Conformal change of Riemannian metrics and biharmonic maps

Abstract

For the reduction ordinary differential equation due to Baird and Kamissoko BK for biharmonic maps from a Riemannian manifold (Mm,g) into another one (Nn,h), we show that this ODE has no global positive solution for every m≥ 5. On the contrary, we show that there exist global positive solutions in the case m=3. As applications, for the the Riemannian product (M3,g) of the line and a Riemann surface, we construct the new metric g on M3 conformal to g such that every nontrivial product harmonic map from M3 with respect to the original metric g must be biharmonic but not harmonic with respect to the new metric g.