We introduce a new class of noncommutative rings -Galois orders, realized as certain subrings of invariants in skew semigroup rings, and develop their structure theory. The class of Galois orders generalizes classical orders in noncommutative rings and contains many important examples, such as the Generalized Weyl algebras, the universal enveloping algebra of the general linear Lie algebra, associated Yangians and finite W -algebras.
We solve a long standing problem of the classification of all simple modules with finite-dimensional weight spaces over Lie algebra of vector fields on
We address the problem of classifying of irreducible Gelfand-Tsetlin modules for gl(m|n) and show that it reduces to the classification of Gelfand-Tsetlin modules for the even part. We also give an explicit tableaux construction and the irreducibility criterion for the class of quasi typical and quasi covariant Gelfand-Tsetlin modules which includes all essentially typical and covariant tensor finite dimensional modules. In the quasi typical case new irreducible representations are infinite dimensional gl(m|n)-modules which are isomorphic to the parabolically induced (Kac) modules.
Preliminaries2.1. Weight modules. A Z 2 -graded vector space g = g0 ⊕ g1 with even bracket [•, •] : g ⊗ g → g is a Lie superalgebra iff the following conditions hold [a, b] = −(−1) p(a)p(b) [b, a]; Berkeley
We study a class of irreducible modules for Affine Lie algebras which possess weight spaces of both finite and infinite dimensions. These modules appear as the quotients of "imaginary Verma modules" induced from the "imaginary Borel subalgebra".
Abstract. We solve the problem of extension of characters of commutative subalgebras in associative (noncommutative) algebras for a class of subrings (Galois orders) in skew group rings. These results can be viewed as a noncommutative analogue of liftings of prime ideals in the case of integral extensions of commutative rings. The proposed approach can be applied to the representation theory of many infinite dimensional algebras including universal enveloping algebras of reductive Lie algebras, Yangians and finite W -algebras. In particular, we develop a theory of Gelfand-Tsetlin modules for gl n . Besides classification results we characterize their categories in the generic case extending the classical results on gl 2 .
V.I. Arnold [Russian Math. Surveys 26 (2) (1971) 29-43] constructed a
miniversal deformation of matrices under similarity; that is, a simple normal
form to which not only a given square matrix A but all matrices B close to it
can be reduced by similarity transformations that smoothly depend on the
entries of B. We construct a miniversal deformation of matrices under
congruence.Comment: 39 pages. The first version of this paper was published as Preprint
RT-MAT 2007-04, Universidade de Sao Paulo, 2007, 34 p. The work was done
while the second author was visiting the University of Sao Paulo supported by
the Fapesp grants (05/59407-6 and 2010/07278-6). arXiv admin note:
substantial text overlap with arXiv:1105.216
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