Some characterizations of dualizing complexes in terms of GC-dimension

Abstract

Let (R,) be a local ring and C be a homologically bounded and finitely generated R-complex. Then, we prove that C is a dualizing complex of R if and only if C is a Cohen-Macaulay semidualizing complex of type one or μR∈f C+R(C) (,R)=β∈f CR(C). Also, we show that a semidualizing complex C is dualizing if and only if there exists a type one Cohen-Macaulay R-module of finite GC-dimension or there exists a type one Cohen-Macaulay R-complex of finite GC-dimension such that R(X)=R(C)-C(X). Furthermore, for a semidualizing R-complex C, we prove that C R if and only if there exists a type one Cohen-Macaulay R-module M which belongs to the Auslander class AC(R).