Almost Gorenstein rings
Abstract
The notion of almost Gorenstein ring given by Barucci and Fr\"oberg BF in the case where the local rings are analytically unramified is generalized, so that it works well also in the case where the rings are analytically ramified. As a sequel, the problem of when the endomorphism algebra : of is a Gorenstein ring is solved in full generality, where denotes the maximal ideal in a given Cohen-Macaulay local ring of dimension one. Characterizations of almost Gorenstein rings are given in connection with the principle of idealization. Examples are explored.
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