p461 - nuclear decays1 nuclear decays unstable nuclei can change n,z.a to a nuclei at a lower energy...
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P461 - nuclear decays 1
Nuclear Decays
• Unstable nuclei can change N,Z.A to a nuclei at a lower energy (mass)
• If there is a mass difference such that energy is released, pretty much all decays occur but with very different lifetimes.
• have band of stable particles and band of “natural” radioactive particles (mostly means long lifetimes). Nuclei outside these bands are produced in labs and in Supernovas
• nuclei can be formed in excited states and emit a gamma while cascading down.
/:
:1
4242
eNN
HeNNAn
ZAZ
An
ZAZ
P461 - nuclear decays 2
General Comments on Decays
• Use Fermi Golden rule (from perturbation theory)
• rate proportional to cross section or 1/lifetime• the matrix element connects initial and final states where V
contains the “physics” (EM vs strong vs weak coupling and selection rules)
• the density of states factor depends on the amount of energy available. Need to conserve momentum and energy “kinematics”. If large energy available then higher density factor and higher rate.
• Nonrelativistic (relativistic has 1/E also. PHYS684)
dVolumeVV
Vrate
fiif
fif
*
2||2
particleeachdEdpp iiif2
P461 - nuclear decays 3
Simplified Phase Space• Decay: A a + b + c …..
• Q = available kinetic energy
• large Q large phase space higher rate
• larger number of final state products possibly means more phase space and higher rate as more variation in momentums. Except if all the mass of A is in the mass of final state particles
• 3 body has little less Q but has 4 times the rate of the 2 body (with essentially identical matrix elements)
)( statefinalmMassQ iA
MeVQ
bodyDB
MeVQ
bodyDB
250513977018655279
3
264477018655279
2
00
0
P461 - nuclear decays 4
Phase Space:Channels• If there are multiple decay channels, each adds to
“phase space”. That is one calculates the rate to each and then adds all of them up
• single nuclei can have an alpha decay and both beta+ and beta- decay. A particle can have hundreds of possible channels
• often one dominates
• or an underlying virtual particle dominates and then just dealing with its “decays”
• still need to do phase space for each….
mesonsKs
eduWWsc
,,,
P461 - nuclear decays 5
Lifetimes• just one channel with N(t) = total number at time t
• multiple possible decays. Calculate each (the “partial” widths) and then add up
• Measure lifetime. long-lived (>10-8sec). Have a certain number and count the decays
2ln1
)0()(
2/1
tlifehalft
eNtNNdt
dN t widthgammaRate 1
iifractionbranching
321
1
1/
N
dtdN
P461 - nuclear decays 6
Lifetimes• Measure lifetime.
medium-lived (>10-13sec). Decay point separated from production point. Measure path length. Slope gives lifetime
• short-lived (10-23 < -16 sec). Measure invariant mass of decay products. If have all mass of initial. Width of mass distributions (its width) related to lifetime by Heisenberg uncertainty.
100
10
1
x
tcx
t
ex
eextxt
tit
/22
2/
)(
)(),(
MeVE
tEM
10010
sec1020
20
P461 - nuclear decays 7
Alpha decay• Alpha particle is the He nucleus (2p+2n)
• ~all nuclei Z > 82 alpha decay. Pb(82,208) is doubly magic with Z=82 and N=126
• the kinematics are simple as non-relativistic and alpha so much lighter than heavy nuclei
• really nuclear masses but can use atomic as number of electrons do not change
22
XXXX NNZZ
XX
MeVQA
AKE
smallm
pTpp
mmmQ
XXX
HeXX
944
2
2
P461 - nuclear decays 8
Alpha decay-Barrier penetration• One of the first applications of QM was by Gamow
who modeled alpha decay by assuming the alpha was moving inside the nucleus and had a probability to tunnel through the Coulomb barrier
• from 1D thin barrier (460) for particle with energy E hitting a barrier potential V and thickness gives Transmission = T
• now go to a Coulomb barrier V= A/r from the edge of the nucleus to edge of barrier and integrate- each dr is a thin barrier
)(2
)1(16 2
