On curves with high multiplicity on P(a,b,c) for (a,b,c)≤4

Abstract

On a weighted projective surface P(a,b,c) with (a,b,c)≤ 4, we compute lower bounds for the effective threshold of an ample divisor, in other words, the highest multiplicity a section of the divisor can have at a specified point. We expect that these bounds are close to being sharp. This translates into finding divisor classes on the blowup of P(a,b,c) that generate a cone contained in, and probably close to, the effective cone.