Hilbert-Kunz density function for graded domains

Abstract

We prove the existence of HK density function for a pair (R, I), where R is a N-graded domain of finite type over a perfect field and I⊂ R is a graded ideal of finite colength. This generalizes our earlier result where one proves the existence of such a function for a pair (R, I), where, in addition R is standard graded. As one of the consequences we show that if G is a finite group scheme acting linearly on a polynomial ring R of dimension d then the HK density function fRG, mG, of the pair (RG, mG), is a piecewise polynomial function of degree d-1. We also compute the HK density functions for (RG, mG), where G⊂ SL2(k) is a finite group acting linearly on the ring k[X, Y].