Canonical divisors and vector bundles

Question

Let $E$, $X$ be irreducible smooth algebraic varieties over the complex numbers and let $p \colon E \to X$ be a morphism which is locally trivial with respect to the Zariski topology. Since $p$ is a vector bundle and the varieties are smooth, we get a natural isomorphism $p^\ast \colon\textrm{Pic}(X) \to \textrm{Pic}(E)$ by the pull-back of divisors, see e.g. Chp. 3 in [Fu84].

Is it true that $p^\ast \omega_X = \omega_E$ where $\omega_X$ and $\omega_E$ denote the canonical divisors of $X$ and $E$ respectively?

Any proof, counter-example or textbook reference would be perfect.

[Fu84] W. Fulton. Intersection theory, Springer-Verlag, Berlin, 1984.

Answer 1

I'm sorry for asking the question. There is an easy counter-example. Let $\mathbb{F}_1$ be the first Hirzebruch surface and let $\pi \colon \mathbb{F}_1 \to \mathbb{P}^1$ be a projection which makes $\mathbb{F}_1$ a $\mathbb{P}^1$-bundle over $\mathbb{P}^1$. Let $S \subset \mathbb{F}_1$ be the unique section of $\pi$ which has self-intersection $-1$. Then $\pi$ restricts to a vector bundle $p \colon E \to \mathbb{P}^1$ where $E = \mathbb{F}_1 \setminus S$. The canonical divisor of $\mathbb{P}^1$ is $-2 P$ where $P$ is some point on $\mathbb{P}^1$. On the other hand, $\mathbb{F}^1$ is the blow-up of $\mathbb{P}^2$ in one point and thus the canonical divisor of $E$ is given by $-3 F$ where $F$ is a fiber of $p$. But the pull-back of $-2P$ on $E$ is $-2 F$.