If $X \rightarrow Y$ is a finite morphism of surfaces and $D$ is a nef divisor on $Y$, is the pullback of $D$ nef on X? I am interested in finite covers of Hirzebruch surfaces and need to know if some divisors coming from below are nef.
Thanks for any help!
Yes, and you don't even need to know that $f$ is finite. If $C$ is an integral curve on $X$, we have the projection formula $f^*D \cdot C = D \cdot f_*C$; and $f_*C$ is a non-negative multiple of an integral curve on $Y$.
Perhaps it is worth adding here that if you do assume that f is finite, then the pullback of an ample divisor remains ample.
