Harmonic vector fields on extended 3-dimensional Riemannian Lie groups

Abstract

Given two Riemannian manifolds (B,gB) and (F,gF), we give harmonicity conditions for vector fields on the Riemannian warped product B×fF, with f:B ]0,+∞[, using a characteristic variational condition. Then, we apply this to the case B=R and F is a three-dimensional connected Riemannian Lie group G equipped with a left-invariant metric, to determine harmonic vector fields on R×fG. We give examples of harmonic vector fields on G which are not left-invariant and determine harmonic vector fields on R×fG. We conclude with some examples of vector fields on R×fG which are harmonic maps.