# Higher-Order Scheme-Independent Series Expansions of   $\gamma_{\bar\psi\psi,IR}$ and $\beta'_{IR}$ in Conformal Field Theories

**Authors:** Thomas A. Ryttov, Robert Shrock

arXiv: 1703.08558 · 2017-05-30

## TL;DR

This paper develops higher-order, scheme-independent series expansions for key quantities in conformal gauge theories, providing more precise tools to analyze their infrared behavior and compare with lattice results.

## Contribution

It introduces the highest-order scheme-independent series expansions for the anomalous dimension and beta function derivative at the IR fixed point in gauge theories.

## Key findings

- The anomalous dimension increases monotonically as the number of fermions decreases.
- The series expansions are consistent with previous loop calculations and lattice data.
- Results are extended to large N_c and N_f limits for fundamental representations.

## Abstract

We study a vectorial asymptotically free gauge theory, with gauge group $G$ and $N_f$ massless fermions in a representation $R$ of this group, that exhibits an infrared (IR) zero in its beta function, $\beta$, at the coupling $\alpha=\alpha_{IR}$ in the non-Abelian Coulomb phase. For general $G$ and $R$, we calculate the scheme-independent series expansions of (i) the anomalous dimension of the fermion bilinear, $\gamma_{\bar\psi\psi,IR}$, to $O(\Delta_f^4)$ and (ii) the derivative $\beta' = d\beta/d\alpha$, to $O(\Delta_f^5)$, both evaluated at $\alpha_{IR}$, where $\Delta_f$ is an $N_f$-dependent expansion variable. These are the highest orders to which these expansions have been calculated. We apply these general results to theories with $G={\rm SU}(N_c)$ and $R$ equal to the fundamental, adjoint, and symmetric and antisymmetric rank-2 tensor representations. It is shown that for all of these representations, $\gamma_{\bar\psi\psi,IR}$, calculated to the order $\Delta_f^p$, with $1 \le p \le 4$, increases monotonically with decreasing $N_f$ and, for fixed $N_f$, is a monotonically increasing function of $p$. Comparisons of our scheme-independent calculations of $\gamma_{\bar\psi\psi,IR}$ and $\beta'_{IR}$ are made with our earlier higher $n$-loop values of these quantities, and with lattice measurements. For $R=F$, we present results for the limit $N_c \to \infty$ and $N_f \to \infty$ with $N_f/N_c$ fixed. We also present expansions for $\alpha_{IR}$ calculated to $O(\Delta_f^4)$.

## Full text

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## Figures

12 figures with captions in the complete paper: https://tomesphere.com/paper/1703.08558/full.md

## References

83 references — full list in the complete paper: https://tomesphere.com/paper/1703.08558/full.md

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Source: https://tomesphere.com/paper/1703.08558