Post on 24-Jul-2020
Full QCD with chirallyinvariant quarks
Shoji Hashimoto (KEK)@ Block course on “Lattice Simulation of Quantum Fields,” Mar 28, 2008.
Plan
Mar 28, 2008S Hashimoto (KEK)2
1. Exact chiral symmetryWhy necessary/interesting?Properties of the Neuberger operatorImplementation
2. Topology issuesIndex theoremQCD at fixed topological chargeTopological susceptibility
3. Early physics results with dynamical overlap fermionsSimulation techniquesPion and kaon properties, and more applications
1. Exact chiral symmetry
Why necessary/interesting
Exact chiral symmetry
Mar 28, 2008S Hashimoto (KEK)4
… is costly, especially for the sea sector. Why necessary/interesting?
Theoretically clean
Mar 28, 2008S Hashimoto (KEK)5
Operator mixingThanks to the continuum-like Ward-Takahashi identities, no unwanted operator mixing appears (see Del Debbio’s lecture).To subtract the unnecessary contribution, sometimes one must deal with power divergences, e.g.
Mixing with operators of wrong chirality is also a severe problem, as they may be relatively enhanced.
3
1( ) ( ) (1)cont lat latS mixZ Z
aψψ ψψ= +
22 2
2;LL K K K PPK
K O K B f m K O Kf
ψψ∝ ∝
Theoretically clean
Mar 28, 2008S Hashimoto (KEK)6
Operator mixing: more complicated example, K→ππ.Even with exact chiral symmetry, there exists a mixing, which must be subtracted non-perturbatively.
Without the chiral symmetry, the problem is harder, i.e. mixing with
( ) ( )
[ ]
6, ,
52
1 ( ) ( )
V A V Aq u d s
s d s d
Q s d q q
m m sd m m s da
α β β α
γ
− +=
=
↔ + − −
∑
3
1 sda
↔
Theoretically clean
Mar 28, 2008S Hashimoto (KEK)7
Existence of the chiral limitWithout the exact chiral symmetry, the uniqueness or even the existence of the “chiral limit” may be lost.
What is the chiral extrapolation? mq→0, mπ2→0, …
There may be a wall before reaching there (1st order phase transition). Situation is better for improved gauge actions; may still show up near the chiral limit.
Farchioni et al., PLB624, 324 (2005).
Theoretically clean
Mar 28, 2008S Hashimoto (KEK)8
Chiral effective theoryConstructed assuming the spontaneously broken chiralsymmetry. Is it valid when chiral symmetry is explicitly violated?
Continuum extrapolation before chiral extrapolation.Or, Combined continuum/chiral extrapolation
Under some assumptions introduce additional terms (e.g. proportional to a2) to ChPT. More parameters to be determined.Wilson ChPT, staggered ChPT, twisted mass ChPT, …
Neuberger operator
Mar 28, 2008S Hashimoto (KEK)9
Fortunately, the lattice fermion with exact chiralsymmetry is known = overlap fermion.
Why don’t you use it?Computational cost (~ x100 more)Yes. But, history proved the Moore’s law = exponential growth of computer power (x10 per every 5 years).Wait for 10 years, or start now!
JLQCD collaboration
Mar 28, 2008S Hashimoto (KEK)10
Members:KEK: S. Hashimoto, H. Ikeda, T. Kaneko, H. Matsufuru, J. Noaki, E. Shintani, N. YamadaKyoto: T. Onogi, H. OhkiTsukuba: S. Aoki, N. Ishizuka, K. Kanaya, Y. Kuramashi, Y. Taniguchi, A. Ukawa, T. YoshieHiroshima: K. Ishikawa, M. OkawaNBI: H. Fukaya
Also, with TWQCD (T.W. Chiu, T.H. Hsieh, K. Ogawa)
Machines at KEK (since 2006)SR11000 (2.15 Tflops)BlueGene/L (57.3 Tflops)
IBM BlueGene/L
Mar 28, 2008S Hashimoto (KEK)11
10 Racks57 TF/s
Properties and implementation of the overlap fermion
Overlap fermion
Mar 28, 2008S Hashimoto (KEK)13
Neuberger’s overlap fermion (1998)
Exact chiral symmetry through the Ginsparg-Wilson relation.
