Download - HEP Quark Model Kihyeon Cho. Contents Quarks Mesons Baryon Baryon Magnetic Moments HEP Journal Club
HEP
Quark Model
Kihyeon Cho
Contents
• Quarks
• Mesons
• Baryon
• Baryon Magnetic Moments
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HEP
표준모형 (Standard Model)• What does world made of?
– 6 quarks• u, d, c, s, t, b
• Meson (q qbar)
• Baryon (qqq)
– 6 leptons• e, muon, tau e, ,
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cbcscd
ubusud
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HEP
Standard Model
• b, c are heavier than other quarks
- heavy flavor quarks
• W, Z, top are stand out from the rest.
+2/3e
-1/3e
0
-1
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Matter
• Hadron (Quark) - size– Baryon (qqq): proton, neutron– Meson (q qbar): pion, kaon
• Lepton – no size– Point particle
HEP Journal Club QuarksOver the years inquiring minds have asked: “Can we describe the known physics with just a few building blocks ?”
Historically the answer has been yes.Elements of Mendeleev’s Periodic Table (chemistry)nucleus of atom made of protons, neutrons
proton and neutron really same “particle” (different isotopic spin) By 1950’s there was evidence for many new particles beyond , e, p, n It was realized that even these new particles fit certain patterns:
pions: +(140 MeV) -(140 MeV) o(135 MeV)kaons: k+(496 MeV) k-(496 MeV) ko(498 MeV)
Some sort of pattern was emerging, but ........... lots of questions If mass difference between proton neutrons, pions, and kaons is due
to electromagnetism then how come:Mn > Mp and Mko > Mk+ but M+ > Mo
Lots of models concocted to try to explain why these particles exist: Model of Fermi and Yang (late 1940’s-early 50’s):
pion is composed of nucleons and anti-nucleons (used SU(2) symmetry)
+ = pn, - = np, o = pp - n n note this model was proposed before discovery of anti-proton !With the discovery of new unstable particles (, k) a new quantum number was invented:
strangeness
HEP Journal Club QuarksGell-Mann, Nakano, Nishijima realized that electric charge (Q) of all particles could be related to isospin (3rd component), Baryon number (B) and Strangeness (S):
Q = I3 +(S + B)/2= I3 +Y/2Coin the name hypercharge (Y) for (S+B)
1-1
1
-1
I3
Y k+
k-
ko
k o
+ - o
Interesting patterns started to emerge when I3 was plotted vs. Y:
Particle Model of Sakata (mid 50’s): used Q = I3 +(S + B)/2 assumed that all particles could be made from a combination of p,n, tried to use SU(3) symmetry
In this model: + = pn, - = np, o = pp - n n, k+= p, ko= nBaryons are made up of 3 at a time: +
= pnThis model obeys Fermi statistics and explains why:
Mn > Mp and Mko > Mk+ and M+ > Mo
Unfortunately, the model had major problems….
HEP Journal Club QuarksProblems with Sakata’s Model:Why should the p, n, and be the fundamental objects ?
