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Topological susceptibility of QCD with dynamical Mobius domain wall fermions

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 Added by Hidenori Fukaya
 Publication date 2017
  fields
and research's language is English




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We compute the topological susceptibility $chi_t$ of lattice QCD with $2+1$ dynamical quark flavors described by the Mobius domain wall fermion. Violation of chiral symmetry as measured by the residual mass is kept at $sim$1 MeV or smaller. We measure the fluctuation of the topological charge density in a `slab sub-volume of the simulated lattice using the method proposed by Bietenholz {it et al.} The quark mass dependence of $chi_t$ is consistent with the prediction of chiral perturbation theory, from which the chiral condensate is extracted as $Sigma^{overline{rm MS}} (mbox{2GeV}) = [274(13)(29)mbox{MeV}]^3$, where the first error is statistical and the second one is systematic. Combining the results for the pion mass $M_pi$ and decay constant $F_pi$, we obtain $chi_t = 0.229(03)(13)M_pi^2F_pi^2$ at the physical point.



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Domain wall fermions are a new lattice fermion formulation which preserves the full chiral symmetry of the continuum at finite lattice spacing, up to terms exponentially small in an extra parameter. We discuss the main features of the formulation and its application to study of QCD with two light fermions of equal mass. We also present numerical studies of the two flavor QCD thermodynamics with aT = 1/4.
177 - T. Yamazaki , Y. Aoki , T. Blum 2008
We present results for the nucleon axial charge g_A at a fixed lattice spacing of 1/a=1.73(3) GeV using 2+1 flavors of domain wall fermions on size 16^3x32 and 24^3x64lattices (L=1.8 and 2.7 fm) with length 16 in the fifth dimension. The length of the Monte Carlo trajectory at the lightest m_pi is 7360 units, including 900 for thermalization. We find finite volume effects are larger than the pion mass dependence at m_pi= 330 MeV. We also find that g_A exhibits a scaling with the single variable m_pi L which can also be seen in previous two-flavor domain wall and Wilson fermion calculati ons. Using this scaling to eliminate the finite-volume effect, we obtain g_A = 1.20(6)(4) at the physical pion mass, m_pi = 135 MeV, where the first and second errors are statistical and systematic. The observed finite-volume scaling also appears in similar quenched simulations, but disappear when Vge (2.4 fm)^3. We argue this is a dynamical quark effect.
We calculate the spectral function of the QCD Dirac operator using the four-dimensional effective operator constructed from the Mobius domain-wall implementation. We utilize the eigenvalue filtering technique combined with the stochastic estimate of the mode number. The spectrum in the entire eigenvalue range is obtained with a single set of measurements. Results on 2+1-flavor ensembles with Mobius domain-wall sea quarks at lattice spacing ~ 0.08 fm are shown.
We compute the topological susceptibility $chi_t$ of 2+1-flavor lattice QCD with dynamical Mobius domain-wall fermions, whose residual mass is kept at 1 MeV or smaller. In our analysis, we focus on the fluctuation of the topological charge density in a slab sub-volume of the simulated lattice, as proposed by Bietenholz et al. The quark mass dependence of our results agrees well with the prediction of the chiral perturbation theory, from which the chiral condensate is extracted. Combining the results for the pion mass $M_pi$ and decay constant $F_pi$, we obtain $chi_t$ = 0.227(02)(11)$M_pi^2 F_pi^2$ at the physical point, where the first error is statistical and the second is systematic.
We present preliminary results for the strange leading-order hadronic contribution to the anomalous magnetic moment of the muon using RBC/UKQCD physical point domain wall fermions ensembles. We discuss various analysis strategies in order to constrain the systematic uncertainty in the final result.
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