Continuum-like Ward-Takahashi identitiesIndex theorem (relation to topology) is satisfied
Numerical cost depends on Spectrum of HWApproximation of sgn(HW)
[ ]
†
5 5
1 1 , 1
1 1 sgn( ) , ( 1)
W
W W W
XD X aDa X X
aH aH aDa
γ γ
⎡ ⎤= + = −⎢ ⎥
⎣ ⎦
= + = −
DaDDD 555 γγγ =+55 211,
211 γψψδψγδψ ⎟
⎠⎞
⎜⎝⎛ −=⎟
⎠⎞
⎜⎝⎛ −= aDaD
(Simple) exercises
Mar 28, 2008S Hashimoto (KEK)14
If you have not done it before,Show that
1. The lattice action is invariant under the modified chiraltransformation when the Ginsparg-Wilson relation is satisfied.
2. The overlap-Dirac operator D satisfies the Ginsparg-Wilson relation.
3. The overlap operator approaches the continuum Dirac operator as a→0. Do the all calculation keeping relative order a terms. You may use a relation
2 21 ( )2W c cD D aD O a= / − +
Sign function
Mar 28, 2008S Hashimoto (KEK)15
Approximation of the sign function is needed. May use tanh, for instance, but not very precise.Instead, consider an approx for a given interval
Chebyshev: minmaxpolynomial approximationZolotarev: minmax rational approximation
Problem arises if there are near-zero modes.
In fact, their density is non-zero at any finite β (Edwards, Heller, Narayanan, 1998)
Comes from dislocations (local lumps of gauge field)Need to subtract before approximate
∑ −=i
WiW V)(1)( λλδλρ
, ,max| | [ , ]W W th Wλ λ λ∈
0 21
[ ]poleN
l
l l
px x px q
ε=
⎛ ⎞= +⎜ ⎟⎜ ⎟+⎝ ⎠
∑
Things to do
Mar 28, 2008S Hashimoto (KEK)16
For a given gauge configuration…1. Calculate the near-zero modes of HW, i.e. their eigenvalues
and eigenvectors using Lanczos algorithm for instance.
2. Sign function is trivial for the near-zero modes; the rest must be approximated.
3. Use a rational approximation (Zolotarev)
, ,
† †(1 ) ;W W W W
W W th W W th
W W WH v v P H P v vλ λ λ λλ λ λ λ
λ≤ ≤
= ⊗ + − = ⊗∑ ∑
[ ],
†sgn( ) sgn( ) (1 )W W
W W th
W W WH v v P Hλ λλ λ
λ ε≤
= ⊗ + −∑
0 21
[ ]poleN
l
l l
px x px q
ε=
⎛ ⎞= +⎜ ⎟⎜ ⎟+⎝ ⎠
∑
Multi-shift solver
Mar 28, 2008S Hashimoto (KEK)17
Rational approximation involves Npole inversions.
Can be calculated at the same time using the multi-shift CG solver.
They share the Krylov subspace. Therefore, the generation of the orthogonal vectors in the Krylov subspace must be done only once; their coefficients must be calculated for each inversion.
Faster than the (Chebyshev) polynomial approximation to achieve a given accuracy: 10-(7-8) in our case.
Accuracy improves exponentially for larger Npole; increase of the numerical cost is mild.
0 21
[ ]poleN
lW
l W l
pH x pH q
ε=
⎛ ⎞= +⎜ ⎟⎜ ⎟+⎝ ⎠
∑
Near-zero mode suppression
Mar 28, 2008S Hashimoto (KEK)18
Near-zero modes are unphysical (associated with a local lump = lattice artifact)Make sense to design a lattice action to suppress them
Fat links are effective to suppress the dislocations, but not completely.Introduce unphysical (heavy negative mass) Wilson fermions (Vranas, JLQCD, 2006)
m0 must be chosen the same as that in the overlap kernel. Must be in between 0 and 2.
We chose a form
to minimize the effect in the UV region.
20 )(det mHW −
⎥⎦
⎤⎢⎣
⎡+−
−22
0
20
)()(detμmH
mH
W
W
Plaquette gauge, β=5.83, μ=0; β=5.70, μ=0.2
Completely wash-out the near-zero modes. Overlap is much faster.
