XQCD 2007T.Umeda (Tsukuba)1 Study of constant mode in charmonium correlators in hot QCD Takashi Umeda This talk is based on the Phys. Rev. D75 094502 (2007)

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Presentation transcript:

xQCD 2007T.Umeda (Tsukuba)1 Study of constant mode in charmonium correlators in hot QCD Takashi Umeda This talk is based on the Phys. Rev. D (2007) Extreme QCD, INFN, Frascati, Italy, 6 August 2007 [hep-lat/ ]

xQCD 2007T.Umeda (Tsukuba)2 Introduction There is a constant mode in meson correlators at T>0 T.Umeda Phys.Rev. D (2007) The constant mode is important for the study of charmonium properties at T>0  low energy mode strongly affects its correlators which is fundamental data of lattice QCD studies In the Lattice 2007 symposium, the relation between the constant mode and (sequential) J/psi suppression is mainly discussed then in this talk I focus on the properties of the constant mode

xQCD 2007T.Umeda (Tsukuba)3 Contents Introduction Constant mode in meson correlators at T>0 - what is the constant mode ? - meson correlator with free quarks - physical interpretation - analysis w/o constant mode Quenched QCD calculations at T>0 Discussion & Conclusion

xQCD 2007T.Umeda (Tsukuba)4 Constant mode Pentaquark (KN state): two pion state:  Dirichlet b.c. c.f. T.T.Takahashi et al., PRD71, (2005). exp(-m q t) x exp(-m q t) = exp(-2m q t) exp(-m q t) x exp(-m q (L t -t)) = exp(-m q L t ) m q is quark mass or single quark energy L t = temporal extent in imaginary time formalism L t = 1/Temp. gauge field : periodic b.c. quark field : anti-periodic b.c. in confined phase: m q is infinite  the effect appears only in deconfined phase

xQCD 2007T.Umeda (Tsukuba)5 Free quark calculations 16 3 x 32 isotropic lattice Wilson quark action with m q a = 0.2 Obvious constant contribution in P-wave states

xQCD 2007T.Umeda (Tsukuba)6 Free quark calculations Continuum form of the correlators with P=0 calculated by S. Sasaki : single quark energy with relative mom. p where

xQCD 2007T.Umeda (Tsukuba)7 Volume dependence Size of the constant contribution depends on the volume N s 3 The dependence is negligible at N s /N t ≳ 2 Results on 96 3 x 32 ( N s /N t =3  similar to T>0 quench QCD calculation )

xQCD 2007T.Umeda (Tsukuba)8 Physical interpretation constant mode remains in the continuum & infinite volume The constant term is related to some transport coefficients. From Kubo-formula, for example, a derivative of the SPF in the V channel is related to the electrical conductivity σ. F. Karsch et al., PRD68, (2003). G. Aarts et al., NPB726, 93 (2005). Spectral function at high temp. limit

xQCD 2007T.Umeda (Tsukuba)9 Without constant mode In the study of charmonium dissociation temperatures, we consider a Temp. dependence of bound state peaks from “An Introduction to Quantum Field Theory” Michael E. Peskin, Perseus books (1995) Low energy mode dominates correlators at large t range If there is no constant mode we can easily see the change of bound states from correlators Methods to avoid the const. mode are discussed

xQCD 2007T.Umeda (Tsukuba)10 Midpoint subtraction An analysis to avoid the constant mode Midpoint subtracted correlator Free quarks

xQCD 2007T.Umeda (Tsukuba)11 Z 3 symmetrization Here we consider the Z 3 transformation Z 3 symmetric Z 3 asymmetric The asymmetry of diag-(b) is coming from a factor of Re[exp(-i2πn/3)] Z 3 asym. terms are removed because

xQCD 2007T.Umeda (Tsukuba)12 Averaged correlators However, this is not an exact method to avoid the constant contribution. The 3 times wrapping diagram is also Z 3 symmetric.  the contribution is not canceled. but, O(exp(-m q N t )) » O(exp(-3m q N t ))

xQCD 2007T.Umeda (Tsukuba)13 Lattice QCD results Lattice setup Quenched approximation ( no dynamical quark effect ) Anisotropic lattices (tadpole imp. Clover quark + plaq. gauge) lattice size : 20 3 x N t lattice spacing : 1/a s = 2.03(1) GeV, anisotropy : a s /a t = 4 Quark mass charm quark (tuned with J/ψ mass) r s =1 to reduce cutoff effects in higher energy states F. Karsch et al., PRD68, (2003). t x,y,z equilib. is 20K sweeps each config. is separated by 500 sweeps

xQCD 2007T.Umeda (Tsukuba)14 Quenched QCD at T>0 small change in S-wave states  survival of J/ψ & η c at T>T c drastic change in P-wave states  dissociation of χ c just above Tc (?) S. Datta et al., PRD69, (2004). etc...

xQCD 2007T.Umeda (Tsukuba)15 Midpoint subtraction analysis usual effective masses at T>0 the drastic change in P-wave states disappears in m eff sub (t)  the change is due to the constant mode subtracted effective mass 0.1a t =800MeV

xQCD 2007T.Umeda (Tsukuba)16 Polyakov loop sector dependence Results for Av channel after Z 3 transformation const.  Re(exp(-i2πn/3))*const. even below T c, small const. effect enhances the stat. fluctuation. drastic change in P-states disappears.

xQCD 2007T.Umeda (Tsukuba)17 Discussion The drastic change of P-wave states is due to the const. contribution.  There are small changes in SPFs ( except for ω=0 ). Why several MEM studies show the dissociation of χ c states ? point operatorsextended operators subtracted averaged

xQCD 2007T.Umeda (Tsukuba)18 Difficulties in MEM analysis MEM test using T=0 data # data for T/T c =0 # data for T/T c =0.6 # data for T/T c =1.2 MEM analysis sometimes fails if data quality is not sufficient Furthermore P-wave states have larger noise than that of S-wave states

xQCD 2007T.Umeda (Tsukuba)19 MEM w/o the constant mode In the MEM analysis, one has to check consistency of the results at using, e.g., midpoint subtracted correlators.

xQCD 2007T.Umeda (Tsukuba)20 Conclusion There is the constant mode in charmonium correlators above T c The drastic change in χ c states is due to the constant mode  the survival of χ c states above T c, at least T=1.4T c. The result may affect the scenario of J/ψ suppression.