Aspects of the QCD θ-vacuum

Abstract

This paper addresses two aspects concerning the θ-vacuum of Quantum Chromodynamics. First, large-Nc chiral perturbation theory is used to calculate the first two non-trivial cumulants of the distribution of the winding number, i.\,e. the topological susceptibility, top, and the fourth cumulant, c4, up to next-to-leading order. Their large-Nc scaling is discussed, and compared to lattice results. It is found that top=O(Nc0), as known before, and c4=O(Nc-3), correcting the assumption of O(Nc-2) in the literature. Second, we discuss the properties of QCD at θπ using chiral perturbation theory for the case of 2+1 light flavors, i.\,e. by taking the strange quark mass heavier than the degenerate up and down quark masses. It is shown that --- in accordance with previous findings for Nf=2 and Nf=3 mass-degenerate flavors --- in the region θπ two vacuum states coexist, which become degenerate at θ=π. The wall tension of the energy barrier between these degenerate vacua is determined as well as the decay rate of a false vacuum.