On the almost Gorenstein property in Rees algebras of contracted ideals

Abstract

The question of when the Rees algebra R (I)= n 0In of I is an almost Gorenstein graded ring is explored, where R is a two-dimensional regular local ring and I a contracted ideal of R. It is known that R (I) is an almost Gorenstein graded ring for every integrally closed ideal I of R. The main results of the present paper show that if I is a contracted ideal with o(I) 2, then R (I) is an almost Gorenstein graded ring, while if o(I) 3, then R (I) is not necessarily an almost Gorenstein graded ring, even though I is a contracted stable ideal. Thus both affirmative answers and negative answers are given.