Density and spectrum of minimal submanifolds in space forms

Abstract

Let Mm be a minimal properly immersed submanifold in an ambient space close, in a suitable sense, to the space form Nnk of curvature -k 0. In this paper, we are interested in the relation between the density function (r) of Mm and the spectrum of the Laplace-Beltrami operator. In particular, we prove that if (r) has subexponential growth (when k<0) or sub-polynomial growth (k=0) along a sequence, then the spectrum of Mm is the same as that of the space form Nmk. Notably, the result applies to Anderson's (smooth) solutions of Plateau's problem at infinity on the hyperbolic space Hn, independently of their boundary regularity. We also give a simple condition on the second fundamental form that ensures M to have finite density. In particular, we show that minimal submanifolds of Hn with finite total curvature have finite density.