EVmk
eV
E
V
ET ka
K
ZerdrE
r
ZemT c
r
r
c
n 0
2
0
2
2 4
2)
4
2(
22exp(
P461 - nuclear decays 9
Alpha decay-Barrier penetration• this integral isn’t easy, need approximations
• see nuclear physics textbook (see square) Get
• where K = kinetic energy of alpha. Plug in some numbers
• see
www.haverford.edu/physics-astro/songs/alpha.htm
K
ZerdrE
r
ZemT c
r
r
c
n 0
2
0
2
2 4
2)
4
2(
22exp(
)2/2exp(
)/2exp(2
2
KMzZe
vzZeT
31104)70exp(
)62
9314
197
)4.1(9022exp(
T
MeV
MeV
MeVF
MeVFT
P461 - nuclear decays 10
Alpha decay-Barrier penetration• Then have the alpha bouncing around inside the
nucleus. It “strikes” the barrier with frequency
•
• the decay rate depends on barrier height and barrier thickness (both reduced for larger energy alpha) and the rate the alpha strikes the barrier
• larger the Q larger kinetic energy and very strong (exponential) dependence on this
• as alpha has A=4, one gets 4 different chains (4n, 4n+1, 4n+2, 4n+3). The nuclei in each chain are similar (odd/even, even/even, etc) but can have spin and parity changes at shell boundaries
• if angular momentum changes, then a suppression of about 0.002 for each change in L (increases potential barrier)
Nr
velocityf
2
2
2
2
)1(
mr
ll
P461 - nuclear decays 12
Alpha decay-Energy levels• may need to have orbital angular momentum if
sub-shell changes (for odd n/p nuclei)
• Z= 83-92 1h(9/2) N=127-136 2g(9/2) Z=93-100 2f(7/2) N=137-142 3d(5/2)
• so if f(7/2) h(9/2) need L>0 but parity change if L=1 L=2,4
• or d(5/2) g(9/2) need L>1. No parity change L=2,4
• not for even-even nuclei (I=0). suppression of about 0.002 for each change in L (increases potential barrier) s 0
p 1
d 2
f 3
g 4
h 5
P461 - nuclear decays 13
Parity + Angular Momentum Conservation in Alpha decay
• X Y + . The spin of the alpha = 0 but it can have non-zero angular momentum. Look at Parity P
• if parity X=Y then L=0,2…. If not equal L=1,3…
• to conserve both Parity and angular momentum
6,4
3)(
)2,(3141#
)6,(1143#
25
211
25
2/5
211
2/11
231235
orbital
orbital
L
L
lddn
liin
ThU
lorbitorbitYX PPPPPP )1(,1
P461 - nuclear decays 15
Lifetime vs Energy in Alpha Decays
log10 half-life in years
10
0
-10
Alpha Energy MeV
Perlman, Ghiorso, Seaborg, Physics Review 75, 1096 (1949)
75
P461 - nuclear decays 16
Beta Decays
• Beta decays are proton neutrons or neutron proton transitions
• involve W exchange and are weak interaction
• the last reaction is electron capture where one of the atomic electrons overlaps the nuclei. Same matrix element (essentially) bit different kinematics
• the semi-empirical mass formula gives a minimum for any A. If mass difference between neighbors is large enough, decay will occur
)(
)(
)(
,1,
,1,
,1,
nepMMe
peneMM
nepeMM
eAZAZ
eAZAZ
eAZAZ
P461 - nuclear decays 17
Beta Decays - Q Values
• Determine Q of reactions by looking at mass difference (careful about electron mass)
• 1 MeV more Q in EC than beta+ emission. More phase space BUT need electron wavefunction overlap with nucleus.....
YX
eYeYeXe
eAZAZ
eYX
eeYeYeX
eAZAZ
eYYX
eeYeYeX
eAZAZ
AMAMQ
KKKZmmZmmm
YXeEC
mAMAMQ
KKmKZmmZmm
eYX
KKKAMAtomicMassQ
KKmKZmmZmm
eYX
)()(
:
2
)()(
:
)()(
:
,1,
,1,
,1,
P461 - nuclear decays 18
Beta+ vs Electron Capture
• Fewer beta+ emitters than beta- in “natural” nuclei (but many in “artificial” important in Positron Emission Tomography - PET)
• sometimes both beta+ and EC for same nuclei. Different widths• sometimes only EC allowed
• monoenergetic neutrino. E=.87 MeV. Important reaction in the Sun. Note EC rate different in Sun as it is a plasma and not atoms
7374
74
73
00055.2200093.
01693.7
01600.7
LieBe
umuM
uMBe
uMLi
e
P461 - nuclear decays 19
Beta+ vs Electron Capture
• from Particle Data Group
eHpp 2
LieBe 77
eBeB 88
P461 - nuclear decays 20
Beta Decay - 3 Body• The neutrino is needed to conserve angular
momentum
• (Z,A) (Z+1,A) for A=even have either Z,N even-even odd-odd or odd-oddeven-even
• p,n both spin 1/2 and so for even-even or odd-odd nuclei I=0,1,2,3…….
