Boundedness Results for Planar Linear Systems Assuming The Segre-Harbourne-Gimigliano-Hirschowitz Conjecture

Abstract

Let Xn be the projective plane blown up at n ≥ 10 general points. In this paper we give several consequences of the Segre-Harbourne-Gimigliano-Hirschowitz Conjecture, that pertain to complete linear systems on Xn. We begin by classifying such systems |C| with general irreducible member of genus g ≥ 2 (up to Cremona equivalence), in terms of invariants of the adjoint systems |C+mK|. We then use this to prove that, for fixed n ≥ 10 and g≥ 2, up to the action of the Cremona group, there exist finitely many complete linear systems on Xn whose general member is irreducible of genus g. Further, there is a function g n(g) such that every such (effective) system is Cremona equivalent to a system in Xn(g). The latter result is based on the explicit computation of the minimum possible self-intersection of an irreducible linear system with given n and (|C|). We classify those systems which achieve the minimal self-intersection. We also classify the systems with C2 ≤ 5, whether or not they have minimal C2 for the given n and dimension. We finish by proving several statements concerning systems that are base-point-free, and systems that give birational maps to their image.