Free energy and theta dependence of SU(N) gauge theories
Abstract
We study the dependence of the free energy on the CP violating angle theta, in four-dimensional SU(N) gauge theories with N >= 3, and in the large-N limit. Using the Wilson lattice formulation for numerical simulations, we compute the first few terms of the expansion of the ground-state energy F(theta) around theta = 0, F(theta) - F(0) = A2 theta2 (1 + b2 theta2 + ...). Our results support Witten's conjecture: F(theta) - F(0) = A theta2 + O(1/N) for theta < pi. We verify that the topological susceptibility has a nonzero large-N limit chiinfinity = 2A with corrections of O(1/N2), in substantial agreement with the Witten-Veneziano formula which relates chiinfinity to the eta' mass. Furthermore, higher order terms in theta are suppressed; in particular, the O(theta4) term b2 (related to the eta' - eta' elastic scattering amplitude) turns out to be quite small: b2 = -0.023(7) for N=3, and its absolute value decreases with increasing N, consistently with the expectation b2 = O(1/N2).
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