• But electron has spin 1/2 I(integer) I(integer) + 1/2(electron) doesn’t conserve J
• need spin 1/2 neutrino. Also observed that electron spectrum is continuous indicative of >2 body decay
• Pauli/Fermi understood this in 1930s electron neutrino discovered 1953 (Reines and Cowan) muon neutrino discovered 1962 (Schwartz +Lederman/Steinberger) tau neutrino discovered 2000 at Fermilab
P461 - nuclear decays 21
3 Body Kinematics• While 3 body the nuclei are very heavy and easy
approximation is that electron and neutrino split available Q (nuclei has similar momentum)
• maximum electron energy when E(nu)=0
• example
Qm
mmmmmmmEK
mm
mmmE
energyconserveEmEm
momentumconservepp
EleteYX
x
eyxeyxeee
x
eyxe
yex
ey
2
))((
)(2
)(
0
222
max
22
smallkeVm
pK
m
EMeVmEp
MeVQm
mm
eAlMg
Al
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e
2.02
5.5,75.2
8.200055.
981.26,9843.26
2
22
13,2712,27
13271227
P461 - nuclear decays 22
Beta decay rate• Start from Fermi Golden Rule
• first approximation (Fermi). Beta=constant=strength of weak force
• Rule 1: parity of nucleus can’t change (integral of odd*even=0)
• Rule 2: as antineutrino and electron are spin 1/2 they add to either 0 or 1. Gives either
dM
MRates
F
Final
*
2||2
dMMM ZZ *1
01
)010(1:
00
0:
16221532
20422142
1
eSP
notiTellerGamow
eCaSc
iiiFermi AZZA
P461 - nuclear decays 23
Beta decay rate II• Orbital angular momentum suppression of 0.001
for each value of L (in matrix element calculation)
• look at density of states factor. Want # quantum states per energy interval
• we know from quantum statistics that each particle (actually each spin state) has
• 3 body decay but recoil nucleus is so heavy it doesn’t contribute
n
nnFinal dE
dNMRates 2||
2
11
0218361736
Li
eCaSc
dph
pdN
3
2
4
cKQp
dph
pdp
h
pdN
e
ee
/)(
443
2
3
2
P461 - nuclear decays 24
Beta decay rate III• Conservation of energy allows one to integrate over
the neutrino (there is a delta function)
• this gives a distribution in electron momentum/energy which one then integrates over. (end point depends on neutrino mass)
• F is a function which depends on Q. It is almost loqrithmic
eeee
ee
Finale
mmpK
hc
KQ
h
pM
Mdp
dNRates
2/122
3
2
3
22
2
)(
)(
)(44||
2
||2
)(||2
1max
273
45
ee EFMcm
TRate
maxloglog eKAF
P461 - nuclear decays 25
4.4
max
3
5.log4.4loglog
KF
KKAF e
actual. not “linear” due to electron mass
P461 - nuclear decays 26
Beta decay rate IV• FT is “just kinematics”
• measuring FT can study nuclear wavefunctions M’ and strength of the weak force at low energies
• lower values of FT are when M’ approaches 1
• beta decays also occur for particles
• electron is now relativistic and E=pc. The integral is now easier to do. For massive particles (with decay masses small), Emax = M/2 and so rate goes as fifth power of mass
e
e
eK
e
0
0
30/)( 5max
22max
0
EdppKQ ee
p
e
P461 - nuclear decays 27
Beta decay rate V• M=M’ is strength of weak interaction. Can
measure from lifetimes of different decays
• characteristic energy
• strong energy levels ~ 1 MeV
• for similar Q, lifetimes are about
3362 10010 FeVmjoule
eVF
FeV
vol1.0
)10(
*1003
3
147 1010 strengthrelativestrong
weak
s
s
s
weak
EM
strong
10
16
23
10
10
10
P461 - nuclear decays 28
Parity Violation in Beta Decays
• The Parity operator is the mirror image and is NOT conserved in Weak decays (is conserved in EM and strong)
• non-conservation is on the lepton side, not the nuclear wave function side
• spin 1/2 electrons and neutrinos are (nominally) either right-handed (spin and momentum in same direction) or left-handed (opposite)
• Parity changes LH to RH
•
),,(),,(
),,(),,(
rrP
zyxzyxP
RH
LHLprLP
ppP
)(
)(
P461 - nuclear decays 29
“Handedness” of Neutrinos
• “handedness” is call chirality. If the mass of a neutrino = 0 then:
• all neutrinos are left-handed all antineutrinos are right-handed
• Parity is maximally violated
• As the mass of an electron is > 0 can have both LH and RH. But RH is suppressed for large energy (as electron speed approaches c)
• fraction RH vs LH can be determined by solving the Dirac equation which naturally incorporates spin
P461 - nuclear decays 30
Polarized Beta Decays
• Some nuclei have non-zero spin and can be polarized by placing in a magnetic field
• magnetic moments of nuclei are small (1/M factor) and so need low temperature to have a high polarization (see Eq 14-4 and 14-5)
• Gamow-Teller transition with S(e-nu) = 1
• if Co polarized, look at angular distribution of electrons. Find preferential hemisphere (down)
21
21
6060
,45
sii
eNiCo
Co
Pnu
pe
Spin antinu-RH
Spin e - LH
P461 - nuclear decays 31
Discovery of Parity Violation in
Beta Decay by C.S. Wu et al. • Test parity conservation by observing a
dependence of a decay rate (or cross section) on a term that changes sign under the parity operation. If decay rate or cross section changes under parity operation, then the parity is not conserved.
