Generic Transversality of Minimal Submanifolds and Generic Regularity of Two-Dimensional Area-Minimizing Integral Currents

Abstract

Suppose that N is a smooth manifold with a smooth Riemannian metric g0, and that is a smooth submanifold of N. This paper proves that for a generic (in the sense of Baire category) smooth metric g conformal to g0, if F is any simple g-minimal immersion of a closed manifold into N, then F is transverse to and F is self-transverse. The theorem remains true with "transverse" and "self-transverse" replaced by "strongly transverse" and "strongly self-transverse". The theorem also holds for hypersurfaces of constant mean curvature or, more generally, of prescribed mean curvature. The paper also proves that for a generic ambient metric, every 2-dimensional surface (integral current or flat chain mod 2) without boundary that minimizes area in its homology class has support equal to a smoothly embedded minimal surface.