Min-max theory for free boundary minimal hypersurfaces in locally wedge-shaped manifolds

Abstract

We develop a min-max theory for the area functional in the class of locally wedge-shaped manifolds. Roughly speaking, a locally wedge-shaped manifold is a Riemannian manifold that is allowed to have both boundary and certain types of edges. Fix a dimension 3 n+1 6. As our main theorem, we prove that every compact locally wedge-shaped manifold Mn+1 with acute wedge angles contains a locally wedge-shaped free boundary minimal hypersurface n which is smooth in its interior and on its faces and is C2,α up to and including its edge. We can also handle the case of 90 degree wedge angles under an additional assumption.