Linear weighted bounded negativity

Abstract

We propose a linear version of the weighted bounded negativity conjecture. It considers a smooth projective surface X over an algebraically closed field of characteristic zero and predicts the existence of a common lower bound on C2/(D· C) for all reduced and irreducible curves C and all big and nef divisors such that D· C>0, both on X. We prove that, in the complex case, there exists such a bound for all nef divisors spanning a ray out an open covering of the limit rays of negative curves. In the same vein, we provide explicit bounds when X is a rational surface. Our proofs involve the existence of a foliation F on X but most of our results are independent of F.