Existence of classical minimal surfaces in 4 and 5-manifolds

Abstract

We prove that every closed Riemannian 4 or 5-manifold M contains a branched immersed closed minimal surface. That is, there exists a non-constant weakly conformal harmonic map from some closed Riemann surface into M. We rely on the existence of multisections in dimensions 4 and 5 to generate a non-trivial class of sweepouts of M by mappings from a closed surface S of genus at least 2. To each sweepout in a minimizing sequence within the class, through the intermediary of quasiconformal maps of the upper half-plane, we associate a family of hyperbolic metrics on S with respect to which the mappings in the sweepout have nearly equal energy and area. The harmonic replacement method of Colding and Minicozzi is then applied to obtain a min-max sequence that converges to a bubble tree of branched minimal immersions.