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A ording to mass formulae this angle is equal to
θV	is lose to the ideal mi		xing angle			φ	ontains
Find5In.4moretheProblemdetailmassω - mesontheformulaemixi5 ongforofthemesonsonlybaryonnonstrangewillobetains tet
The angle	2		ω2 0 − mω2	→			\|θV \| ≈ 40 .
	n θV =		mφ2 − mω2
for whi h	cosθV ideal = r		sinθV	deal = r			θV ideal ≈ 35 ,
		3			3
	2			1

distakingqussedarksintoinandthea followingountmesonthe violationleture. onlynot onlystrangeof quarks.

symmetry but also of	SU (3) -
	SU (2) - symmetry.

Le ture 6. Mixing of pseudos alar and ve tor mesons

6In.1the previousmesonsSU (3)leturesymmetrywe have onsideredlimit forthethee e tsmassesof of pseudos alar and ve tor

mesonsof mesonstheandmassbaryonsformula.Thasresultpredi wastedtheGellmass-Mannofnondiagonal- Okubo masssymformulaeetryviolation.Inthe inasetheofmassesvetor

SU (3)

The mixing theory then

ω8 - meson to be ω8

= 929M eV .

for this mass of nondiagon

ω0

ω0 = 900M eV ,

and

ω0 - meson

mixing of ω8 and ω0 -

esons pr du es the diagonal φ

- mesons with observed masses. Thestrangesult that

ω8

- meson is more he vy than

ω0

- meson was

an unexpe ted one be ause

ot ω

- meson ontains more strange quarks than

in theuraldegto nera

y thatof the

rease of

quark massve torthat

f nonstrange quarkmesonwould.Theresultiti

ω8

ω0

Onwouldthehavontrarythenonetinthe(oatse

plus-eudosmesonssinglet)alar(of mesodegenerates ) and

that

ω8

ndtofω0

mω8 → mω0

mesonsin the. SU (3) - symmetry limit we

strange quarks

han

mη8

<< mη0 although η8 - meson ontains ore

range quark-

o that of nons

η0

mesonwould.Thenresultitis innaturaltheintorreasonasexpeoft that the de re

e of st ange quark mass

mη0 −

η8 mass di eren e

and that in

- symmetry limit we would have the o tet of pseudo alar mesons with masses

mπ

and

udos alar singlet with mass

SU (3)

mη0

part of

π . For this

it is widely a epted to think that some

η0 - meson (and hen e of η′

- meson) is presented by the gluoni omponent . .

where the symbol

η0 = α √3

( ¯ + dd + ss¯) + βGG,

the

mesonsmesonsmixing angle

The6.2 informationMixing onofGG˜pseudosnotesthealarpseudos alar glueball with quantum numbers J P C = 0−+

θP de ned by the formulae

η = co θP η8 + sinθP η0

an be obtained not only fr m mass formulae′

where 8

η = −sinθP

+ cosθP

η ,

the tra sition of

|θP | ≈ 10

. The amplitude of

m sons . There are three pseudos alar symmetryonstantsde ayi

the de ays of pseudos alar

g to twobutphotonsalsofrom- π0

, η, η′

qq¯ pair to two photons i

proportional to the ele tri harge of q

only. Inbythethelimitvaluesof exaof t

SU (3)

the amplitudes of

π0, η8

η0

→ 2γ

transitions woul

≡ gqq¯

- quark squared

di er

gπ0 , gη8 , gη0

gπ0 =

√2

(

−

d) =

√

( 9

−

9 ) =

√

1 4

The violation of

gη8

√

(eu

+ e

− 2es ) =

√

(

− 2 9 ) =

√

gη0 =

√

(eu + e + es ) =

√

(

+ 9 ) =

√

SU (3) - symmetry

ontributes at least two modi ations. First, the de aying parti les

η and η′ are the mixtures of η8 and η0 and

gη = cosθP gη8 + sinθP gη0

3 (

√

cosθP +

√

sinθP )

gη′ = −sinθP gη8 + cosθP gη0

(−

√

sinθP +

√

cosθP )

dependenSpartiond,lesthavee onamplitudesdith rentmassmassesandof detheresultingayingwidthspseudosinof dithealarerento sideredmesonenergiesphenomenologideofaysphotonsare di. Leterentallyus betakeauseintothea deountayingthe

A(P

2γ)

Here (

→

P P Fµν Fµν

gP mP

3 .

