Cuspidal curves, minimal models and Zaidenberg's finiteness conjecture

Abstract

Let E⊂eq P2 be a complex rational cuspidal curve and let (X,D) (P2,E) be the minimal log resolution of singularities. We prove that E has at most six cusps and we establish an effective version of the Zaidenberg Finiteness Conjecture (1994) concerning Eisenbud-Neumann diagrams of E. This is done by analysing the Minimal Model Program run for the pair (X,12D). Namely, we show that P2 E is C**-fibred or for the log resolution of the minimal model the Picard rank, the number of boundary components and their self-intersections are bounded.