Pion properties from the instanton vacuum in free space and at finite density

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HIM, Feb. 23, 2009 Pion properties from the instanton vacuum in free space and at finite density Hyun-Chul Kim Department of Physics, Inha University

description

Pion properties from the instanton vacuum in free space and at finite density. Hyun- Chul Kim. Department of Physics, Inha University. Outline. Q uantum C hromo d ynamics. Instanton vacuum. QCD vacuum chiral symmetry & its spontaneous br. . Effective Chiral Action. - PowerPoint PPT Presentation

Transcript of Pion properties from the instanton vacuum in free space and at finite density

Page 1: Pion properties from the instanton vacuum  in free space and at finite density

HIM, Feb. 23, 2009

Pion properties from the instanton vacuum

in free space and at finite density

Hyun-Chul Kim

Department of Physics, Inha University

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Outline

Quantum Chromodynamics

Instanton vacuum

Effective Chiral Action

Structure of hadrons

Chiral Quark-(Soliton) Model

Confronting with experiments

QCD vacuumchiral symmetry &

its spontaneous br.

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• Elastic scattering Form factors• DI scattering Parton dis-

tributions• DVCS & HEMP GPDs • Hadronic reactions Coupling

constants• Weak decays Weak cou-

pling consts.• New spectroscopy Quantum

Nr.& massesHIM, Feb. 23, 2009

Accelerators: Spring-8, JLAB, MAMI, ELSA, GSI (FAIR: PANDA), COSY, J-PARC, LHC……

Experiments & Theories

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QCD Lagrangian

Running coupling constant Non-perturbative in low-energy regime

50-100 MeV from ChPT

From QCD to An effective theory

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QCD 2

1 ( )4

a aL G G i Ag

(2) : u

d

SU

(3) : u

d

s

SU

Light quark systems: QCD in the Chiral limit, i.e. Quark masses 0

5

5

Invariance: Vector: ' exp( )2

' exp( )2

Axial Vector: ' exp( )2

' exp( )2

Pa

A A

A A

A A

A A

A

i

i

i

i

A

uli matrices

Gell-Mann matrices

Global Symmetries:

From QCD to An effective theory

HIM, Feb. 23, 2009

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5

5

Invariance: Vector: ' exp( )2

' exp( )2

Axial Vector: ' exp( )2

' exp( )2

Pa

A A

A A

A A

A A

A

i

i

i

i

A

uli matrices

Gell-Mann matrices

Requires all current quark masses to be equal in order to be

exactly fulfilled

Requires all current quark masses to be zero in order to be exactly fulfilled

QCD 2

1 ( )4

a aL G G i Ag

From QCD to An effective theory

Light quark systems: QCD in the Chiral limit, i.e. Quark masses 0

Global Symmetries:

HIM, Feb. 23, 2009

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Vector: ' exp( )2

' exp( )2

A A

A A

i

i

5

5

Axial Vector: ' exp( )2

' exp( )2

A A

A A

i

i

• Irred. Representations

• Octet• Decuplet• Antidecuplet...

• Chiral symmetry• No multiplets• Spontaneous breakdown of chiral symmetry• dynamically generated quark mass mM• dynamical mass M~(350-400) MeV• Massless Goldstone Bosons (pions)• Chiral quark condensate

( , ) ( , )aQCD f effL A L HIM, Feb. 23, 2009

From QCD to An effective theory

General wisdom about QCD

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From QCD to An effective theoryChiral symmetry and its spontaneous breaking

This zero mode can be realized

from the instanton vacuum

Banks-Casher theorem Zero-mode spectrum

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-1

-1eff eff

1 1

Vector: ' U U'=VUV

' V L = L'

Axial ' '

V

A U U A UA

eff eff ' A L = L'

( )effL i MU

-1eff eff

5

Vector: ' exp( )2

' V L = L'

Axial ' A= exp( ) 2

A A

A A

iV V

iA

' A ' ' AA

( )effL i M

( ) ( ) exp( ( ))A Aeff

iL i MU U x xf

Chiral Quark Model (ChQM):

Does not work

Does work

Simplest effective chiral Lagrangian

HIM, Feb. 23, 2009Any model that has SCSB must have this kind of a form!!!