(P → 2γ) |A(P → 2γ)|

gP mP

2mP

Fµν )Fµν is (dual) tensor of ele tromagneti eld. So, we have the ratios

that predi ts

= gη2

mη3

= (cosθP + 2√

sinθP )2

mη3

3 mπ3 0

π0

gπ20 mπ3 0

θP ≈ 13.3

and

√

η′

gη′

mη′

2 1

η′

that predi ts

2cosθP )

= g2

π0

= (−sinθP + 2

π0

= 4.28KeV ). If the se ond ratio was used for the

determination ofη′ angle= 757 π0 = 5.92KeV ( η′

ΘP

the

sult would be θP ≈ 24.9o

in disagre ment with the re ult |θP | ≈ 10

of mass formulae. The possible reason of this dis greement an be the presen e of gluoni omponent

η′ - meson dis ussed above. Let us assume that in the mixtur

. Then˜the width

annihilate to two ¯

the gluoni omponent does not η0 = α

√

( u¯ + dd +

s¯) + βGG

photons

th′ is equal to

and should be equ l to

ηth′ = α25.92KeV

exp

. Thus we

have the se ond argum interestingfavor ofto explain omponentthe experimentalin width

Let6omponent.3us Mixingnow isonsidera

≈ 72%

gluoni

η′

η′ = 4.28KeV

separatof thevee mixingtor mesonsof veproblemtor mesonsthat. weA willordingnottodis-massmesonussformulaehere.The.naturethemixingofthis gluoni

proportional

the quark harge q

studied

ele tromagnet

≡ hqq¯ . In the ase- paof irexannt SUhilation(3) - symmetryeleonwe-positronwould

p ir is

ω = cosθV

ω0

+ inθV ω8

ρ0, ω8, ωo0 - mesons and their ouplings

with

φ = −sinθV ω0

+ cosθV ω8

strange|θV quarks| ≈ 40 ais dl

seve torthe ideal mixing with θV

al ≈ 35

for whi h ω - me on d es not ontain

mixingto ele trof n--positronmesonmesonsdoespairnot.Theanbeontainamlitunonstrangeinof

qua ks. Likedeheaysasef vef torpseudmesonsalar-

annihiladiagonalmesons he

hρ0 =

√

( 3

−1

(

−

3 )) =

√

hω8 =

√6

(

+ (

−

)

3 )) = √

(

−

−1

hω0 =

√3

+ (

−

3 ) + (

−

3 )) = 0.

widths

annihilation

herLike.theFirst,aseweof havepseudosthe alarmixingmesonsof vethetorviolationmesons ofandSU (3) - symmetry also ontributes two modi ations

dimensionality

width

hω = cosθV

ω0 + sinθV

ω8

= sinθV

√

Se ond, the de ay width

hφ = − inθV hω0 + cosθV

ω8

= cosθV

√

veatthefound

−)

origintorp obabilitybymeson.theMakingfollowingmassforthequarkwgetdargumeandsired ntiquarks. Thedependtomeetfor-nthesquaremassofofbyvewavethtofr funusemesve ttionofr.themesonThisofproperquarkdependenisproportionalandpowerantiquarke ofanthebeto

→

Finally we have the ratio

→

e+e−)

|ψV (0)|2

h2 .

mV2

from whi h

sin2

θV mρ2

the

mω

θV ≈ 32

lose to θV id al ≈ 35

an be obtained and the ratio

cos2

θV mρ2

from whi h one follows that

mφ

φ ≈ 1KeV . The 30% di eren e from the experimental width expφ ≈ (heavy)6Make1..34KeVallProblemquarksthean bnumeriexplainedompared6al altobyulationslargeraseomittedvalueofnonstrangeofinthethewavele(light)turefun. quarkstionat. the origin in the ase of strange

