Biharmonic Maps Between Conformally Compact Manifolds
Abstract
We study biharmonic maps between conformally compact manifolds, a large class of complete manifolds with bounded geometry, asymptotically negative curvature, and smooth compactification. These metrics provide a far-reaching generalization of hyperbolic space. We work on the class of simple -maps, i.e. maps which send interior to interior, boundary to boundary, and are transversal to the boundary of the target manifold. The main result of this paper is a non-existence result: if a simple -map between conformally compact manifolds is biharmonic, its restriction to the boundary is non-constant, and moreover is non-positively curved, then is harmonic. We do not assume any integrability condition on : in particular, is not required to have finite energy, nor is its tension field required to be in for any . Our result implies the following version of the Generalized Chen's Conjecture: if is a non-positively curved conformally compact manifold, and is a properly embedded submanifold with boundary meeting transversely, then is biharmonic if and only if it is minimal.
Cite
@article{arxiv.2502.13580,
title = {Biharmonic Maps Between Conformally Compact Manifolds},
author = {Marco Usula},
journal= {arXiv preprint arXiv:2502.13580},
year = {2026}
}
Comments
Small title change; added journal reference