Footprint and minimum distance functions

Abstract

Let S be a polynomial ring over a field K, with a monomial order , and let I be an unmixed graded ideal of S. In this paper we study two functions associated to I: the minimum distance function δI and the footprint function fpI. It is shown that δI is positive and that fpI is positive if the initial ideal of I is unmixed. Then we show that if I is radical and its associated primes are generated by linear forms, then δI is strictly decreasing until it reaches the asymptotic value 1. If I is the edge ideal of a Cohen--Macaulay bipartite graph, we show that δI(d)=1 for d greater than or equal to the regularity of S/I. For a graded ideal of dimension ≥ 1, whose initial ideal is a complete intersection, we give an exact sharp lower bound for the corresponding minimum distance function.