Le ture 7. Magneti moments of baryons
harges. The le tromagneti urrent of quarks	has- quarksthefollowingdier onlySU (3)by-thestruvaluesture of their ele tri
7.1 SU (3) symmetri limit for magneti moments of baryons
	of
qu.hadLikerksons.theInsymmetryinsidethease multipletslimitofmassofofstrformulae.ngOneintofraletthetionusmoststartprediimpressivefromts thetherelationsexamplequarklevel,foris thevafromiousmagnetielephysitromagnetialomentshara teristiofurrentbaryonss
SU (3)
onstru t
SU (3) - symmetry u, d,

of quarks. In parti ular, for the o tet of baryonsSUthat(3)is- transformationsby the asmatrixeletromagneti urrent

des ribed

3 uγ¯ µ

− 3

dγ

sγ

µ =

¯− 3

= uγ¯ µ −

(¯uγµu + dγµ

+ ¯γµ )

wi h

jµ

−

sameConsideringtransformathehadronspropertieswewill

= Jµ1

(Jµα).

respethet toele tromagneti urrent of hadrons that possesses the

Σ−

independent

B βbe=

−√2 +

√6

2Λ

Σ0

and µ′

√

are the ombinations of ele tri and magneti formfa tors

Σ0

the ele tromagneti urrent an

presented by two

avor stru tures

Ξ−

Ξ0

−√6

¯α

1 ¯α

where the quantities

< jµ >B = B

µB α − 3

β µ

+B¯

β µ′ Bβ 1 −

3 B¯α β µ′ Bβ α,

µ = γµf1(q2) + σµν qν f2(q2

Here

µ′

= γµf1′(q2) + σµν qν f2′(q2 .

ombinationshenitefourobinationsomentumoftransferedtwoeletrito the( baryon. Ele tri

andmagneti formfa tors of baryons

are theq isde

following

say,

µ,µ′

andexpressed

)

f2(q

f2′ (q

)

de) formfanite tors. In a ordanofonstane to

the ele f1(q

f1′

)

his

tri hargds and magne)

womomentsmagneti of( baryonsandare the

Q,Q′ and µ,µ′ de ned as follows

Q =

1(0)

Q′

1′ (0)

So, magne i moments of baryons µbeingA = fthe2(0) ombinationsµ′ = f2′wo(0)indep. ndent parameters

µ =

+ µA

µ′ =

Q′

+ µ′

neutronhrough.Thus w getindependentthe baryontablemagneti moments,

the magneti moments of protonan be

µp

µ −1

31 (µ + µ′)

µn

−

(µ + µ′)

input

-1.91

µΣ+

−

3 (µ + µ′) = µp

2 79

2.42

µΣ0

( 2

0.96

−

3 )(µ + µ′) =

−

2 µn

µΣ−

µ′

−

(µ + µ′) = (µp + µn)

µΞ−

µ′

−

+ µ

)

− 3

(µ + µ′) = (µ

µΞ0

−

(µ + µ′) = µn

1 1

1 25

µΛ

( 61

− 31 )(µ + µ′) =

21 µn

-0.96

-0.

−

µΣΛ

(

√

(µ + µ′) = −

√

µn

1.65

1.61

(all numeri al values here are expressed in units	1	where m is the nu leon mass)
The di eren e among the
The di eren e among the	2
and experimental data (right numbers)SU (3)another- predira herionslargefor .magneduIt ativeansti momentshat			of baryons (left numb rs)
momentsagneti ofmomentsbaryonsofisbaryonsnotieablyin violat d way.			amonge agnetie thef

It isthatquitewill let bothtotolookaSUefor(3)intothesymmetryarelationsount(theyin

The7therelatedSU.2(3)magnetimagneti-inMagnetisymmetryhemomentmomentaboveviolationmoment(nsiderations)f baryonand willrelateof .baryonThethetheassumptionmagnetikeyinin thisadditivemomentsofderiadditivityationofquarkpro.tofonquarkmodeland neutronmagneti momw rentsnotin

	µ) of spin 1/2 parti le is de ned by the relation
by de nition, theσ amatrixt on spinelementvariablesofoperatorofonstituent quarks. The baryon magneti moment (µ) is,
wh re	µ = µσ,

e quarkswearegetPauliandthatmatritheesquarkatingmagnetonspin momentvariables areofpartisimplye. addedAssumiingthethatmagnetibaryonsmomenonsist of

baryonthr σ

will

The matri es

µ = Σiµ σi

( = 1, 2, 3)

equal to 1/2

respe t

µz

over the baryon state with spin proje tion on z-axis

havewe

use the expli it onstru tions of baryon

statesFor thefoundal ulationinletureofmagneti4.So,formomenttheµ =prot< oznf=baryonswe1/2|µz |sz

