The Waldschmidt constant of a standard -configuration in P2

Abstract

A -configuration of type (d1,…,ds) is a specific set of points in P2 that has a number of algebraic and geometric properties. For example, the graded Betti numbers and Hilbert functions of all -configurations in P2 are determined by the type (d1,…,ds). However the Waldschmidt constant of a -configuration in P2 of the same type may vary. In this paper, we find that the Waldschmidt constant of a -configuration in P2 of type (d1,…,ds) with d1 s 1 is s. We also find the Waldschmidt constant of a standard -configuration in P2 of type (a,b,c) with a 1 except the type (2,3,5). In particular, we prove that the Waldschmidt constant of a standard -configuration in P2 of type (1,b,c) with c 2b+2 does not depend on c.