Currently I'm studying the article *[Moduli of Enriques surfaces and Grothendieck-Riemann-Roch](http://arxiv.org/abs/math/0701546)* by Pappas. I am particularly interested in how he applies the GRR. **Q1.** What is meant by a "family of Enriques surfaces"? I was guessing a flat morphism $f:Y\longrightarrow T$ of smooth projective varieties such that each fibre is an Enriques surface, but maybe this is too general? **Q2.** In the article it says that the higher direct images $R^i f_\ast O_Y$ are zero ($i>0$). Is this an application of Grauert's theorem (III.12, Cor. 12.9, Hartshorne)? **Q3.** How to see easily that $R^0f_\ast O_Y = O_T$ ? I am guessing Grauert's theorem again.