why not pions and/or kaonsThis model did not have the proper group structure for SU(3)
What do we mean by “group structure” ?SU(n)= (nxn) Unitary matrices (MT*M=1) with determinant = 1 (=Special) and
n=simplest non-trivial matrix representationExample: With 2 fundamental objects obeying SU(2) (e.g. n and p)
We can combine these objects using 1 quantum number (e.g. isospin)Get 3 Isospin 1 states that are symmetric under interchange of n and p:
|11> =|1/2 1/2> |1/2 1/2>|1-1> =|1/2 -1/2> |1/2 -1/2>|10> = [1/2](|1/2 1/2> |1/2 -1/2> + |1/2 -1/2> |1/2 1/2>)
Get 1 Isospin state that is anti-symmetric under interchange of n and p|00> = [1/2](|1/2 1/2> |1/2 -1/2> - |1/2 -1/2> |1/2 1/2>)
In group theory we have 2 multiplets, a 3 and a 1:2 2 = 3 1
Back to Sakata's model: For SU(3) there are 2 quantum numbers and the group structure is more complicated:
3 3 3 = 1 8 8 10Expect 4 multiplets (groups of similar particles) with either 1, 8, or 10 members.Sakata’s model said that the p, n, and were a multiplet which does not fit into the above scheme of known particles! (e.g. could not account for o, +)
HEP Journal Club Early 1960’s Quarks“Three Quarks for Muster Mark”, J. Joyce, Finnegan’s Wake
Model was developed by: Gell-Mann, Zweig, Okubo, and Ne’eman (Salam)Three fundamental building blocks 1960’s (p,n,) 1970’s (u,d,s)mesons are bound states of a of quark and anti-quark:Can make up "wavefunctions" by combing quarks:
+ = ud, - = du, o =12
(uu - d d), k+= ds, ko= ds
baryons are bound state of 3 quarks:proton = (uud), neutron = (udd), = (uds)
anti-baryons are bound states of 3 anti-quarks:
p u u d n u d d u d s
These quark objects are:point likespin 1/2 fermions parity = +1 (-1 for anti-quarks)two quarks are in isospin doublet (u and d), s is an iso-singlet (=0)Obey Q = I3 +1/2(S+B) = I3 +Y/2Group Structure is SU(3)For every quark there is an anti-quarkquarks feel all interactions (have mass, electric charge, etc)
HEP Journal Club Early 1960’s QuarksThe additive quark quantum numbers are given below:Quantum # u d s c b telectric charge 2/3 -1/3 -1/3 2/3 -1/3 2/3I3 1/2 -1/2 0 0 0 0Strangeness 0 0 -1 0 0 0Charm 0 0 0 1 0 0bottom 0 0 0 0 -1 0top 0 0 0 0 0 1Baryon number 1/3 1/3 1/3 1/3 1/3 1/3Lepton number 0 0 0 0 0 0
Successes of 1960’s Quark Model: Classify all known (in the early 1960’s) particles in terms of 3 building blockspredict new particles (e.g. -)explain why certain particles don’t exist (e.g. baryons with S = +1)explain mass splitting between meson and baryonsexplain/predict magnetic moments of mesons and baryonsexplain/predict scattering cross sections (e.g. p/pp = 2/3)
Failures of the 1960's model:No evidence for free quarks (fixed up by QCD)Pauli principle violated (++= uuu wavefunction is totally symmetric) (fixed up by color)
What holds quarks together in a proton ? (gluons! ) How many different types of quarks exist ? (6?)
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HEP Journal Club Dynamic QuarksDynamic Quark Model (mid 70’s to now!)
Theory of quark-quark interaction QCDincludes gluons
Successes of QCD: “Real” Field Theory i.e. Gluons instead of photons Color instead of electric chargeexplains why no free quarks confinement of quarks
calculate lifetimes of baryons, mesonsFailures/problems of the model:
Hard to do calculations in QCD (non-perturbative) Polarization of hadrons (e.g. ’s) in high energy collisionsHow many quarks are there ?
calculate cross sections, e.g. e+e- qq
Historical note: Original quark model assumed approximate SU(3) for the quarks. Once charm quark was discovered SU(4) was considered. But SU(4) is a badly “broken” symmetry.Standard Model puts quarks in SU(2) doublet, COLOR exact SU(3) symmetry.
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From Quarks to ParticlesHow do we "construct" baryons and mesons from quarks ?
Use SU(3) as the group (1960’s model)This group has 8 generators (n2-1, n=3)Each generator is a 3x3 linearly independent traceless hermitian matrixOnly 2 of the generators are diagonal 2 quantum numbers
Hypercharge = Strangeness + Baryon number = YIsospin (I3)
In this model (1960’s) there are 3 quarks, which are the eigenvectors (3 row column vector)
of the two diagonal generators (Y and I3)Baryons are made up of a bound state of 3 quarksMesons are a quark-antiquark bound stateThe quarks are added together to form mesons and baryons using the rules of SU(3).It is interesting to plot Y vs. I3 for quarks and anti-quarks:
M&S P133-140
1-1
1
-1
I3
Y
ud
s
1/3
2/3
1-1
1
-1
I3
Y
u d
s2/3
HEP Journal Club Making Mesons with QuarksMaking mesons with (orbital angular momentum L=0)The properties of SU(3) tell us how many mesons to expect:
8133
Thus we expect an octet with 8 particles and a singlet with 1 particle.
