Properties of the resolution of almost Gorenstein algebras

Abstract

We study properties of the resolution of almost Gorenstein artinian algebras R/I, i.e. algebras defined by ideals I such that I=J+(f), with J Gorenstein ideal and f∈ R. Such algebras generalize the well known almost complete intersection artinian algebras. Then we give a new explicit description of the resolution and of the graded Betti numbers of almost complete intersection ideals of codimension 3 and we characterize the ideals whose graded Betti numbers can be achieved using artinian monomial ideals.