Quasi-socle ideals in local rings with Gorenstein tangent cones

Abstract

Quasi-socle ideals, that is the ideals I of the form I= Q : mq in a Noetherian local ring (A, m) with the Gorenstein tangent cone G(m) = n ≥ 0mn/mn+1 are explored, where q ≥ 1 is an integer and Q is a parameter ideal of A generated by monomials of a system x1, x2, ..., xd of elements in A such that (x1, x2, ..., xd) is a reduction of m. The questions of when I is integral over Q and of when the graded rings G(I) = n ≥ 0In/In+1 and F(I) = n 0In/m In are Cohen-Macaulay are answered. Criteria for G (I) and R (I) = n ≥ 0In to be Gorenstein rings are given.