Totally geodesic maps into manifolds with no focal points

Abstract

The set of totally geodesic representatives of a homotopy class of maps from a compact Riemannian manifold M with nonnegative Ricci curvature into a complete Riemannian manifold N with no focal points is path-connected and, when nonempty, equal to the set of energy-minimizing maps in that class. When N is compact, each map from a product W × M into N is homotopic to a map that's totally geodesic on each M-fiber. These results may be used to extend to the case of no focal points a number of splitting theorems of Cao-Cheeger-Rong about manifolds with nonpositive sectional curvature and, in turn, to generalize a non-collapsing theorem of Heintze-Margulis. In contrast with previous approaches, they are proved using neither a geometric flow nor the Bochner identity for harmonic maps.