• Parity reverses momenta and positions but not angular momenta (or spins). Spin is an axial vector and does not change sign under parity operation.
neutron
Pe
Pe
mirror
Beta decay of a neutron in a real andmirror worlds:If parity is conserved, then the probability of electron emission at is equal to that at 180o-.Selected orientation of neutron spins - polarisation.
P461 - nuclear decays 32
Wu’s experiment• Beta-decay of 60Co to 60Ni*. The
excited 60Ni* decays to the ground state through two successive emissions.
• Nuclei polarised through spin alignment in a large magnetic field at 0.01oK. At low temperature thermal motion does not destroy the alignment. Polarisation was transferred from 60Co to 60Ni nuclei. Degree of polarisation was measured through the anisotropy of gamma-rays.
• Beta particles from 60Co decay were detected by a thin anthracene crystal (scintillator) placed above the 60Co source. Scintillations were transmitted to the photomultiplier tube (PMT) on top of the cryostat.
P461 - nuclear decays 33
Wu’s results
• Graphs: top and middle - gamma anisotropy (difference in counting rate between two NaI crystals) - control of polarisation; bottom - asymmetry - counting rate in the anthracene crystal relative to the rate without polarisation (after the set up was warmed up) for two orientations of magnetic field.
• Similar behaviour of gamma anisotropy and beta asymmetry.
• Rate was different for the two magnetic field orientations.
• Asymmetry disappeared when the crystal was warmed up (the magnetic field was still present): connection of beta asymmetry with spin orientation (not with magnetic field).
• Beta asymmetry - Parity not conserved
P461 - nuclear decays 34
Gamma Decays
• If something (beta/alpha decay or a reaction) places a nucleus in an excited state, it drops to the lowest energy through gamma emission
• excited states and decays similar to atoms
• conserve angular momentum and parity
• photon has spin =1 and parity = -1
• for orbital P= (-1)L
• first order is electric dipole moment (edm). Easier to have higher order terms in nuclei than atoms
)1)(1)(1()1(
...,102
,023
*
LNfinal PPP
momquadeL
edmL
NN
P461 - nuclear decays 35
Gamma Decays
1;202
)(122
32
*
LGTi
changePLGT
GT
NN
E MeV
5
0
3817Cl 3818Ar26%
11%
53%
2
0
2
3gamma
gamma
1
;102
;023
PL
eqmL
edmL
conserve angular momentum and parity. lowest order is electric dipole moment. then quadrapole and magnetic dipole
P461 - nuclear decays 36
Mossbauer Effect
• Gamma decays typically have lifetimes of around 10-10 sec (large range). Gives width:
• very precise
• if free nuclei decays, need to conserve momentum. Shifts gamma energy to slightly lower value
• example. Very small shift but greater than natural width
eVeVs
E 510
15
10sec10
10
)2
1(2 *
*22
*
M
MM
M
MMEpp
AA
A
AAA
eVMeVE
MMeVM
005.13.
5.931*191,13.
P461 - nuclear decays 37
Mossbauer Effect II
• Energy shift means an emitted gamma won’t be reabsorbed
• but if nucleus is in a crystal lattic, then entire lattice recoils against photon. Mass(lattice)infinity and Egamma=deltaM. Recoiless emission (or Mossbauer)
• will have “wings” on photon energy due to lattice vibrations
• Mossbauer effect can be used to study lattice energies. Very precise. Use as emitter or absorber. Vary energy by moving source/target (Doppler shift) (use Iron. developed by R. Preston, NIU)
MeVEAA
MeVEAA
000000005.13.
