Embeddedness of proper minimal submanifolds in homogeneous spaces

Abstract

We prove the three embeddedness results as follows. ( i) Let 2m+1 be a piecewise geodesic Jordan curve with 2m+1 vertices in Rn, where m is an integer ≥2. Then the total curvature of 2m+1<2mπ. In particular, the total curvature of 5<4π and thus any minimal surface ⊂ Rn bounded by 5 is embedded. Let 5 be a piecewise geodesic Jordan curve with 5 vertices in Hn. Then any minimal surface ⊂ Hn bounded by 5 is embedded. If 5 is in a geodesic ball of radius π4 in Sn+, then ⊂ Sn+ is also embedded. As a consequence, 5 is an unknot in R3, H3 and S3+. ( ii) Let be an m-dimensional proper minimal submanifold in Hn with the ideal boundary ∂∞ = in the infinite sphere Sn-1=∂∞ Hn. If the M\"obius volume of () < 2(Sm-1), then is embedded. If () = 2(Sm-1), then is embedded unless it is a cone. ( iii) Let be a proper minimal surface in . If is vertically regular at infinity and has two ends, then is embedded.