A projective Kahler manifold $X$ of general type is a manifold who is projective and whose canonical bundle is big and nef. Let $\Phi: X \to X_{can}$ denote the map from $X$ to its canonical model. Is it true that the canonical model of $X$ is always smooth and $\Phi$ has no singular fibers?

A projective Kahler manifold $X$ of general type is a manifold which is projective and whose canonical bundle is big and nef. Let $\Phi: X \to X_{can}$ denote the map from $X$ to its canonical model. Is it true that the canonical model of $X$ is always smooth and $\Phi$ has no singular fibers?