On the Semisimplicity of the Brauer Centralizer Algebras

We show that if A is a semisimple Hopf algebra of dimension pq 2 over an algebraically closed field k of characteristic zero, then under certain restrictions either A or A \* must have a non-trivial central group-like element. We then classify all semisimple Hopf algebras of dimension pq 2 over k wh

Let G be either Sp V or O V . Using an action of the Brauer algebra, we k Ž mm . mm describe the subspace T V :V of tensors of valence k as an induced representation of the symmetric group S . As an application, we recover a special m case of Littlewood's restriction rule, affording the decompositio

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

The surjectivity of the exponential function of complex algebraic, in particular of complex semisimple Lie groups, and of complex splittable Lie groups is equivalent to the connectedness of the centralizers of the nilpotent elements in the Lie algebra. This implies that the only complex semisimple L