The structure of the Yang-Mills spectrum for arbitrary simple gauge algebras

Abstract

The mass spectrum of pure Yang-Mills theory in 3+1 dimensions is discussed for an arbitrary simple gauge algebra within a quasigluon picture. The general structure of the low-lying gluelump and two-quasigluon glueball spectrum is shown to be common to all algebras, while the lightest C=- three-quasigluon glueballs only exist when the gauge algebra is Ar≥ 2, that is in particular su(N≥3). Higher-lying C=- glueballs are shown to exist only for the Ar≥2, D odd-r≥ 4 and E6 gauge algebras. The shape of the static energy between adjoint sources is also discussed assuming the Casimir scaling hypothesis and a funnel form; it appears to be gauge-algebra dependent when at least three sources are considered. As a main result, the present framework's predictions are shown to be consistent with available lattice data in the particular case of an su(N) gauge algebra within 't Hooft's large-N limit.