On (i)-Curves in Blowups of Pr

Abstract

In this paper we study (i)-curves with i∈ \-1, 0, 1\ in the blown up projective space Pr in general points. The notion of (-1)-curves was analyzed in the early days of mirror symmetry by Kontsevich with the motivation of counting curves on a Calabi-Yau threefold. In dimension two, Nagata studied planar (-1)-curves in order to construct counterexample to Hilbert's 14th problem. We introduce the notion of classes of (0)- and (1)-curves in Pr with s points blown up and we prove that their number is finite if and only if the space is a Mori Dream Space. We further introduce a bilinear form on a space of curves, and a unique symmetric Weyl-invariant class, F, (that we will refer to as the anticanonical curve class). For Mori Dream Spaces we prove that (-1)-curves can be defined arithmetically by the linear and quadratic invariants determined by the bilinear form. Moreover, (0)- and (1)-Weyl lines give the extremal rays for the cone of movable curves in Pr with r+3 points blown up. As an application, we use the technique of movable curves to reprove that if F2≤ 0 then Y is not a Mori Dream Space and we propose to apply this technique to other spaces.