Interactions in the G₂ vacuum structure and the static potentials

We investigate the domain structures of the G$_2$ vacuum within the framework of the domain model, analyzing the interactions among vacuum domains. Refinements to the static potentials in the intermediate regime reveal the crucial role of SU($3$) and SU($2$) subgroups in the confinement mechanism of the G$_2$ gauge group. Inside vacuum domains of G$_2$ with nonzero aggregate flux, repulsive interactions among subgroup vortices are found. Models containing either SU($3$) or SU($2$) domains, as well as vacuum domains with zero aggregate flux, exhibit favorable Casimir scaling and convexity properties at intermediate distances; notably, the SU($3$) version shows no concave regions in the potential at all. For a Wilson loop of increasing size, all subgroup center vortices belonging to a vacuum domain with nonzero aggregate flux, when fully enclosed by the loop, do not contribute a nontrivial phase, supporting the viability of this picture as a model for the vacuum structure of G$_2$ theory. The long-range behavior of the static potential yields the expected ordering of the (constant) potential values at large distances with respect to representation.