AbstractWe present a purely algebraic proof of the commutativity of the operation defined by intersection with divisors on the Chow group of a Noetherian ring
This thesis consists of results that involve several topics in commutative algebra and algebraic geo...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
The aim of my thesis is to give an introduction to equivariant intersection theory, as developed by ...
AbstractWe present a purely algebraic proof of the commutativity of the operation defined by interse...
Abstract. We present a purely algebraic proof of the commutativity of the operation defined by inter...
We consider the operation of intersecting with a locally principal Cartier divisor (i.e., a Cartier ...
This thesis will be an introduction to commutative ring theory, with an end goal of introducing comp...
AbstractA definition of a Cohen-Macaulay complex is given so that the existence of such a complex im...
We investigate the cohomology of modules over commutative complete intersection rings. The first mai...
Let R be a commutative noetherian ring. A well-known theorem in commutative algebra states that R is...
AbstractLet A be a commutative Noetherian ring of Krull dimension n. Let I be a local complete inter...
summary:Let $R$ be a commutative ring with identity. If a ring $R$ is contained in an arbitrary unio...
This paper presents the theory of Noetherian filtrations, an important concept in commutative algebr...
AbstractIn 1987 Roberts completed the proof of the New Intersection Theorem (NIT) by settling the mi...
AbstractWe introduce a concept of Cohen–Macaulayness for left noetherian semilocal rings (and their ...
This thesis consists of results that involve several topics in commutative algebra and algebraic geo...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
The aim of my thesis is to give an introduction to equivariant intersection theory, as developed by ...
AbstractWe present a purely algebraic proof of the commutativity of the operation defined by interse...
Abstract. We present a purely algebraic proof of the commutativity of the operation defined by inter...
We consider the operation of intersecting with a locally principal Cartier divisor (i.e., a Cartier ...
This thesis will be an introduction to commutative ring theory, with an end goal of introducing comp...
AbstractA definition of a Cohen-Macaulay complex is given so that the existence of such a complex im...
We investigate the cohomology of modules over commutative complete intersection rings. The first mai...
Let R be a commutative noetherian ring. A well-known theorem in commutative algebra states that R is...
AbstractLet A be a commutative Noetherian ring of Krull dimension n. Let I be a local complete inter...
summary:Let $R$ be a commutative ring with identity. If a ring $R$ is contained in an arbitrary unio...
This paper presents the theory of Noetherian filtrations, an important concept in commutative algebr...
AbstractIn 1987 Roberts completed the proof of the New Intersection Theorem (NIT) by settling the mi...
AbstractWe introduce a concept of Cohen–Macaulayness for left noetherian semilocal rings (and their ...
This thesis consists of results that involve several topics in commutative algebra and algebraic geo...
AbstractThe new intersection theorem is used to derive a criteria for flat descent in the setting of...
The aim of my thesis is to give an introduction to equivariant intersection theory, as developed by ...
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