English

Existence of harmonic maps and eigenvalue optimization in higher dimensions

Differential Geometry 2022-07-28 v1 Spectral Theory

Abstract

We prove the existence of nonconstant harmonic maps of optimal regularity from an arbitrary closed manifold (Mn,g)(M^n,g) of dimension n>2n>2 to any closed, non-aspherical manifold NN containing no stable minimal two-spheres. In particular, this gives the first general existence result for harmonic maps from higher-dimensional manifolds to a large class of positively curved targets. In the special case of the round spheres N=SkN=\mathbb{S}^k, k3k\geq 3, we obtain a distinguished family of nonconstant harmonic maps MSkM\to \mathbb{S}^k of index at most k+1k+1, with singular set of codimension at least 77 for kk sufficiently large. Furthermore, if 3n53\leq n\leq 5, we show that these smooth harmonic maps stabilize as kk becomes large, and correspond to the solutions of an eigenvalue optimization problem on MM, generalizing the conformal maximization of the first Laplace eigenvalue on surfaces.

Keywords

Cite

@article{arxiv.2207.13635,
  title  = {Existence of harmonic maps and eigenvalue optimization in higher dimensions},
  author = {Mikhail Karpukhin and Daniel Stern},
  journal= {arXiv preprint arXiv:2207.13635},
  year   = {2022}
}

Comments

60 pages

R2 v1 2026-06-25T01:16:51.289Z