Maximal generating degrees of powers of homogeneous ideals

Abstract

The degree excess function ε(I;n) is the difference between the maximal generating degree d(In) of a homogeneous ideal I of a polynomial ring and p(I)n, where p(I) is the leading coefficient of the asymptotically linear function d(In). It is shown that any non-increasing numerical function can be realized as a degree excess function, and there is a monomial ideal I whose ε(I;n) has exactly a given number of local maxima. In the case of monomial ideals, an upper bound on ε(I;n) is provided. As an application it is shown that in the worst case, the so-called stability index of the Castelnuovo-Mumford regularity of a monomial ideal I must be at least an exponential function of the number of variables.