Demailly's conjecture on Waldschmidt constants for sufficiently many very general points in Pn

Abstract

Let Z be a finite set of s points in the projective space Pn over an algebraically closed field F. For each positive integer m, let α(mZ) denote the smallest degree of nonzero homogeneous polynomials in F[x0,…,xn] that vanish to order at least m at every point of Z. The Waldschmidt constant α(Z) of Z is defined by the limit \[ α(Z)=m ∞α(mZ)m. \] Demailly conjectured that \[ α(Z)≥α(mZ)+n-1m+n-1. \] Recently, Malara, Szemberg, and Szpond established Demailly's conjecture when Z is very general and \[ [n]s-2≥ m-1. \] Here we improve their result and show that Demailly's conjecture holds if Z is very general and \[ [n]s-2 2n-1(m-1), \] where 0 <1 is the fractional part of [n]s. In particular, for s very general points where [n]s∈N (namely =0), Demailly's conjecture holds for all m∈N. We also show that Demailly's conjecture holds if Z is very general and \[ s\n+7,2n\, \] assuming the Nagata-Iarrobino conjecture α(Z)[n]s.