English

Explicit harmonic and wave maps into variable-curvature surfaces

Differential Geometry 2026-05-28 v2 Analysis of PDEs

Abstract

Explicit harmonic and wave maps are typically available only in highly symmetric or constant-curvature settings, where additional symmetry or integrability structures are present. We develop a reduction framework for pseudo-Riemannian surfaces that extends explicit constructions to a geometrically significant class of variable-curvature targets. For target metrics of the form A(R)dR2δ2B(R)dS2A(R)\,dR^2 - \delta^2 B(R)\,dS^2, a geometrically adapted travelling-wave ansatz reduces the Euler--Lagrange system to a solvable system of first-order ODEs. The method applies simultaneously to harmonic and wave maps, treating the elliptic and hyperbolic regimes uniformly within a single framework. As concrete applications, we construct explicit harmonic maps into ellipsoids, Lorentzian wave maps into hyperboloids and the Schwarzschild exterior, and a mixed-signature example, all in genuinely variable-curvature geometries where explicit constructions are substantially less accessible.

Keywords

Cite

@article{arxiv.2512.18376,
  title  = {Explicit harmonic and wave maps into variable-curvature surfaces},
  author = {Anestis Fotiadis and Giannis Polychrou},
  journal= {arXiv preprint arXiv:2512.18376},
  year   = {2026}
}
R2 v1 2026-07-01T08:34:53.280Z