A min-max gap characterization of minimal foliations on the torus

We extend an energy introduced by Mather to the setting of Almgren-Pitts min-max theory and obtain a parametric, higher-dimensional analogue of Mather's variational barrier theory for twist maps and geodesics on tori.

We use this energy to establish several criteria for the existence of foliations of the $n$-torus by minimal hypersurfaces.

We show that for a generic metric, whenever a lamination by area-minimizing hypersurfaces of the $n$-torus contains a gap, there exists a minimal hypersurface inside the gap that is not area-minimizing.

This hypersurface is a higher-dimensional analogue of the secondary minimax orbit appearing in Aubry-Mather theory.