Estimating $Ï_\mathrm{top}$ Lattice Artifacts from Flowed SU(2) Calorons
arXiv:1805.11511 · doi:10.1140/epjc/s10052-019-7008-9
Abstract
Lattice computations of the high-temperature topological susceptibility of QCD receive lattice-spacing corrections and suffer from systematics arising from the type and depth of gradient flow. We study the lattice spacing corrections to $Ï_\mathrm{top}$ semi-analytically by exploring the behavior of discretized Harrington-Shepard calorons under the action of different forms of gradient flow. From our study we conclude that $N_Ï= 6$ is definitely too small of a time extent to study the theory at temperatures of order $4~T_\mathrm{c}$ and we explore how the amount of gradient flow influences the continuum extrapolation.
10 pages, 8 figures (published version)