= 1/2 > .

magneti moment

orresponding

µz we get the proton

notwherehangeheexathe tresult)simmetrization.Calulatingpwith˙ = r 3 u˙ u˙

−

(u˙

u˙ )d

the

d. to the thmirdatrixu.quarkelement.is˙ omittedof operator(this simmetrization does

immediately

withThe magntheretisultmomentsfortheprotof sixonothermagnetiomponentsmomentof baryon

tet follow

from the omparison

µ = 3 (µu + µu − µd) + 6

(µu

− µu +o µd) = 3

(4µu − µ ).

µ =

(4µ − µu)

µΣ+ =

(4µ − µs)

µΣ− =

3 (4µd

− µs)

µΞ− =

(4µ − µd)

ation isneeded for

µΣ0 = 3 (2(µ

+ µd) − µs) .

The separate onsid

µΞ0 = 3 (4µ − µu)

respe t to quark inter hanges that does Λnothyperonhange .theItsresult)wave funhastionthe(withoutform simmetrization with

Λ =

√

(u26˙ d. − u.d)s˙ .

fun tion Σ

Therefore, the magneti moment of Λ - hyperon is equal to

The separate onsideration

for the transition matr x element

µisΛalso= 2needed(µ − µd + µs − µu

+ µ + µs) = µs .

radiative d ay

µΣΛ that determines

problemof in the end of this le ture). In lose analogy to the

proton wave fun tion the

→ Λ +waveγ (see the

0 - hyperon is equal to

, µs) an

magneti moments of

proton,

µ , µ

be onsidered as parameters and de ned, say, by

Σ˙ 0

3 r

= 0 61

Then

= r 3 u˙ d˙s. − r

2 (u˙ d. + . ˙) ˙ .

µΣΛ is easily al ulated

neutron and

Λ - hyperon

theirSUele(3) trisymmetryharges was exa t symmetry the quark magneti moments would be proportional to

The quark

µΣΛ = −

3 2 (µu

− µd

+ µs + µ − µ − µs) = −r

(µu − µ ) .

1 1

magneti m ments (

µ =

4µp + µn

= 1.85

4µn + µp

= 0.97 µ

µΛ

−

. .

−

resultof Finally,µ : µlet=neutronus2.79ompare: −. 1.91the.In su h a wayofthe						additive quark model relates the magneti moments
	proton and		predi tions	2	SU (3) - symmetry , of the additive quark model and
the experimental data
						1	1
As it an be seen the ratio			µu : µ : µ =	3 : −		3	: −3 = 2 : −1 : −1 .
symmetry is a good		symmetry while the ratio						is satis ed rather well largelyi. . the	SU (2)	-
			µu : µd = 1.85 : −0.97 ≈ 2 : −1
If				µ			: µs = −0.97 : −0.61 6= −1 : −1 is		v olated.
	µ : µd = 2 : −1 (SU (2)-symmetry) then µp : µn = 3 : −2 that very lose to the experimental

	µp					79
	µn		input	input		91
	µΣ+		2.79	2.67		2.42
	µΣ−			1 09		16
	µΞ−		88	-0.43		8
	µΞ0		1 1	-		1 25
	µΛ		-0.96	input		-0.
d	µΣΛ			1better.6additivitythe.additivenon-isadditive1.61quarknaturalmodelontributionsgivesnotbettan.Thesexar dest oneriptionontributions.Gluonofexperimentalorremaketionsthe
			experimentaltionsthefrom1.65hypogives,thehesisabledataforthatexample,of
			a
ofesataquarkItription.Notean beterofthseen
7.3	Problem 7
Cal ulate		the	0		de ay and	nd	µΣΛ from the omparison with the experiment.
Cal ulate			width of Σ → Λ + γ			27	µΣΛ from the omparison with the experiment.

