Towards Hilbert-Kunz density functions in Characteristic 0

Abstract

For a pair (R, I), where R is a standard graded domain of dimension d over an algebraically closed field of characteristic 0 and I is a graded ideal of finite colength, we prove that the existence of p ∞eHK(Rp, Ip) is equivalent, for any fixed m≥ d-1, to the existence of p ∞(Rp/Ip[pm])/pmd. This we get as a consequence of Theorem 1.1: As p→ ∞ , the convergence of the HK density function f(Rp, Ip) is equivalent to the convergence of the truncated HK density functions fm(Rp, Ip) (in L∞ norm) of the mod p reductions (Rp, Ip), for any fixed m≥ d-1. In particular, to define the HK density function f∞(R, I) in characteristic 0, it is enough to prove the existence of p ∞ fm(Rp, Ip), for any fixed m≥ d-1. This allows us to prove the existence of eHK∞(R, I) in many new cases, e.g., when Proj~R is a Segre product of curves, for example.