How can I prove the following Liouville theorem for an elliptic equation with gradient perturbation?

>Let $u \in L^2(\mathbb R^n;\mathbb R^n)$ be a smooth solution of 
$$ -\Delta u + v \cdot \nabla u = 0 \qquad \text{in } \mathbb R^n$$ where we assume
$\int_{\mathbb{R}^n}|\nabla v|^2 dx \leq C$ and $\mathrm{div}v=0$ for some $C > 0$, then $u$ is constant.