Locality
Mar 28, 2008S Hashimoto (KEK)19
Lattice Dirac operator must be local in order that a local theory is obtained in the continuum limit.
Locality is not obvious for the overlap operator due to 1/√.
Locality in the sense that |D|<exp(-μx), with μ a number of order 1/a, may be satisfied.“Proof” is known for smooth enough gauge canfigurations(Hernandez, Jansen, Luscher (1999)).No mathematical proof in more realistic situations where there is non-zero density of the near-zero modes.⇒ Okay if near-zero modes are always localized.
†
1 1 , 1WXD X aD
a X X
⎡ ⎤= + = −⎢ ⎥
⎣ ⎦
Locality
Mar 28, 2008S Hashimoto (KEK)20
Maybe analyzed by looking at individual eigenmodes of HW.
Near-zero modes are more localized. Higher modes are extended. There is a critical value above which the modes are extended = “mobility edge” (Golterman, Shamir (2003)).
An important lessen: do not use the overlap fermion in the Aoki phase (where the near-zero modes are extended).
2. Topology issues
U(1) anomalyFermion measure is not invariant under the axial U(1) rotation.
Eigenvalues of the Dirac operatorMake a pair with their complex conjugate, except for the zero modes.
Lattice version of the index theorem (Atiyah-Singer)
2 45; ln ( ) 1 ( )
2n n n n k kkn n
ad d J d d J i d x u x D u xψ ψ ψ ψ α γ− ⎛ ⎞→ = −⎜ ⎟⎝ ⎠
∑∏ ∏ ∫
*5 5( ) ( ); ( ) ( )k k k k k kDu x u x D u x u xλ γ λ γ= =
4 45 2
1( ) 1 ( ) Tr2 16k k R L
k
ad x u x D u x n n q d x F Fμν μνγπ
⎛ ⎞ ⎛ ⎞− = − = =⎜ ⎟ ⎜ ⎟⎝ ⎠ ⎝ ⎠
∑∫ ∫
Correctly represents the chiral zero-modes
2007/11/1422 S. Hashimoto (KEK)
Overlap = projection
Mar 28, 2008S Hashimoto (KEK)23
1WaD − aD
†
1 1 , 1WXD X aD
a X X
⎡ ⎤= + = −⎢ ⎥
⎣ ⎦
†( 1)( 1) 1aD aD− − =• Eigenvalues are paired: λ↔λ*• Real eigenvalues are exceptions.
Topological charge
Mar 28, 2008S Hashimoto (KEK)24
Usually defined using some cooling techniques; topological charge is an integer, only approximately.The overlap-Dirac operator provides another way of defining topological charge on the lattice = counting the number of zero-modes.
Unambiguous definition.
Topology change occurs when an eigenvalue of HW crosses zero.Near-zero modes of HW indicate dislocation, for which the topology cannot be defined.
Suppress the dislocations, e.g. by adding extra Wilson fermions
Zero probability to have an exact zero-mode
No chance to tunnel between different topological sectors.
Frozen topology
Mar 28, 2008S Hashimoto (KEK)25
If the MD-type algorithm is used, the global topology never changes.
Provided that the step size is small enough.
Property of the continuum QCD: common for all lattice formulations as the continuum limit is approached.
20 )(det mHW −
Cluster decomposition
Mar 28, 2008S Hashimoto (KEK)26
In QCD, the real vacuum has a certain distribution of the topological charge = the θ vacuum.
Required to satisfy the cluster decomposition property: topology distribution must satisfy
Can one reproduce the physics of the θ vacuum from the fixed topology simulations?
Sum-up the topology! Or, not?
Ω1 Ω2 1 2 1 2( ) ( ) ( )f Q Q f Q f Q+ =
( ) i Qf Q e θ=
Sum-up the topology!