If SU(3) were a perfectsymmetry then all particlesin a multiplet would have the same mass.
Perkins 5.6
HEP Journal Club Quarks and Vector MesonsLeptonic Decays of Vector MesonsWhat is the experimental evidence that quarks have non-integer charge ? Both the mass splitting of baryons and mesons and baryon magnetic moments depend on (e/m) not e.
Some quark models with integer charge quarks (e.g. Han-Nambu) were also successful in explaining mass patterns of mesons and baryons.Need a quantity that can be measured that depends only on electric charge !
Consider the vector mesons (V=): quark-antiquark bound states with:mass 0electric charge = 0orbital angular momentum (L) =0spin = 1charge parity (C) = -1parity = -1strangeness = charm = bottom=top = 0
These particles have the same quantum numbers as the photon.The vector mesons can be produced by its coupling to a photon:
e+e- V e.g. : e+e- Y(1S) or The vector mesons can decay by its coupling to a photon:
V e+e- e.g. : e+e- (BR=6x10-5) or e+e- (BR=6.3x10-2)
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HEP Journal Club Quarks and Vector MesonsThe decay rate (or partial width) for a vector meson to decay to leptons is:
222
2
)0(||16
i
iiV
QaM
em The Van Royen-Weisskopf Formula
In the above MV is the mass of the vector meson, the sum is over the amplitudes that make up the meson, Q is the charge of the quarks and (0) is the wavefunction for the two quarks to overlap each other.
12
(uu - d d) 12
(23 -(- 1
3) )
2 = 1
2 7 KeV
12
(uu + dd) 12
(23 +(-1
3) )
2 = 1
18 0.8 KeV
ss (- 13) 2
= 19
1.3 KeV
cc (23) 2
= 49
bb 1.2 KeV
13.2
12.8
11.8
4.7 KeV 10.5
Y (- 13) 2 = 1
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meson quarks |aiQi|2 L(exp) L(exp) |aiQi|-2
If we assume that |(o)|2/M2 is the same for , (good assumption since masses are 770 MeV, 780 MeV, and 1020 MeV respectively) then:
expect: L() : L() : L() = 9 : 1 : 2measure: (8.8 ± 2.6) : 1 : (1.7 ± 0.4)
Good agreement!
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HEP Journal Club Baryon OctetMaking Baryons (orbital angular momentum L=0).Now must combine 3 quarks together:
10881333 Expect a singlet, 2 octets, and a decuplet (10 particles) 27 objects total.Octet with J=1/2:
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HEP Journal Club Baryon DecupletBaryon Decuplet (J=3/2)Expect 10 states.Prediction of the (mass =1672 MeV/c2, S=-3)Use bubble chamber to find the event.
1969 Nobel Prize to Gell-Mann!
“Observation of a hyperon with strangeness minus 3”PRL V12, 1964.
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Symmetry
Mixed Symmetry
Mixed Anti-symmetry
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Spin - Mixed Symmetry
Flavor - Mixed Symmetry
Flavor - Symmetry
Spin – Symmetry
Flavor - Mixed Anti-symmetry
Spin - Mixed Anti-symmetry
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Flavor Mixed Anti-symmetry
Flavor - Mixed Symmetry
Spin-Mixed Anti-symmetry
Spin- Mixed Symmetry
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Perkins 5.4
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HEP Journal Club Four QuarksOnce the charm quark was discovered SU(3) was extended to SU(4) !
HEP Journal Club More Quarks
PDG listing of theknown mesons.
With the exception ofthe b, all ground statemesons (L=0) have beenobserved and are in goodagreement with thequark model.
A search for the b ispresently underway!
