AbstractFor a graded algebra A, its jdeg(A) is a global degree that can be used to study issues of complexity of the normalization Ā. Here some techniques grounded on Rees algebra theory are used to estimate jdeg(A). A closely related notion, of divisorial generation, is introduced to count numbers of generators of Ā
We introduce perfect resolving algebras and study their fundamental properties. These algebras are b...
We consider ideals of minors of a matrix, ideals of minors of a symmetric matrix, and ideals of Pfaf...
In this dissertation, we initially present an overview about the symmetric and the Rees algebras in...
AbstractFor a graded algebra A, its jdeg(A) is a global degree that can be used to study issues of c...
AbstractWe introduce techniques to derive estimates for the degrees of the generators of the integra...
The primary topic of this thesis lies at the crossroads of Commutative Algebra and its interactions ...
We provide a framework connecting several well-known theories related to the linearity of graded mod...
AbstractAccess to the defining equations of blowup algebras is a natural pathway to the study of the...
AbstractGiven a bigradedk-algebraS = ⊕(u,ν) S(u,ν), (u,ν) εℕ×ℕ, (k a field), one attaches to it the ...
This book discusses recent developments in an important area of computational commutative algebra
Abstract. We develop a new combinatorial method to deal with de-gree estimate for two-generated suba...
2. Functional algebras: graded algebra, Proj of a finite generated graded algebra, FGA conjecture. E...
AbstractIn this paper, we investigate multiplicative properties of the classical Dold–Kan correspond...
Abstract. In this paper, we investigate multiplicative properties of the classical Dold-Kan correspo...
This dissertation deals with questions concerning ideals and modules over graded or local noetherian...
We introduce perfect resolving algebras and study their fundamental properties. These algebras are b...
We consider ideals of minors of a matrix, ideals of minors of a symmetric matrix, and ideals of Pfaf...
In this dissertation, we initially present an overview about the symmetric and the Rees algebras in...
AbstractFor a graded algebra A, its jdeg(A) is a global degree that can be used to study issues of c...
AbstractWe introduce techniques to derive estimates for the degrees of the generators of the integra...
The primary topic of this thesis lies at the crossroads of Commutative Algebra and its interactions ...
We provide a framework connecting several well-known theories related to the linearity of graded mod...
AbstractAccess to the defining equations of blowup algebras is a natural pathway to the study of the...
AbstractGiven a bigradedk-algebraS = ⊕(u,ν) S(u,ν), (u,ν) εℕ×ℕ, (k a field), one attaches to it the ...
This book discusses recent developments in an important area of computational commutative algebra
Abstract. We develop a new combinatorial method to deal with de-gree estimate for two-generated suba...
2. Functional algebras: graded algebra, Proj of a finite generated graded algebra, FGA conjecture. E...
AbstractIn this paper, we investigate multiplicative properties of the classical Dold–Kan correspond...
Abstract. In this paper, we investigate multiplicative properties of the classical Dold-Kan correspo...
This dissertation deals with questions concerning ideals and modules over graded or local noetherian...
We introduce perfect resolving algebras and study their fundamental properties. These algebras are b...
We consider ideals of minors of a matrix, ideals of minors of a symmetric matrix, and ideals of Pfaf...
In this dissertation, we initially present an overview about the symmetric and the Rees algebras in...
DOI
Add to ORKG