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†( ) ( )Mink EukL i MU L i iMU

1 2

† 4 †

4 4( ) †1 2

1 1 2 24 4

non-local M (from instantons):

Z= DU D D exp{ [ ( ) ( )

e ( ) ( ) ( ) ( ) ( )2 2

i k k x

d x x i x

d k d ki k M k U x M k k

Derivation of ChQM from QCD via Instantons by Diakonov and Petrov

Extended by M.Musakhanov,HChK,

M.Siddikov

Eff. Chiral Action from the instanton vacuum

HIM, Feb. 23, 2009

Dynamical quark mass(Constituent quark mass)

Model-dependent,gauge-dependent

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Effective QCD action via instantonInstanton induced partition function (instanton ensemble)

t’Hooft 2Nf-interaction

d(): instanton distribution, U: Color orientation, x: coordinate

Eff. Chiral Action from the instanton vacuum

HIM, Feb. 23, 2009

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Momentum-dependent quark massM(k) induced via quark-instaton Fourier transform of the zero mode solution F(k) Diakonov & Petrov

Eff. Chiral Action from the instanton vacuum

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Lattice data fromP.O. Bowman et al., Nucl. Phys. Proc. Suppl.128, 23 (2004)

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From lattice QCD: After cooling

Instantons

Anti-instantons

Chu et al., PRL 70, 225 (1993)

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Effective Low-energy Partition function from the instanton vacuum

Low-energy effective QCD partition function

This partition function is our starting point!

HIM, Feb. 23, 2009

There is basically no free parameter:

/R = 1/3

L QCD=280 MeV

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Effective Chiral Lagrangian and LECs

Effective chiral action

Derivative expansions

Weinberg term Gasser-Leutwyler terms

H.A. Choi and HChK, PRD 69, 054004 (2004)

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Weinberg Lagrangian

Effective chiral action

H.A. Choi and HChK, PRD 69, 054004 (2004)

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Gasser-Leutwyler Lagrangian

Effective chiral action

H.A. Choi and HChK, PRD 69, 054004 (2004)

M.Polyakov and Vereshagin,Hep-ph/0104287

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Gasser-Leutwyler Lagrangian

Effective chiral action

H.A. Choi and HChK, PRD 69, 054004 (2004)

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Gasser-Leutwyler Lagrangian

Effective chiral action

H.A. Choi and HChK, PRD 69, 054004 (2004)

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We also derived the effective weak chiral Lagrangians ( DS=0,1,2)

M. Franz, HChK, K. Goeke, Nucl. Phys. B 562, 213 (1999)M. Franz, HChK, K. Goeke, Nucl. Phys. A 699, 541 (2002)H.J. Lee, C.H. Hyun, C.H. Lee, HChK, EPJC45, 451(2006)

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Effective chiral action

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Quark condensatesOrder parameter for spontaneous chiral symmetry breaking iq+q

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QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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Gluon condensateNonzero due to nonperturbative vacuum fluctuation

Saddle-point (self-consistent) equation

From this constraint, Mf(0)=M0=350 MeV in the chiral limit

HIM, Feb. 23, 2009

QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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Numerical resultsQuark

condensateGluon

condensate

HIM, Feb. 23, 2009

QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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Quark-gluon mixed condensateAnother order parameter:

Related to k of the pseudoscalar meson wf.