Mar 28, 2008S Hashimoto (KEK)27
Partition function of the vacuum
Vacuum energy density E(θ)Partition function for a fixed Q
Using a saddle point expansion around (θc=iQ/V), one can evaluate the θ integral to obtain
Then, the original partition function can be recovered, if one knows χt, c4, etc., as
[ ]( ) exp ( )Z VEθ θ= −
2 44( ) ...2 12
t cE χθ θ θ= + +
[ ]1 1( ) exp ( ) ; ( ) ( ) /2 2
i QQZ d Z e d VF F E i Q V
π πθ
π πθ θ θ θ θ θ θ
π π+ +
− −= = − = −∫ ∫
( ) ( )
2 24
2 21 1exp 1 ,
2 82Qt tt t t
cQ QZ OV VV V Vχ χπχ χ χ
⎡ ⎤⎛ ⎞⎡ ⎤⎢ ⎥⎜ ⎟= − − +⎢ ⎥ ⎜ ⎟⎢ ⎥⎣ ⎦ ⎝ ⎠⎣ ⎦
( ) i QQ
QZ Z e θθ −=∑
Or, not?
Mar 28, 2008S Hashimoto (KEK)28
Fixing topology = Finite volume effect
When the volume is large enough, the global topology is irrelevant.Topological charge fluctuate locally, according to χt, topological susceptibility.Physics of the θ-vacuum can be recovered by a similar saddle-point analysis, e.g. Some Green’s function:
Aoki, Fukaya, SH, Onogi, PRD76, 054508 (2007)
Topological susceptibility
Mar 28, 2008S Hashimoto (KEK)29
Applying the same formula for the flavor-singlet PS density, χt can be extracted.
'
21lim ( ) (0) (1/ ) ( )m xtQx
QmP x mP O V O eV V
ηχ −
→∞
⎛ ⎞= − − + +⎜ ⎟
⎝ ⎠
tf
mN
χ Σ=
Local topological fluctuation is indeed active as expected.
JLQCD andTWQCD(2007)
2
t
QV
χ =
3. Early physics results
Simulation techniques; then mπ and fπ
Dynamical overlap
Mar 28, 2008S Hashimoto (KEK)31
Recent attempts:
Fodor-Katz-Szabo (2003)Reflection/refraction trick
Cundy et al. (2004)Many algorithmic improvements
DeGrand-Schaefer (2005)Fat-linkSome physics results
Our work:Aoki et al., arXiv:0803.3197 [hep-lat]
Fixed topology: no reflection/refraction required.Large scale simulation with L ≈ 2 fm, mq~ms/6.Mass preconditioning (Hasenbusch) + multi-time step
Broad physics program:Pion/kaon physicsε-regime
Parameters
Mar 28, 2008S Hashimoto (KEK)32
Nf=2 runs (finished)many physics analysis on-going
β=2.30 (Iwasaki), a=0.12 fm, 163x326 sea quark masses mq = 0.015 … 0.100, covering ms/6~ms10,000 HMC traj.
~4,000 with 4D solver~6,000 with 5D solver
Q=0 sector only, except Q=−2, −4 runs at mq=0.050
Nf=2+1 runs (still running)some physics analysis on-going
β=2.30 (Iwasaki), a=0.11 fm, 163x485 ud quark masses, covering ms/6~ms
x 2 s quark masses2,500 HMC traj.
Using 5D solver
Q=0 sector only
Measurement techniques
Mar 28, 2008S Hashimoto (KEK)33
Measurements at every 20 traj ⇒500 conf / msea
Improved measurements50 pairs of low modes calculated and stored.Used for low mode preconditioning (deflation) ⇒ (multi-mass) solver is then x8 fasterLow mode averaging(and all-to-all)
),(),(),(),(),(
yxCyxCyxCyxCyxC
lhhl
hhll
++
+=
†1 ( ) 1
1
( ) ( )( , ) ( , )N
hk km m
k k
u x u yD x y D x ymλ
− −
=
= ++∑
Test of ChPT
Mar 28, 2008S Hashimoto (KEK)34
Need a critical test of ChPT, before using it in the analysis of other quentities.With exact chiral symmetry, we don’t have to worry about the explicit breaking terms.
Not ambiguous even at finite lattice spacing.
Use mπ and fπ:Simplest quantities, numerically easy to calculate to a good precision.Other quantities will follow.
