Sp(2N) Yang-Mills theories on the lattice: scale setting and topology
Abstract
We study Yang-Mills lattice theories with Sp(Nc) gauge group, with Nc=2N, for N=1,\,·s,\,4. We show that if we divide the renormalised couplings appearing in the Wilson flow by the quadratic Casimir C2(F) of the Sp(Nc) group, then the resulting quantities display a good agreement among all values of Nc considered, over a finite interval in flow time. We use this scaled version of the Wilson flow as a scale-setting procedure, compute the topological susceptibility of the Sp(Nc) theories, and extrapolate the results to the continuum limit for each Nc.
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