Is $N=2$ Large?

Kavli Affiliate: Masahito Yamazaki

| First 5 Authors: Ryuichiro Kitano, Norikazu Yamada, Masahito Yamazaki, ,

| Summary:

We study $theta$ dependence of the vacuum energy for the 4d SU(2) pure
Yang-Mills theory by lattice numerical simulations. The response of topological
excitations to the smearing procedure is investigated in detail, in order to
extract topological information from smeared gauge configurations. We determine
the first two coefficients in the $theta$ expansion of the vacuum energy, the
topological susceptibility $chi$ and the first dimensionless coefficient
$b_2$, in the continuum limit. We find consistency of the SU(2) results with
the large $N$ scaling. By analytic continuing the number of colors, $N$, to
non-integer values, we infer the phase diagram of the vacuum structure of SU(N)
gauge theory as a function of $N$ and $theta$. Based on the numerical results,
we provide quantitative evidence that 4d SU(2) Yang-Mills theory at $theta =
pi$ is gapped with spontaneous breaking of the CP symmetry.

| Search Query: ArXiv Query: search_query=au:”Masahito Yamazaki”&id_list=&start=0&max_results=10

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