When are the Rees algebras of parameter ideals almost Gorenstein graded rings?
Abstract
Let A be a Cohen-Macaulay local ring with dim A = d 3, possessing the canonical module KA. Let a1, a2, …, ar (3 r d) be a subsystem of parameters of A and set Q= (a1, a2, …, ar). It is shown that if the Rees algebra R(Q) of Q is an almost Gorenstein graded ring, then A is a regular local ring and a1, a2, …, ar is a part of a regular system of parameters of A.
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