DOIAbstract
AbstractAs the main result of this paper it is proved that each nondiscrete linear variety is polynomially equivalent to a variety of vector spaces
AbstractAs the main result of this paper it is proved that each nondiscrete linear variety is polynomially equivalent to a variety of vector spaces
We study the linearization of line bundles and the local properties of actions of connected linear a...
We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an ...
We study the linearization of line bundles and the local properties of actions of connected linear a...
AbstractAs the main result of this paper it is proved that each nondiscrete linear variety is polyno...
A variety V is almost nilpotent if it is not nilpotent but all proper subvarieties are nilpotent. He...
A variety V is almost nilpotent if it is not nilpotent but all proper subvarieties are nilpotent. He...
Best possible Helly-type results are obtained for varieties whose defining polynomials belong to a f...
Abstract. We consider a family of varieties, where each variety is a pair consisting of a hyperplan...
Abstract. We consider a family of varieties, where each variety is a pair consisting of a hyperplan...
Consider linear associative algebras over the complex field. Definition 1 A variety of algebras is a...
The problem of determining all varieties W (categorically) equivalent to a given variety V, which Is...
We pose and solve the equivalence problem for subspaces of P_n, the (n+1) dimensional vector space o...
We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an ...
Consider linear associative algebras over the complex field. Definition 1 A variety of algebras is a...
It is well known that the Cayley-Hamilton theorem is an interesting and important theorem in linear ...
We study the linearization of line bundles and the local properties of actions of connected linear a...
We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an ...
We study the linearization of line bundles and the local properties of actions of connected linear a...
AbstractAs the main result of this paper it is proved that each nondiscrete linear variety is polyno...
A variety V is almost nilpotent if it is not nilpotent but all proper subvarieties are nilpotent. He...
A variety V is almost nilpotent if it is not nilpotent but all proper subvarieties are nilpotent. He...
Best possible Helly-type results are obtained for varieties whose defining polynomials belong to a f...
Abstract. We consider a family of varieties, where each variety is a pair consisting of a hyperplan...
Abstract. We consider a family of varieties, where each variety is a pair consisting of a hyperplan...
Consider linear associative algebras over the complex field. Definition 1 A variety of algebras is a...
The problem of determining all varieties W (categorically) equivalent to a given variety V, which Is...
We pose and solve the equivalence problem for subspaces of P_n, the (n+1) dimensional vector space o...
We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an ...
Consider linear associative algebras over the complex field. Definition 1 A variety of algebras is a...
It is well known that the Cayley-Hamilton theorem is an interesting and important theorem in linear ...
We study the linearization of line bundles and the local properties of actions of connected linear a...
We define a GL-variety to be an (typically infinite dimensional) algebraic variety equipped with an ...
We study the linearization of line bundles and the local properties of actions of connected linear a...
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