Birational geometry of blow-ups of projective spaces along points and lines

Abstract

Consider the blow-up X of P3 at 6 points in very general position and the 15 lines through the 6 points. We construct an infinite-order pseudo-automorphism φX on X, induced by the complete linear system of a divisor of degree 13. The effective cone of X has infinitely many extremal rays and hence, X is not a Mori Dream Space. The threefold X has a unique anticanonical section which is a Jacobian K3 Kummer surface S of Picard number 17. The restriction of φX on S realizes one of Keum's 192 infinite-order automorphisms of Jacobian K3 Kummer surfaces. In general, we show the blow-up of Pn (n≥ 3) at (n+3) very general points and certain 9 lines through them is not Mori Dream, with infinitely many extremal effective divisors. As an application, for n≥ 7, the blow-up of M0,n at a very general point has infinitely many extremal effective divisors.