On f-polyharmonic maps between Riemannian manifolds

Abstract

This paper is devoted to a general study of f-polyharmonic maps of order k (or f-k-harmonic maps), defined as critical points of the weighted k-energy functional \[ Ef,k(ϕ)=12∫Ωf |Δk/2ϕ|2 dvg. \] This framework provides a unifying perspective that extends previous theories including f-harmonic maps (k=1), biharmonic and f-biharmonic maps (k=2), and polyharmonic maps (k 3 with constant f), with the classical harmonic maps recovered as the special case k=1 by setting f const. We derive the Euler--Lagrange equation for general f-polyharmonic maps. As concrete applications, we classify f-k-harmonic curves with positive constant geodesic curvature in a space form N2(C) for k=3,4. Several explicit constructions of proper f-polyharmonic functions and maps are also provided, and a Liouville-type theorem is proved: every f-polyharmonic function on a closed Riemannian manifold is constant.

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