Number of singular points of a genus g curve with one point at infinity

Abstract

We bound the maximal number N of singular points of a plane algebraic curve C that has precisely one place at infinity with one branch in terms of its first Betti number b1(C). Asymptotically we prove that N<17/11b1(C) for large b1. In particular, in the case of curves with one place at infinity, we confirm the Zaidenberg and Lin conjecture stating that N 2b1+1.