Nonperturbative beta function of twelve-flavor SU(3) gauge theory

Abstract

We study the discrete beta function of SU(3) gauge theory with Nf=12 massless fermions in the fundamental representation. Using an nHYP-smeared staggered lattice action and an improved gradient flow running coupling gc2(L) we determine the continuum-extrapolated discrete beta function up to gc2 ≈ 8.2. We observe an IR fixed point at g2 = 7.3(-2+8) in the c = 8t / L = 0.25 scheme, and g2 = 7.3(-3+6) with c=0.3, combining statistical and systematic uncertainties in quadrature. The systematic effects we investigate include the stability of the (a / L) 0 extrapolations, the interpolation of gc2(L) as a function of the bare coupling, the improvement of the gradient flow running coupling, and the discretization of the energy density. In an appendix we observe that the resulting systematic errors increase dramatically upon combining smaller c 0.2 with smaller L ≤ 12, leading to an IR fixed point at g2 = 5.9(1.9) in the c=0.2 scheme, which resolves to g2 = 6.9(-1+6) upon considering only L ≥ 16. At the IR fixed point we measure the leading irrelevant critical exponent to be γg = 0.26(2), comparable to perturbative estimates.