We prove a Liouville theorem for biharmonic maps between complete Riemannian manifolds, where we do not make any assumption on the curvature of the target manifold. Instead, we require that the image of the map is contained in a compact set and that its tension field is sufficiently small.
Liouville theorems, Volume growth, and volume comparison for Ricci shrinkers
New gap theorem on complete Riemannian manifolds
On the existence of Hermitian-harmonic maps from complete Hermitian to complete Riemannian manifolds
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