HEP Journal Club Magnet Moments of BaryonsMagnetic Moments of BaryonsThe magnetic moment of a spin 1/2 point like object in Dirac Theory is:
= (eh/2mc)s = (eh/2mc) /2, ( = Pauli matrix)The magnetic moment depends on the mass (m), spin (s), and electric charge (e) of a point like object.From QED we know the magnetic moment of the leptons is responsible for the energy difference between the 13S1 and 11So states of positronium (e-e+): 13S1 11So Energy splitting calculated = 203400±10 Mhz
measured = 203387±2 Mhz If baryons (s =1/2, 3/2...) are made up of point like spin = 1/2 fermions (i.e. quarks!) then we should be able to go from quark magnetic moments to baryon magnetic moments.Note: Long standing physics puzzle was the ratio of neutron and proton moments:
Experimentally: p/n -3/2In order to calculate we need to know the wavefunction of the particle.In the quark model the space, spin, and flavor (isotopic spin) part of the wavefunction is symmetric under the exchange of two quarks.The color part of the wavefunction must be anti-symmetric to satisfy the Pauli Principle (remember the ++). Thus we have:
= R(x,y,z) (Isotopic) (Spin) (Color) Since we are dealing with ground states (L=0), R(x,y,z) will be symmetric.
always anti-symmetric becausehadrons are colorless
Perkins 5.12
HEP Journal Club Magnet Moments of Baryons Consider the spin of the proton. We must make a spin 1/2 object out of
3 spin 1/2 objects (proton = uud)From table of Clebsch-Gordon coefficients we find:
|1/2 1/2> = 23
|1 1> |1/2 -1/2> - 13
|1 0> |1/2 1/2>
Also we have: |1 1> = |1/2 1/2> |1/2 1/2>
|10> = 12
|1/2 1/2> |1/2 -1/2> + 12
|1/2 -1/2 > |1/2 1/2>
For convenience, switch notation to “spin up” and “spin down”: |1/2 1/2> = and |1/2-1/2> =
Thus the spin part of the wavefunction can be written as:
1 / 2 1 / 2 2 / 3 1 / 3 1 / 2 1/ 6 2 Note: the above is symmetric under the interchange of the first two spins.
Consider the Isospin (flavor) part of the proton wavefunction. Since Isospin must have the two u quarks in a symmetric (I=1) state this means that spin must also have the u quarks in a symmetric state.
This implies that in the 2term in the spin function the two are the u quarks. But in the other terms the u’s have opposite sz’s.We need to make a symmetric spin and flavor (Isospin) proton wavefunction.
Perkins 5.12
HEP Journal Club Magnet Moments of BaryonsWe can write the symmetric spin and flavor (Isospin) proton wavefunction as:
p 1 / 182u u d 2d u u 2u d u
u d u u u d u u d d u u u d u d u u
The above wavefunction is symmetric under the interchange of any two quarks.To calculate the magnetic moment of the proton we note that if is the magnetic moment operator:=1+2+3 Composite magnetic moment = sum of moments.
<u| |u> = u = magnet moment of u quark<d| |d> = d = magnet moment of d quark<usz| |usz> = u|sz = (2e/3)(1/mu)(sz)(h/2c), with sz = ±1/2<dsz| |dsz> = d|sz = (-e/3)(1/md)(sz)(h/2c), with sz = ±1/2
For the proton (uud) we have:<p||p> = (1/18) [24u,1/2 + 12 d,-1/2 + 3 d,1/2 + 3 d,1/2] <p||p> = (24/18)u,1/2 - (6/18)d,1/2 using d,1/2 = - d,-1/2 <p||p> = (4/3)u,1/2 - (1/3)d,1/2
For the neutron (udd) we find: <n||n> = (4/3)d,1/2 - (1/3)u,1/2
<usz=1/2| |usz=-1/2> =0, etc..
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HEP Journal Club Magnet Moments of BaryonsLet’s assume that mu = md = m, then we find: <p| |p>=(4/3)(h/2c) (1/2)(2e/3)(1/m)-(1/3)(h/2c)(1/2)(-e/3)(1/m)<p| |p>=(he/4mc) [1]<n| |n>=( 4/3)(h/2c) (1/2)(-e/3)(1/m)-(1/3)(h/2c)(1/2)(2e/3)(1/m)<n| |n>=( he/4mc) [-2/3]Thus we find:
2
3
||
||
n
p
nn
pp
In general, the magnetic moments calculated from the quark model are ingood agreement with the experimental data!
-1.46
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Reference
• Richard Cass – HEP Class (2003)
• Thompson – HEP Class
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