On Polyharmonic Riemannian Manifolds

Rainer Schimming; Jan Kowolik

doi:10.4171/zaa/254

JournalszaaVol. 6, No. 4pp. 331–339

On Polyharmonic Riemannian Manifolds

Rainer Schimming
Ernst-Moritz-Arndt-Universität Greifswald, Germany
Jan Kowolik
University of Opole, Poland

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Abstract

A natural generalization of the harmonic manifolds is considered: a Riemannian manifold is called $k$ -harmonic or polyharmonic if it admits a non-constant $k$ -harmonic function depending only on the geodesic distance $r = r (x, y)$ or rather on Synge’s function $σ = σ (x, y)$ , i.e. a solution $F$ of $Δ^{k} F (σ) = 0$ . Certain theorems are generalized from harmonic to polyharmonic manifolds.

Cite this article

Rainer Schimming, Jan Kowolik, On Polyharmonic Riemannian Manifolds. Z. Anal. Anwend. 6 (1987), no. 4, pp. 331–339

DOI 10.4171/ZAA/254