Quotients of del Pezzo surfaces

Abstract

Let be any field of characteristic zero, X be a del Pezzo surface and G be a finite subgroup in Aut(X). In this paper we study when the quotient surface X / G can be non-rational over . Obviously, if there are no smooth -points on X / G then it is not -rational. Therefore under assumption that the set of smooth -points on X / G is not empty we show that there are few possibilities for non--rational quotients. The quotients of del Pezzo surfaces of degree 2 and greater are considered in the author's previous papers. In this paper we study the quotients of del Pezzo surfaces of degree 1. We show that they can be non--rational only for the trivial group or cyclic groups of order 2, 3 and 6. For the trivial group and the group of order 2 we show that both X and X / G are not -rational if the G-invariant Picard number of X is 1. For the groups of order 3 and 6 we construct examples of both -rational and non--rational quotients of both -rational and non--rational del Pezzo surfaces of degree 1 such that the G-invariant Picard number of X is 1. As a result of complete classification of non--rational quotients of del Pezzo surfaces we classify surfaces that are birationally equivalent to quotients of -rational surfaces, and obtain some corollaries concerning fields of invariants of (x , y).