Constructing the Preprojective Components of an Algebra

We present an algorithm to determine the essential singular components of an algebraic differential equation. Geometrically, this corresponds to determining the singular solutions that have enveloping properties. The algorithm is practical and efficient because it is factorization free, unlike the p

We give two constructions for each fundamental representation of sp 2 n, ‫ރ‬ . We also present quantum versions of these constructions. These are explicit in the sense of the Gelfand᎐Tsetlin constructions of the irreducible representations of Ž . Ž . gl n, ‫ރ‬ : we explicitly specify the matrix elem

We present an explicit description of the ᒅ-support supp M of any irreducible ᒅ-locally finite ᒄ-module M, where ᒄ is any finite-dimensional Lie algebra and ᒅ is an arbitrary nilpotent Lie subalgebra of ᒄ. If ᒅ contains a Cartan subalgebra of the semi-simple part of ᒄ, we reformulate the description