000000005.13.*
*
P461 - nuclear decays 38
Nuclear Reactions, Fission and Fusion
• 2 Body reaction A+BC+D
• elastic if C/D=A/B
• inelastic if mass(C+D)>mass(A+B)
• threshold energy for inelastic (B at rest)
• for nuclei nonrelativistic usually OK
)(
2
)( 2222
icrelativistnonm
mmQK
MQm
mmmmQK
mmpEM
B
BAth
B
DCBAth
DCtottot
)(47.5
)(38.5)1(4
03.4)014102.22016049.3007825.1(
31
223
relMeVK
relnonMeVK
MeVuQ
HHHp
th
th
P461 - nuclear decays 39
Nuclear Reactions (SKIP)
• A+BC+D
• measurement of kinematic quantities allows masses of final states to be determined
• (p,E) initial A,B known
• 8 unknowns in final state (E,px,py,pz for C+D)
• but E,p conserved. 4 constraints4 unknowns measure E,p (or mass) of D OR C gives rest or measure pc and pd gives masses of both
• often easiest to look at angular distribution in C.M. but can always convert
dd
CM
P461 - nuclear decays 40
Fission
• AB+C A heavy, B/C medium nuclei• releases energy as binding energy/nucleon = 8.5 MeV for Fe and
7.3 MeV for Uranium• spontaneous fission is like alpha decay but with different mass,
radii and Coulomb (Z/2)2 vs 2(Z-2). Very low rate for U, higher for larger A
• induced fission n+AB+C. The neutron adds its binding energy (~7 MeV) and can put nuclei in excited state leading to fission
• even-even U(92,238). Adding n goes to even-odd and less binding energy (about 1 MeV)
• even-odd U(92,235), U(92,233), Pu(94,239) adding n goes to even-even and so more binding energy (about 1 MeV) 2 MeV difference between U235 and U238
• fission in U235 can occur even if slow neutron
P461 - nuclear decays 44
Fusion
• “nature” would like to convert lighter elements into heavier. But:
• no free neutrons
• need to overcome electromagnetic repulsion high temperatures
• mass Be > twice mass He. Suppresses fusion into Carbon
• Ideally use Deuterium and Tritium, =1 barn, but little Tritium in Sun (ideal for fusion reactor)
uCm
uBem
uHem
uHm
uHm
00000.12)(
005305.8)(
002603.4)(
014102.2)(
007825.1)(
12
8
4
2
1
)(3)(
)(4)(412
14
HemCm
HmHem
MeVQnHeHH 17432
P461 - nuclear decays 45
Fusion in Sun
• rate limited by first reaction which has to convert a p to a n and so is Weak
(pp) ~ 10-15 barn
• partially determines lifetime of stars
• can model interaction rate using tunneling – very similar to Alpha decay (also done by Gamow)
• tunneling probability increases with Energy (Temperature) but particle probability decreases with E (Boltzman). Have most probable (Gamow Energy). About 15,000,000 K for Sun but Gamow energy higher (50,000,000??)
uCm
uBem
uHem
uHm
uHm
00000.12)(
005305.8)(
002603.4)(
014102.2)(
007825.1)(
12
8
4
2
1
ppHeHeHe
HeHp
eHpp
433
32
2
P461 - nuclear decays 46
Fusion in Sun II
• need He nuclei to have energy in order to make Be. (there is a resonance in the if have invariant mass(He-He)=mass(Be))
• if the fusion window peak (the Gamow energy weighted for different Z,mass) is near that resonance that will enhance the Be production
• turns out they aren’t quite. But fusion to C start at about T=100,000,000 K with <kT> about 10 KeV each He. Gamow energy is higher then this.
uCm
uBem
uHem
uHm
uHm
00000.12)(
005305.8)(
002603.4)(
014102.2)(
007825.1)(
12
8
4
2
1
sec10
92212
1248
844
Be
HeBe KeVmm
CHeBe
BeHeHe
P461 - nuclear decays 47
Fusion in Sun III
• Be+HeC also enhanced if there is a resonance. Turns out there is one at almost exactly the right energy --- 7.65 MeV
uCm
uBem
uHem
uHm
uHm
00000.12)(
005305.8)(
002603.4)(
014102.2)(
007825.1)(
12
8
4
2
1
sec10
92212
1248
844
Be
HeBe KeVmm
CHeBe
BeHeHe
He
HeBe
m
mm
MeVC
327.185,11
37.185,11
65.185,110*12
MeVm 28.0
2
MeV178,110
7.65 MeV
4.44 MeV