Geodesic rays in locally symmetric spaces

## Abstract Let__M__ be a complete non‐compact stable minimal hypersurface in a locally symmetric space __N__ of nonnegative Ricci curvature. We prove that if the integral of square norm of the second fundamental form is finite, i.e., ∫~__M__~ |__A__ |^2^ __dv__ < ∞, then __M__ must be totally geo

Let M be a compact Riemannian symmetric space. We give an analytical expression for the area and volume functions of geodesic balls in M and for the area and volume functions of tubes around some totally geodesic submanifolds P of M. We plot the graphs of these functions for some compact irreducible

Let \(M=G / K\) be a simply connected symmetric space of non-positive curvature. We establish a natural 1-1-correspondence between geodesically convex \(K\)-invariant functions on \(M\) and convex functions, invariant under the Weyl group, on a Cartan subspace.