8	Le ture 8. Chiral symmetry	quark masses
We began the rst le ture with QCD Lagrangian		with the introdu tion of the masses of lig
symmetrieshara teristiof strong int ra tion1GeV. We. Frfromnsideredthis followthis			SU (2)		SU (3)
u, d,	- quarkshadroni(4, 7, 150Ms aleeV ) and said that the di andr n e of quark masses is small ompared to the
	e eviolationthe isotopiof (			) and unitary (		)
	rongtheenusedeinteraofiralstrangeoverallsymtiontheandetoryrnonstrangespondingisturesviolatedometoquarknothestrongermassesase.Forof.mNowlyzingssleitsswillisquarksquiteonsider.aWetimethehaveto-soallayymmetalledthewhe easonshiralhaveausedsymmetthetobyexpequarkyt
thaofmassesdi e		SU (3)

strangewill8Ifbe.to1omesputndLeftandthetheinvquarknonstrangequarkandriantrk massesmassesurightderquark.thetoquarkszeroseparatemasstwodinontrivialeren e. Anthingsa SUhappen:(3)thesymmetryviolationtheLagrangianofbasedthe ofonhiralstrongthesymmenegleinteraionrytionweof

andwithhirality)rightleftand

ourrightnetoaseone(initfortheisorrespondenwhithesensehhiralleftof e

symmetrylefttrantheandformenserightofseparatelyspirality)(in the senseisstatesalled-oftransformationshirality)ofthemasslesshiralquarksymmetryquarksofeldsleft.Thego.andIninsymmetry

(in

SU (3)

ightelds;

onservation

qL,R = 21 (1 ±γ5

quark

that

inofurrents

qua

SU (3)

urrent)

SU (3) - symmetry. These urrents are

SU (3)L × SU (3)R -

. This symmetry means that the left and right quark urrents

where

= ¯Lγµ λ

= q¯Rγµ λ

qR,

µL

µR

generates

due to the

Q , Q . The h ges Qa are the harges that

and new

serv d hargesrealizationSU-(3)ax- symmetryharges . In havet limit of massless quarks the symmetry is enlarged

thele tureleft(axialand4.Therighto servation, kareorrespondsurrentsonservedof(ve separatelytortheaxialurrent). Theorrespondsistheditoerentheofequarkofthe-urrentsymmetryleftandthatrightisonsideredthequarksum

appeared.

hiral

λa

Ve tonservedandaxial

urrents

jµV

onserved

arges

= qγ¯ µγ5

= qγ¯

jµA

Let8.2theus Nonlinearveonsidertor urrentthematrixbe,forelementsexample,of anonservedeleA tromagnetisymmetryve tor andoneaxial urrents.

, and matrix

lement be taken over the

states. In the limit of zero

λEM

= λ3 +

λ8

q → 0 the onsidered matrix element is

equal

jµ =

urrent

1 ¯

λem

where

3 uγ¯ µ

−

3 dγµd − 3 sγ¯ µ

= qγ¯

µ 2 q,

momentum2 transfer2

2√3

proton

The onservation of ele tromagneti

emmeans that¯

< p(k2)|jµ

|p(k1) >= Ψ2γµΨ1 .

(k2µ − k1µ)Ψ γµΨ1 = 0 .

This equation is valid due to	Dira equations for proton spinors							Ψ2	and	Ψ1.
Let now the axial urrent be the urrent orresponding								Ψ2		Ψ1.
					β - de ay of neutron
				em	+
	tromagnetiandprotonurrentin thewelimitassumeof zerothatmomthentummatrixtransferelementis ofequalthe toaxial
Ifurrentinanalogyovertheto thestatesaseofofneutronele		γµ → γµγ5	λ		→ τ .
of nu leon of the order		nu leon				mp		= 0. With exp rimental mass
then the onservation of the		urrent would require			¯the equation
		+					,
	axial< p(k2)\|jµA\| (k1) >= gAΨ2γµγ5Ψ1						,
and hen e would require the mass of ¯			be equal to¯ z ro				= 0
(k2µ − k1µ)Ψ2γµγ5Ψ1 = gA2mpΨ2γ5Ψ1							= 0

violatedthewilllimit.assumeofzerothatmomentumtheWein 1GeVmatrixwetransferelemwouldntisbeofequalfortheedaxialtoto onurrentludeoverthatthethestateshiralofsymmneutrontryandisstronglyproton

