# Nucleon isovector charges and twist-2 matrix elements with $N_f=2+1$   dynamical Wilson quarks

**Authors:** Tim Harris, Georg von Hippel, Parikshit Junnarkar, Harvey B. Meyer,, Konstantin Ottnad, Jonas Wilhelm, Hartmut Wittig, Linus Wrang

arXiv: 1905.01291 · 2019-08-28

## TL;DR

This lattice QCD study computes nucleon isovector charges and twist-2 matrix elements with improved Wilson fermions, providing precise results after careful chiral, continuum, and finite-size extrapolations.

## Contribution

The paper presents the first comprehensive lattice QCD calculation of nucleon isovector charges and twist-2 matrix elements using non-perturbatively improved Wilson fermions with multiple lattice spacings and pion masses.

## Key findings

- Physical values for nucleon isovector charges: g_A, g_S, g_T.
- Results for quark momentum and helicity fractions.
- Assessment of excited-state contamination and systematic errors.

## Abstract

We present results from a lattice QCD study of nucleon matrix elements at vanishing momentum transfer for local and twist-2 isovector operator insertions. Computations are performed on gauge ensembles with non-perturbatively improved $N_f=2+1$ Wilson fermions, covering four values of the lattice spacing and pion masses down to $M_\pi\approx200$MeV. Several source-sink separations (typically ~1.0fm to ~1.5fm) allow us to assess excited-state contamination. Results on individual ensembles are obtained from simultaneous two-state fits across all observables and all available source-sink separations with the energy gap as a common fit parameter. Renormalization has been performed non-perturbatively using the Rome-Southampton method for all but the finest lattice spacing for which an extrapolation has been used. Physical results are quoted in the $\overline{MS}$ scheme at a scale of $\mu=2$GeV and are obtained from a combined chiral, continuum and finite-size extrapolation. For the nucleon isovector axial, scalar and tensor charges we find physical values of $g_A^{u-d}=1.242(25)_\text{stat}(\genfrac{}{}{0pt}{2}{+00}{-31})_\text{sys}$, $g_S^{u-d}=1.13(11)_\text{stat}(\genfrac{}{}{0pt}{2}{+07}{-06})_\text{sys}$ and $g_T^{u-d}=0.965(38)_\text{stat}(\genfrac{}{}{0pt}{2}{+13}{-41})_\text{sys}$, respectively, where individual systematic errors in each direction from the chiral, continuum and finite-size extrapolation have been added in quadrature. Our final results for the isovector average quark momentum fraction and the isovector helicity and transversity moments are given by $\langle x\rangle_{u-d}=0.180(25)_\text{stat}(\genfrac{}{}{0pt}{2}{+14}{-06})_\text{sys}$, $\langle x\rangle_{\Delta u-\Delta d}=0.221(25)_\text{stat}(\genfrac{}{}{0pt}{2}{+10}{-00})_\text{sys}$ and $\langle x\rangle_{\delta u-\delta d}=0.212(32)_\text{stat}(\genfrac{}{}{0pt}{2}{+20}{-10})_\text{sys}$, respectively.

## Full text

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## Figures

48 figures with captions in the complete paper: https://tomesphere.com/paper/1905.01291/full.md

## References

85 references — full list in the complete paper: https://tomesphere.com/paper/1905.01291/full.md

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Source: https://tomesphere.com/paper/1905.01291