Nonexistence of proper p-biharmonic maps and Liouville type theorems I: case of p≥2
Abstract
Let u: (M, g) (N, h) be a map between Riemannian manifolds (M, g) and (N, h). The p-bienergy of u is defined by Ep(u)=∫M|τ(u)|pdg, where τ(u) is the tension field of u and p>1. Critical points of Ep(·) are called p-biharmonic maps. In this paper we will prove nonexistence result of proper p-biharmonic maps when p≥2. In particular when M=Rm, we get Liouville type results under proper integral conditions , which extend the related results of Baird, Fardoun and Ouakkas BFO.
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