I know the covariant derivative of a tensor is $$\nabla_{\mu} V_{\nu}=\partial_\mu V_\nu-\Gamma_{\mu\nu}^{\lambda}V_{\lambda}$$ Now I want to obtain $\nabla_{\mu}\nabla_{\nu}\Phi(x)$ where $\Phi(x)$ is a scalar field. I consider $ V_\nu=\nabla_{\nu}\Phi(x)$ and then $$\nabla_{\mu}\nabla_{\nu}\Phi(x)=\partial_\mu \partial_\nu \Phi(x)-\Gamma_{\mu\nu}^{\lambda}\partial_\lambda \Phi(x)$$
Is this correct? If so, how can I interpret $\nabla_{\mu}\nabla_{\nu}\Phi(x)$?
