Min-max Minimal Hypersurfaces with Obstacle

Abstract

We study min-max theory for area functional among hypersurfaces constrained in a smooth manifold with boundary. A Schoen-Simon-type regularity result is proved for integral varifolds which satisfy a variational inequality and restrict to a stable minimal hypersurface in the interior. Based on this, we show that for any admissible family of sweepouts in a compact manifold with boundary, there always exists a closed C1,1 hypersurface with codimension≥ 7 singular set in the interior and having mean curvature pointing outward along boundary realizing the width L().