Color-flavor matrix convoluted with single instanton (singular gauge)

Gluon field strength in terms of quark and instanton

Quark-gluon Yukawa vertex instanton-quark

HIM, Feb. 23, 2009

QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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Quark-gluon mixed condensate

HIM, Feb. 23, 2009

QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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Numerical results Ratio of

condensatesMixed

condensate

HIM, Feb. 23, 2009

QCD vacuum properties

S.i.Nam and HChK, Phys.Lett. B 647, 145 (2007)

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QCD vacuum propertiesQuark condensate with meson-loop corrections

With meson-loop corrections

HChK, M.Musakhanov, M.Siddikov, PLB 633, 701 (2006)

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Magnetic susceptibility of QCD vacuumMagnetic response of the QCD vacuum to the external EM field

Related to the normalization of photon light-cone W.F.

HIM, Feb. 23, 2009

QCD vacuum properties

HChK, M.Musakhanov, M.Siddikov, PLB 608, 95 (2005)

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QCD vacuum propertiesMagnetic susceptibility of QCD vacuum

Goeke, Siddikov, Musakhanov, HChK, PRD, 76, 116007 (2007)

with meson-loop corrections

Almost linearly decreased with meson-loop corrections

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Meson electromagnetic form factors Important physical quantity for understanding meson structure

EM current for the pseudoscalar meson

Charge radius for the pseudoscalar meson

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 77, 094014 (2008)

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Meson electromagnetic form factors Numerical results for +, + and 0

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Mesonic properties

SiNam and HChK, PRD 77, 094014 (2008)

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Pion EM form factor

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Hard Part

Soft part: pion WF

Sudakov FF

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q

q

How the quark and antiquark carry the momentum fractionof the mesons in

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Leading-twist meson DAs

Mesonic properties

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Leading-twist meson DAs

Two-particle twist-three meson DAs

Mesonic properties

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Pion DA

Kaon DA

Mesonic properties

SiNam, HChK, A.Hosaka, M.Musakhanov, Phys.Rev.D74,014019 (2006)

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Pion

Kaon

Mesonic properties

HIM, Feb. 23, 2009 SiNam and H.-Ch.Kim, Phys.Rev.D74, 076005 (2006)

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1-loop QCD evolution equa-tion

HIM, Feb. 23, 2009

Schmedding and Yakovlev scale: at 2.4 GeV

CLEO Experiment: PRD 57, 33 (1998)

Mesonic properties

SiNam and H.-Ch.Kim, Phys.Rev.D74, 076005 (2006)

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2sellipsis

Mesonic properties

HIM, Feb. 23, 2009 SiNam and H.-Ch.Kim, Phys.Rev.D74, 076005 (2006)

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Kaon Semileptonic decay (Kl3)Decay process in terms of electroweak interaction

Flavor changing process for SU(3) symmetry breaking (sd,u)

Useful in testing validity of models concerning low energy theorems

Decay amplitude defined by

Cabbibo-Maskawa-Kobayashi (CMK) matrix element ~ sinc

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Vector and scalar form factors for decay (Kl3)Weak current and Flavor changing matrix element

where t indicates the momentum transfer by W-boson

Decay form factor in terms of scalar and vector form factors

where the scalar form factor is defined by

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Low energy constants related to Kl3

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Low energy constants related to Kl3

Low energy constant L5 in the large Nc limit

Low energy constant L9 in the large Nc limit ~ Callam-Treiman Theorem

L5 = 1.6~2.010-3 (exp)

L9 = 6.7~7.410-3 (exp)

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Ratio of f+(t)/f+(0) for Kl3

Almost linear

Well consistent with data

+ = 0.0303 (0.0296 by PDG)

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Test of the low energy theoremsAdemollo-Gatto theorem

FK/F =1.08 (1.22 exp)

L5 = 7.6710-4 (1.4510-3) !!!

L9 = 6.7810-3 (6.9 ~ 7.410-3)

HIM, Feb. 23, 2009

Mesonic properties

SiNam and HChK, PRD 75, 094011 (2007)

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Instanton at finite density () Considerable successes in the application of the instanton vacuum Extension of the instanton model to a system at finite and T QCD phase structure: nontrivial QCD vacuum: instanton

at finite density

· Simple extension to the quark matter:

· Breakdown of the Lorentz invariance at finite temperature

Future work!

