On subelliptic harmonic maps with potential

Abstract

Let (M,H,gH;g) be a sub-Riemannian manifold and (N,h) be a Riemannian manifold. For a smooth map u: M N, we consider the energy functional EG(u) = 12 ∫M[|duH|2-2G(u)] dVM, where duH is the horizontal differential of u, G:N R is a smooth function on N. The critical maps of EG(u) are referred to as subelliptic harmonic maps with potential G. In this paper, we investigate the existence problem for subelliptic harmonic maps with potentials by a subelliptic heat flow. Assuming that the target Riemannian manifold has non-positive sectional curvature and the potential G satisfies various suitable conditions, we prove some Eells-Sampson type existence results when the source manifold is either a step-2 sub-Riemannian manifold or a step-r sub-Riemannian manifold whose sub-Riemannian structure comes from a tense Riemannian foliation.