Add to ORKGAbstract. We prove an explicit formula for the invariant µ(g) for finite-dimensional semisim-ple, and reductive Lie algebras g over C. Here µ(g) is the minimal dimension of a faithful linear representation of g. The result can be used to study Dynkin’s classification of maximal reductive subalgebras of semisimple Lie algebras. 1
Abstract. Let g be a reductive, complex Lie algebra, with adjoint group G, let G act on the ring of ...
It is known that a finite-dimensional reductive Lie algebra has a non-degenerate symmetric invariant...
The object of this paper is to classify (up to inner automorphism) the primitive, maximal rank, redu...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
AbstractThis paper deals with representations of Lie algebras of reductive groups in prime charateri...
In this paper we study the complete reducibility of representations of infinite- dimensional Lie al...
In this paper we study the minimal dimension µ(g) of a faithful g –module for n –dimensional Lie alg...
AbstractIn this paper we study the complete reducibility of representations of infinite-dimensional ...
Given a Lie algebra , let μ(g) and μnil(g) be the minimal dimension of a faithful representation and...
AbstractWe discuss a method to construct reductive Lie-admissible algebras which is based on the con...
Abstract. Let g be a reductive, complex Lie algebra, with adjoint group G, let G act on the ring of ...
It is known that a finite-dimensional reductive Lie algebra has a non-degenerate symmetric invariant...
The object of this paper is to classify (up to inner automorphism) the primitive, maximal rank, redu...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
We show that a linear subspace of a reductive Lie algebra $\operatorname{\mathfrak g}$ that consists...
AbstractThis paper deals with representations of Lie algebras of reductive groups in prime charateri...
In this paper we study the complete reducibility of representations of infinite- dimensional Lie al...
In this paper we study the minimal dimension µ(g) of a faithful g –module for n –dimensional Lie alg...
AbstractIn this paper we study the complete reducibility of representations of infinite-dimensional ...
Given a Lie algebra , let μ(g) and μnil(g) be the minimal dimension of a faithful representation and...
AbstractWe discuss a method to construct reductive Lie-admissible algebras which is based on the con...
Abstract. Let g be a reductive, complex Lie algebra, with adjoint group G, let G act on the ring of ...
It is known that a finite-dimensional reductive Lie algebra has a non-degenerate symmetric invariant...
The object of this paper is to classify (up to inner automorphism) the primitive, maximal rank, redu...