Regularity functions of powers of graded ideals

Abstract

This paper studies the problem of which sequences of non-negative integers arise as the functions reg In-1/In, reg R/In, reg In for an ideal I generated by forms of degree d in a standard graded algebra R. These functions are asymptotically linear with slope d. If R/I = 0, we give a complete characterization of all numerical functions which arise as the functions reg In-1/In, reg R/In and show that reg In can be any numerical function f(n) dn that weakly decreases until it becomes a linear function with slope d. The latter result gives a negative answer to a question of Eisenbud and Ulrich. If R/I 1, we show that reg In-1/In can be any numerical asymptotically linear function f(n) dn-1 with slope d and reg R/In can be any numerical asymptotically linear function f(n) dn-1 with slope d that is weakly increasing. Inspired of a recent work of Ein, Ha and Lazarsfeld on non-singular complex projective schemes, we also prove that the function of the saturation degree of In is asymptotically linear for an arbitrary graded ideal I and study the behavior of this function.