The large-N limit of the topological susceptibility of SU(N) Yang-Mills theories via Parallel Tempering on Boundary Conditions

Abstract

I present a large-N determination of the topological susceptibility of SU(N) Yang--Mills theories using non-perturbative numerical Monte Carlo simulations of the lattice-discretized theory for 3 N 6, and adopting the Parallel Tempering on Boundary Conditions (PTBC) algorithm to bypass topological freezing for N>3. Thanks to this algorithm I am able to explore a uniform range of lattice spacings across all values of N, and to precisely determine for finer lattice spacings compared to previous studies with periodic or open boundary conditions. By taking the continuum limit at fixed smoothing radius in physical units, I am also able to show the independence of the continuum limit of from this choice. I conclude providing a comprehensive comparison of my new PTBC results with previous determinations of the topological susceptibility in the literature, both at finite N and in the large-N limit.

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