2 2
2 2 21 ln2 (4 )
fNf m mf f mπ π π
ππ μ= − +
+
JLQCD (2002)With clover
Finite size effect
Mar 28, 2008S Hashimoto (KEK)35
At a price of … finite volume lattice
At L~1.9 fm (smallest mπL~3), finite size effect is not negligible; corrected usingχPT at NNLO
Colangelo-Durr-Haefeli, NPB721, 136 (2005))
Fixed topologyAoki et al., arXiv:0707.0396 with NLO χPT and measured χt
NNLO analysis
Mar 28, 2008S Hashimoto (KEK)36
NNLO χPT predicts the mass dependence as
NNLO analysis
Mar 28, 2008S Hashimoto (KEK)37
Also, NNLO’
Data slightly favor NNLO; not clear from these plots alone.
Noaki at Lattice 2007
LECs
Mar 28, 2008S Hashimoto (KEK)38
Noaki at Lattice 2007
Inconsistency at NLO; okay after including NNLO.
Other physics measurements
Pion form factor
Mar 28, 2008S Hashimoto (KEK)40
The simplest form factor
Momentum transfer qμ by a virtual photon. Space-like (q2<0) in the πe→πe process.Vector form factor FV(q2) normalized as FV(0)=1, because of the vector current conservation.
Vector (or EM) charge radius ⟨r2⟩Vπ is defined through the slope at q2=0.
2( ') ( ) ( ') ( ), 'Vp V p i p p F q q p pμ μ μ μ μ μπ π = + ≡ −
2 2 2 41( ) 1 ( ),6V V
F q r q O qπ
= + +
All-to-all
Mar 28, 2008S Hashimoto (KEK)41
To improve the signalUsually, the quark propagator is calculated with a fixed initial point (one-to-all)Average over initial point (or momentum config) will improve statistics; possible with all-to-all
1 ( ) ( )† 1 ( ) ( )( )
1 1
1( , ) ( ) ( ) ( ) ( )ev dN N
k k d dhighk
k dD x y u x u y D x yη η
λ− −
= =
⎡ ⎤= + ⎣ ⎦∑ ∑
Low mode contributionRandom noise
High mode propagationFrom the random noice
An example: two-point func
Mar 28, 2008S Hashimoto (KEK)42
Dramatic improvement of the signal, thanks to the averaging over source points
Similar to the low mode averaging; but all-to-all can be used for any n-point func.PP correlator is dominated by the low-modes
Form factor results
Mar 28, 2008S Hashimoto (KEK)43
All-to-all ⇒ many momentum combinations
(1,0,0) → (0,1,0), etc. in units of 2π/L.
q2 dependence well approximated by a vector meson pole + corrections
with mV obtained at the same quark mass.
mq~ms/2
2 212 2
1( ) ...1 / V
F q c qq mπ = + +
−
mq~ms/6
Chiral extrapolation
Mar 28, 2008S Hashimoto (KEK)44
Lattice dataMass dependence very similar to VMD, but the difference is visible.χlog may become significant beyond the region of lattice data.
2 20.388(9)(12) fmV
rπ=
Lower than the exp number, even after the chiralenhancement.
22 2 2
92 2
1 ln 12(4 ) ( )(4 )V
mr L O mf
π ππ
π
ππ μ
⎡ ⎤= − + +⎢ ⎥
⎣ ⎦
BK
Mar 28, 2008S Hashimoto (KEK)45
First (unquenched) lattice calculation with exact chiral symmetry:JLQCD collab, arXiv:0801.4186 [hep-lat].
No problem of operator mixing; otherwise, mixes with OLR, for instance. Enhanced by its wrong chiral behavior.Another test of chiral log. Here the data follows the NLO ChPT.
0 0 2 28( ) ( )3LL K K KK O K B f mμ μ=
OLL
Aμ Aμ
2 22 4
2 2
61 ln ( )(4 )
P PP P P P
m mB B bm O mf
χ
π μ⎡ ⎤
= − + +⎢ ⎥⎣ ⎦
Two-point functions
Mar 28, 2008S Hashimoto (KEK)46
A new application: two-point functions in the momentum space.
