Assume that $V$ is a vector field on a Riemannian manifold $(M,g)$ with natural volume form $\Omega$ arising from $g$. Assume that the solution curves of $V$ are parametrized geodesics of the Riemannian metric $g$.
Is it true to say that the space of harmonic functions is invariant under the derivational operator $D(f)=V.f=df(V)$?
The question is related to the following post
Take a warped product $M=\mathbb S^1\times_f\mathbb S^1$ for a nonconstant smooth function $f$.
The horizontal vector field $V$ satisfies your condition, but for harmonic function is not invariant $f$, the function $Vf$ is not harmonic.
To see this, consider the $V$-flow $\Phi^t\colon M\to M$. If $Vf$ is always harmonic then so is $f\circ\Phi^t$ for any $t$. The latter fails evidently.