· Instanton at finite temperature: Caloron with Polyakov line

· Very phenomenological approach such as the pNJL

· Using periodic conditions (Matsubara sum)

Focus on the basic QCD properties at finite quark-chemical potential,

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Instanton at finite density ()

Assumption:

No modification from

Modified Dirac equation with

Instanton solution (singular gauge)

Zero-mode equation

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Instanton at finite density ()Quark propagator with the Fourier transformed zero-mode solution,

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Instanton at finite density ()Schwinger-Dyson-Gorkov equation (Nf=2, Nc=3)

G.W.Carter and D.Diakonov,PRD60,016004 (1999)

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M0, D, and <iq+q> (Nf=2)1st order phase transition occurred at ~ 320 MeV

Metastable state (mixing of and D) ignored for simplicity here

chiral condensate with

CSC

phaseCSC

phase

NG

phaseNG

phase

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Magnetic susceptibility at finite

Only for the NG phase!!

QCD magnetic susceptibility with externally induced EM field

Magnetic phase transition of the QCD vacuum Effective chiral action with tensor source field T

Evaluation of the matrix element

SiNam. HYRyu, MMusakhanov and HChK, arXiv:0804.0056 [hep-ph]

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Magnetic susceptibility at finite

Magnetic

phase transition

CSC

phaseCSC

phase

NG

phase

NG

phase

1st order magnetic phase transition at c

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Pion weak decay constant at finite Pion-to-vacuum transition matrix element

Separation for the time and space components

Effective chiral action with

Renormalized auxiliary pion field corresponding to the physical one

SiNam and HChK, PLB 666, 324 (2008)

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Pion weak decay constant at finite Effective chiral action with axial-vector source

Using the LSZ (Lehmann-Symanzik-Zimmermann) reduction formula

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Pion weak decay constant at finite Analytic expression for the pion weak decay constant

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Pion weak decay constant at finite Local contributions

Nonlocal contributions

When the density switched off,

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Pion weak decay constant at finite Time component > Space component

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Pion weak decay constant at finite

F s / F t < 0.5

Critical p-wave contribution

K.Kirchbach and A.Wirzba, NPA616, 648 (1997)

(H.c.Kim and M.Oka, NPA720, 386 (2003))

Comparison with the in-medium ChPT

Comparison with the QCD sum rules

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Pion weak decay constant at finite

GOR relation satisfied within the present framework

Changes of the pion properties with

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Pion EM form factor at finite

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Pion EM form factor at finite

At finite density

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Pion EM form factor at finite Charge radius of the pion

Pion form factor with VMD

: Modification of the rho meson mass

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Pion EM form factor at finite

More than two times increased

Charge radius of the pion

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Pion EM form factor at finite

Almost two times increased

Coupling constant C*

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meson mass dropping at finite

Slightly smaller than Hatsuda & Lee, PRC 46, 34 (1992)

Modification of the Widthhas not been considered!

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Summary and outlook

The nonlocal chiral quark model from the instanton vacuum is shown to be very successful in describing low-energy properties of mesons and (baryons).

We extended the model to study the QCD vacuum and pion properties at finite :

• QCD magnetic susceptibility: 1st-order magnetic phase transition

• Pion weak decay constant at finite density: p-wave contribution?

• Pion EM form factors and meson mass dropping (not complete!)

PerspectivesSystematic studies for nonperturbative hadron properties with

Several works (effective chiral Lagrangian, LEC..) under progress

Extension to the finite T (Dyon with nontrivial holonomy, Caloron)

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Though this be madness,

yet there is method in it.

HIM, Feb. 23, 2009

Hamlet Act 2, Scene 2

Thank you very much!