Finite-difference representations of the degenerate affine Hecke algebra

We construct a family of exact functors from the Bernstein ᎐Gelfand᎐Gelfand category O O of ᒐ ᒉ -modules to the category of finite-dimensional representations of n the degenerate affine Hecke algebra H of GL . These functors transform Verma l l modules to standard modules or zero, and simple modules

In our recent papers the centralizer construction was applied to the series of Ž . classical Lie algebras to produce the quantum algebras called twisted Yangians. Ž . Here we extend this construction to the series of the symmetric groups S n . We Ž . study the ''stable'' properties of the centraliz

Minimal degenerations of modules over all but one exceptional class of representation-finite selfinjective algebras are given by extensions [G. Zwara, Colloq. Math. 75 (1998) 91]. This means in terms of the complexity of degenerations, that these minimal degenerations have complexity one. The minima

We consider the "anti-dominant" variants Θ - λ of the elements Θ λ occurring in the Bernstein presentation of an affine Hecke algebra H. We find explicit formulae for Θ - λ in terms of the Iwahori-Matsumoto generators T w (w ranging over the extended affine Weyl group of the root system R), in the c