Monomial ideals with arbitrarily high tiny powers in any number of variables

Abstract

Powers of (monomial) ideals is a subject that still calls attraction in various ways. Let I⊂ K[x1,…,xn] be a monomial ideal and let G(I) denote the (unique) minimal monomial generating set of I. How small can |G(Ii)| be in terms of |G(I)|? We expect that the inequality |G(I2)|>|G(I)| should hold and that |G(Ii)|, i 2, grows further whenever |G(I)| 2. In this paper we will disprove this expectation and show that for any n and d there is an m-primary monomial ideal I⊂ K[x1,…,xn] such that |G(I)|>|G(Ii)| for all i d.