Oana Veliche scite author profile

Oana Veliche

5Publications

150Citation Statements Received

88Citation Statements Given

How they've been cited

199

149

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Affiliations

Boston University, Northeastern University, University of Utah

Publications

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Gorenstein projective dimension for complexes

Veliche

2005

Trans. Amer. Math. Soc.

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Abstract. We define and study a notion of Gorenstein projective dimension for complexes of left modules over associative rings. For complexes of finite Gorenstein projective dimension we define and study a Tate cohomology theory. Tate cohomology groups have a natural transformation to classical Ext groups. In the case of module arguments, we show that these maps fit into a long exact sequence, where every third term is a relative cohomology group defined for left modules of finite Gorenstein projective dimension.

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Stable cohomology over local rings

Avramov

Veliche

2007

Advances in Mathematics

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For a commutative noetherian ring R with residue field k stable cohomology modules Ext n R (k, k) have been defined for each n ∈ Z, but their meaning has remained elusive. It is proved that the k-rank of any Ext n R (k, k) characterizes important properties of R, such as being regular, complete intersection, or Gorenstein. These numerical characterizations are based on results concerning the structure of Z-graded k-algebra carried by stable cohomology. It is shown that in many cases it is determined by absolute cohomology through a canonical homomorphism of algebras Ext R (k, k) → Ext R (k, k). Some techniques developed in the paper are applicable to the study of stable cohomology functors over general associative rings.

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Growth in the minimal injective resolution of a local ring

Christensen

Striuli

Veliche

2009

Journal of the London Mathematical Society

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Abstract. Let R be a commutative noetherian local ring with residue field k and assume that it is not Gorenstein. In the minimal injective resolution of R, the injective envelope E of the residue field appears as a summand in every degree starting from the depth of R. The number of copies of E in degree i equals the k-vector space dimension of the cohomology module Ext i R (k, R). These dimensions, known as Bass numbers, form an infinite sequence of invariants of R about which little is known. We prove that it is non-decreasing and grows exponentially if R is Golod, a non-trivial fiber product, or Teter, or if it has radical cube zero.

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Construction of Modules with Finite Homological Dimensions

Veliche¹

2002

Journal of Algebra

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Acyclicity over local rings with radical cube zero

Christensen¹,

Veliche²

2007

Illinois J. Math.

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Oana Veliche

Gorenstein projective dimension for complexes

Stable cohomology over local rings

Growth in the minimal injective resolution of a local ring

Construction of Modules with Finite Homological Dimensions

Acyclicity over local rings with radical cube zero

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