER nucleon.
Note that they saturate. What does
this tell us?
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Consider the simplest possible model of nuclear binding.
Assume that each nucleon interacts with n others. Assume all such interactions are equal.
Look at the resulting binding as a function of n and A. Compare
this with the B.E./A plot.
Each nucleon interacts with 10 or so others. Nuclear force is short
range – shorter range than the size of heavy nuclei !!!
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~
Compared to SHO, will mostly affect orbits at large radii – higher angular momentum states
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So, modify Harm. Osc. By squaring off
the outer edge. Then, add in a spin-
orbit force that lowers the energies of the
j = l + ½
orbits and raises those with
j = l – ½
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Pauli Principle
• Two fermions, like protons or neutrons, can NOT be in the same place at the same time: can NOT occupy the same orbit.
• Orbit with total Ang Mom, j, has 2j + 1 substates, hence can only contain 2j + 1 neutrons or protons.
This, plus the clustering of levels in simple potentials, gives nuclear SHELL STRUCTURE
Third key ingredient
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Clusters of levels + Pauli Principle magic numbers, inert cores
Concept of valence nucleons – key to structure. Many-body few-body: each body counts.
Addition of 2 neutrons in a nucleus with 150 can drastically alter structure
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a)
Hence J = 0
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Applying the Independent Particle Model to real Nuclei
• Some great successes (for nuclei that are “doubly magic plus 1”).
• Clearly fails totally with more than a single particle outside a doubly magic “core”. In fact, in such nuclei, it is not even defined.
• Residual interactions to the rescue. (We will discuss extensively.)
• Further from closed shells, collective phenomena emerge (as a result of residual interactions). What are these interactions? Many models.
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• Residual interactions
– Pairing – coupling of two identical nucleons to angular momentum zero. No preferred direction in space, therefore drives nucleus towards spherical shapes
– p-n interactions – generate configuration mixing, unequal magnetic state occupations, therefore drive towards collective structures and deformation
– Monopole component of p-n interactions generates changes in single particle energies and shell structure
Shell model too crude. Need to add in extra interactions among valence nucleons outside closed
shells.
These dominate the evolution of Structure
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Independent Particle Model – Uh –oh !!!Trouble shows up
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Mottelson – ANL, Sept. 2006
Shell gaps, magic numbers, and shell structure are not merely details but are fundamental to our understanding of one of the most basic features of nuclei – independent particle motion. If we don’t understand the basic quantum levels of nucleons in the nucleus, we don’t understand nuclei. Moreover, perhaps counter-intuitively, the emergence of nuclear collectivity itself depends on independent particle motion (and the Pauli Principle).
Shell Structure
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Backups
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So, we will have a Hamiltonian
H = H0 + Hresid.
where H0 is that of the Ind. Part. Model
The eigenstates of H will therefore be mixtures of those of H0
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Wave fcts:
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