Weinberg sum rules:
Pion mass differenceDas et al. (1967)
( )( )[ ](0)(1)
01
JνμJνμμν
JνμJνμμννμ
sssssgεiqs
ds
qqqqqgJJ
ΠΠ
ΠΠ
ImIm2
02
)()(2
−−+−
=
−−=⟩⟨
∫∞
2 EM2
2 2 (1 0) 2 (1 0) 2
0
34
( ) ( )V A
mf
dQ Q Q Q
ππ
απ
∞+ +
Δ = −
⎡ ⎤× Π −Π⎣ ⎦∫
[ ][ ])()(lim
,)()(lim
2(2(220
2(2(2
0
2
2
2
QQQQ
S
QQQf
AVQ
AVQ
π
0)10)1
0)10)1
++
→
++
→
−∂∂
−=
−−=
ΠΠ
ΠΠ
Chiral symmetry is essential.
ε-regime
Mar 28, 2008S Hashimoto (KEK)47
Entering the ε-regime:Pion is nearly massless.Compton wavelength is longer than the lattice extent mπL ≤ 1Finite momentum mode is suppressed.
Dependence on topological charge
Info on the Dirac operator eigenvalue spectrum through
ZQCD = ZχPT(Leutwyler-Smilga, 1992)
More detailed analytical info through Chiral Random Matrix Theory (χRMT)[ ])(Tr †UUML PT +Σ=χ
(Damgaard, Nishigaki, 2001)
Simulation in the ε-regime
Mar 28, 2008S Hashimoto (KEK)48
Harder, but not prohibitiveCost grows rather mildly.Condition number is governed by the first eigenvalue, not mFirst eigenvalue is lifted by the fermiondeterminantAuto-correlation is longer.
0 400 800 1200 1600traj
400
600
800
1000
Nin
v
am = 0.002am = 0.020am = 0.030am = 0.110
( )∏ +k
k m22λ
Eigenvalue spectrum
Mar 28, 2008S Hashimoto (KEK)49
Simulation parameters:β=2.35, a = 0.11 fm, 163x32, 6 mq + 1mq = 3 MeV reached. mπL ≈ 14,600 HMC traj.50 pairs of eigenvaluescalculated, every 10 traj.
Banks-Casher relation
Chiral symmetry restored in the massless limit (fixed V)
0 200 400 600 800 1000 1200 1400 1600traj
0
0.01
0.02
0.03
0.04
λ 1
am = 0.002am = 0.020am = 0.030am = 0.110
Spectral densiry
)0(ρπψψ =−
Comparison with χRMT
Mar 28, 2008S Hashimoto (KEK)50
χRMTEquivalent to χPT at the LO in the ε-expansion.Predicts eigenvalues of D in unit of λΣV.
⟨λ1⟩ΣV = 4.30⟨λ2⟩ΣV = 7.62…
for Nf=2, Q=0.Σ may be extracted from average eigenvalues.
eigenvalue ratios
cumulative density
Fukaya et al., PRL98, 172001 (2007)
[ ]3(2GeV) 251(7)(11) MeVMSΣ =
Other observables in the ε-regime
Mar 28, 2008S Hashimoto (KEK)51
Meson correlators (Damgaardet al., 2002)
in the ε-regimecan extract fπNLO calculation possible/available.
3-pt functions (Hernandez-Laine, 2006)
Several B parameters
Eigenvalue correlations (Damgaard et al., 2006)
with imaginary chemical potentialcan extract fπ
Wide variety of applications, all without chiral extrapolations.3
87.3(5.6) MeV(2 GeV) [239.8(4.0) MeV]
F =
Σ =
Fukaya et al., arXiv:0711.4965v3 [hep-lat]
And, more to come
Mar 28, 2008S Hashimoto (KEK)52
More applications, for which the exact chiral symmetry is essential or at least useful. Partial list includes
Pion scalar form factorNucleon sigma term, strange quark contentStrong coupling constant, gluon condensate
Details will appear at Lattice 2008.
Summary
Mar 28, 2008S Hashimoto (KEK)53
Motivation for using chirally invariant fermions should be obvious.
Operator mixing, power divergence, chiral perturbation theory, topology, ε-regime, …
Only question is its practical feasibility.Dynamical overlap fermion simulation is feasible with O(10 Tflops) machine.
In addition to several clever algorithms, fixing the topological charge is the key. Will become necessary for other fermionformulations too.Many physics applications to emerge.