AbstractIn this paper the authors investigate the representation type of the blocks of the relative (parabolic) category OS for complex semisimple Lie algebras. A complete classification of the blocks corresponding to regular weights is given. The main results of the paper provide a classification of the blocks in the “mixed” case when the simple roots corresponding to the singular set and S do not meet
Let (g,k) be the pair of complexified Lie algebras corresponding to an irreducible Hermitian symmetr...
AbstractWe discuss the representation theory of Hf, which is a deformation of the symplectic oscilla...
In this work we study the highest weight representations of finite dimensional semisimple Lie algebra...
AbstractIn this paper the authors investigate the representation type of the blocks of the relative ...
AbstractIn this paper a complete classification of the representation type of the infinitesimal bloc...
Let g be a simple Lie algebra over the field C of complex numbers, with root system Φ relative to a ...
Let A be a finite dimensional algebra over a field k. We can place A into one of three classes, acco...
AbstractIn this paper a complete classification of the representation type of the infinitesimal bloc...
We generalize the category O of Bernstein, Gelfand and Gelfand to the so called fat category O, On a...
AbstractWe study a certain class of categories of Lie algebra modules which include the well-known c...
AbstractIn this paper we continue our study of complex representations of finite monoids. We begin b...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
AbstractWe show that each integral infinitesimal block of parabolic category O (including singular o...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
Let (g,k) be the pair of complexified Lie algebras corresponding to an irreducible Hermitian symmetr...
AbstractWe discuss the representation theory of Hf, which is a deformation of the symplectic oscilla...
In this work we study the highest weight representations of finite dimensional semisimple Lie algebra...
AbstractIn this paper the authors investigate the representation type of the blocks of the relative ...
AbstractIn this paper a complete classification of the representation type of the infinitesimal bloc...
Let g be a simple Lie algebra over the field C of complex numbers, with root system Φ relative to a ...
Let A be a finite dimensional algebra over a field k. We can place A into one of three classes, acco...
AbstractIn this paper a complete classification of the representation type of the infinitesimal bloc...
We generalize the category O of Bernstein, Gelfand and Gelfand to the so called fat category O, On a...
AbstractWe study a certain class of categories of Lie algebra modules which include the well-known c...
AbstractIn this paper we continue our study of complex representations of finite monoids. We begin b...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
AbstractWe show that each integral infinitesimal block of parabolic category O (including singular o...
We determine the Ringel duals for all blocks in the parabolic versions of the BGG category associate...
Let (g,k) be the pair of complexified Lie algebras corresponding to an irreducible Hermitian symmetr...
AbstractWe discuss the representation theory of Hf, which is a deformation of the symplectic oscilla...
In this work we study the highest weight representations of finite dimensional semisimple Lie algebra...
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