Strong persistence index and fluctuations in colon powers of monomial ideals

Abstract

Let I be an ideal in a commutative Noetherian ring R. We say that a positive integer 0 is the strong persistence index of I if 0 is the smallest integer such that (I+1 :R I) = I for all ≥ 0. The first aim of this paper is to study this notion for monomial ideals. We also introduce the notion of fluctuation in colon powers if there exist positive integers a < b < c such that at least one of the following cases occurs: (i) (Ia : I) = Ia-1, (Ib : I) ≠ Ib-1, but (Ic : I) = Ic-1. (ii) (Ia : I) ≠ Ia-1, (Ib : I) = Ib-1, but (Ic : I) ≠ Ic-1. The second purpose of this work is to study this phenomenon for monomial ideals.