Ordinary commutative algebraic geometry is based on commutative polynomial algebras over an algebraically closed field k. Here we make a natural generalization to matrix polynomial k-algebras which are non-commutative coordinate rings of non-commutative varieties
The main aim of this project is to learn a branch of Mathematics that studies commutative rings with...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractSemiprime, noetherian, connected graded k-algebras R of quadratic growth are described in te...
The theory of algebraic varieties gives an algebraic interpretation of differential geometry, thus o...
This paper surveys results related to well-known works of B. Plotkin and V. Remeslennikov on the edg...
AbstractLet K be a commutative field and f:K → K a polynomial map. We show that, if the degree of f ...
AbstractLetK(X) be the quotient field of the polynomial ringK[X] over an algebraically closed fieldK...
These notes collect the basic results in commutative algebra used in the rest of my notes and books...
Topics include: Rings, ideals, algebraic sets and affine varieties, modules, localizations, tensor p...
AbstractThe Rees algebra of an ideal in a commutative ring is the quotient of a polynomial ring by i...
We use techniques from both real and complex algebraic geometry to study K-theoretic and related inv...
This book presents four lectures on recent research in commutative algebra and its applications to a...
This thesis presents the theory of affine algebraic sets defined over an arbitrary field K. We defin...
This thesis presents the theory of affine algebraic sets defined over an arbitrary field K. We defin...
Se estudian los anillos Noetherianos, variedades algebraicas afines y resultados importantes de ellos...
The main aim of this project is to learn a branch of Mathematics that studies commutative rings with...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractSemiprime, noetherian, connected graded k-algebras R of quadratic growth are described in te...
The theory of algebraic varieties gives an algebraic interpretation of differential geometry, thus o...
This paper surveys results related to well-known works of B. Plotkin and V. Remeslennikov on the edg...
AbstractLet K be a commutative field and f:K → K a polynomial map. We show that, if the degree of f ...
AbstractLetK(X) be the quotient field of the polynomial ringK[X] over an algebraically closed fieldK...
These notes collect the basic results in commutative algebra used in the rest of my notes and books...
Topics include: Rings, ideals, algebraic sets and affine varieties, modules, localizations, tensor p...
AbstractThe Rees algebra of an ideal in a commutative ring is the quotient of a polynomial ring by i...
We use techniques from both real and complex algebraic geometry to study K-theoretic and related inv...
This book presents four lectures on recent research in commutative algebra and its applications to a...
This thesis presents the theory of affine algebraic sets defined over an arbitrary field K. We defin...
This thesis presents the theory of affine algebraic sets defined over an arbitrary field K. We defin...
Se estudian los anillos Noetherianos, variedades algebraicas afines y resultados importantes de ellos...
The main aim of this project is to learn a branch of Mathematics that studies commutative rings with...
Duality is one of the fundamental concepts in mathematics. The most basic duality is that of linear ...
AbstractSemiprime, noetherian, connected graded k-algebras R of quadratic growth are described in te...
DOI
Add to ORKG