The lattice gradient flow at tree-level and its improvement

TL;DR

This paper calculates the lattice Yang-Mills gradient flow and observable E(t) at finite lattice spacing and tree-level, proposing improvements to reduce discretization errors and enhance simulation accuracy.

Contribution

It provides a perturbative calculation of the gradient flow, gauge action, and observable at finite lattice spacing, enabling systematic improvement and correction of lattice discretization effects.

Findings

Achieves $O(a^2)$, $O(a^4)$, and $O(a^6)$ improvement levels.

Provides correction factors for tree-level improvement of simulation results.

Facilitates more accurate lattice gauge theory computations.

Abstract

The Yang-Mills gradient flow and the observable E(t), defined by the square of the field strength tensor at t>0, are calculated at finite lattice spacing and tree-level in the gauge coupling. Improvement of the flow, the gauge action and the observable are all considered. The results are relevant for two purposes. First, the discretization of the flow, gauge action and observable can be chosen in such a way that $O(a^2)$, $O(a^4)$ or even $O(a^6)$ improvement is achieved. Second, simulation results using arbitrary discretizations can be tree-level improved by the perturbatively calculated correction factor normalized to one in the continuum limit.