Weak del Pezzo surfaces with global vector fields

Abstract

We classify smooth weak del Pezzo surfaces with global vector fields over an arbitrary algebraically closed field k of arbitrary characteristic p ≥ 0. We give a complete description of the configuration of (-1)- and (-2)-curves on these surfaces and calculate the identity component of their automorphism schemes. It turns out that there are 53 distinct families of such surfaces if p ≠ 2,3, while there are 61 such families if p = 3, and 75 such families if p = 2. Each of these families has at most one moduli. As a byproduct of our classification, it follows that weak del Pezzo surfaces with non-reduced automorphism scheme exist over k if and only if p ∈ \2,3\.