qµqν

automati ally. For

q2 ) ,

nterpreted. . axial urrent is ons rved< p(k2)|jµA|n(k1) >= gAΨ2γν γ5Ψ1(δµν −

state to another state

3 for example,

say, on

sta

le element( hastransfp le that an be

Eight

as pseudosfo lows: alarutron emits

sless pseudosq = 0alarthe partima rix

and

π−) and

orms to proton

spondhadronsoftotoviewzeroight.Einbepetheonservedauseiallyhiralexperimentallyitaxialislimittrueofurrentsformasslesstheall.Theeightasequarkssituationofpseudosseemswhenalarto

mesonsbethemoremassesπ− areisinterestingannihilesssubstantiallyof atedfrombylighterthexialmesonsphyurrentthaniarealorreother.pointequal

VeSo, torthe hahi gessymme ry an be realized by maki

g massless

nly thesepseud s al

r mesonsπ .- mesons.

a ting,the states of baryon o et transforms

sta es into themselves. Axial

rge

Q a ingisospin

hastwoopposiparti leparitystate.In"protonthe

of baryons there is

hasuhashmesonPartialheates,ameitisspin,natural to thinkhyperthathargeweprotonnugetbutleon"are

π+ nu leon". For z ro energy

alizationsemesonanwhenbe.

alar

inssearthequarks

pseudos

symmetryvathebyuuminthestatesfavor.onservation.ForTheonsiderationof"nuexample,deszroleon"andribedmaforssesofrealizationmatrix"ofaxialpseudoselementsofurrentsalarhiralmatrixmesonsofsymmdegenandialfortryrateurrentsquarktheisaslimitalleditovershomassesofthethemasslldnonlbe

statesobtainedThe8there.3π arguments-isandalso

π+

mass π - meson goes to zero in the limit of massless quarks
π− - meson the	element

enters the amplitude of weak de ay	< 0\|uγ¯ µγ5d\|π− >= fπ pµπ−
π− → µ−ν˜µ. Cal ulating the divergen e of axial urrent we obtain
from where it n be seen that the		of	5	d\|π	−	2	,
< 0\|(		u + md)¯uγ		d\|π		>= fπ mπ	,
mu,d → 0. Similarly			29			2

< 0|(mu + ms)¯uγ5s|K− >= fK mK .

the following quark< 0 uγmass¯ 5d πratio− >

stranges

≈ 150M V

experimentally) we get

< 0 uγ¯

K− >

and

= 1.25

Assuming that

≈ |

π ≈

(the

are

approximatelymassdi erenthisesvalue)of baryothens in the

de uplet that di er by the numbers ofmasses

quarks

u and

+ md

mπ2

If one takes the strange quark ma s

to be

≈ mK2

≈ 13 .

+ ms

en ounter

bound

followinga mesonsountthe.Thel sizetromagnetioforrethesetionsinteraretionstion

muomparableand m

ishes to evaluate

qua

massesisthat an give thetoseparatelythe massestromagneti. Upof toandorrew we-tionsdidquarks.tonotTherefortakeonsidermassinto,

Now we have to evaluate the quark

≈ 11M eV .

partimassesthe elelestromagneletfromspeus ulawriteneutraltionthe.Inonesmodispirit.edThrelatiof bisovensnorelthrigorat wouldnus amongwayseparatelytaketothedointoitmassesandaountweofwillmesonsthethedinesquarederenessityourselvese toofandhargedbyquarkthe

γ an be eliminated and we get as a result

mπ2

−

mu +

d + γ

mu + m

The unknown ele tromagneti orre tion2π

ee that+ md ≈ 11M eV one obtai

s m ≈ 4M eV and md ≈ 7M V .

mK−

mu +

s + γ

So, for Problem

mK0

md + ms

− u

(mπ2 − − mπ2 0 ) − (mK2 − − mK2 0 )

≈

0.29 .

md +

mπ2

masses obtained

and the ratio of quark masses and verify its a ura y for the

le ture

as usual is

md −

u m

, hen e, the hiral

SU (2)L × SU (2)R

- symmetry should be as good

topi

Find8.4 the rel

tion SUbetween8(2) - symmetrytheratio and be better than SU (3) - symmetry in any ase.

values of

ark

on the8

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