English

Anomalous Dimension in QCD

High Energy Physics - Phenomenology 2023-10-06 v1 High Energy Physics - Theory

Abstract

The anomalous dimension γm=1\gamma_m =1 in the infrared region near conformal edge in the broken phase of the large NfN_f QCD has been shown by the ladder Schwinger-Dyson equation and also by the lattice simulation for Nf=8N_f=8 for Nc=3 N_c=3. Recently Zwicky claimed another independent argument (without referring to explicit dynamics) for the same result, γm=1\gamma_m =1. We show that this is not justified by explicit evaluation of each matrix element based on the ``dilaton chiral perturbation theory (dChPT)'' : <π(p2)2i=1Nfmfψˉiψiπ(p1)>=2Mπ2+[(1γm)Mπ22/(1+γm)]=2Mπ22/(1+γm)2Mπ2<\pi(p_2)| 2\cdot \sum^{N_f}_{i=1} m_f \bar \psi_i \psi_i |\pi(p_1)>= 2M_\pi^2 + [(1-\gamma_m) M_\pi^2\cdot 2/(1+\gamma_m)]= 2 M_\pi^2 \cdot 2/(1+\gamma_m) \ne 2 M_\pi^2 in contradiction with his estimate, which is compared with <π(p2)(1+γm)i=1Nfmfψˉiψiπ(p1)>=(1+γm)Mπ2+[(1γm)Mπ2]=2Mπ2<\pi(p_2)| (1+\gamma_m) \cdot \sum^{N_f}_{i=1} m_f \bar \psi_i \psi_i |\pi(p_1)> =(1+\gamma_m) M_\pi^2+ [(1-\gamma_m) M_\pi^2]=2 M_\pi^2 (both up to trace anomaly), where the terms in [][ \,\,] are from the σ\sigma (pseudo-dilaton) pole contribution. Thus there is no constraint on γm\gamma_m when the σ\sigma pole contribution is treated consistently for both.

Keywords

Cite

@article{arxiv.2310.03197,
  title  = {Anomalous Dimension in QCD},
  author = {Koichi Yamawaki},
  journal= {arXiv preprint arXiv:2310.03197},
  year   = {2023}
}

Comments

Submitted to Special Issue `Emergence of Symmetries in Strong Nuclear Correlations' of Symmetry

R2 v1 2026-06-28T12:40:57.540Z