Semisimplicity of Exterior Powers of Semisimple Representations of Groups

We prove that if \(T\) is a strongly based continuous bounded representation of a locally compact abelian group \(G\) on a Banach Space \(X\), and if the spectrum of \(T\) is countable, then the Banach algebra generated by \(f(T)=\int_{G} f(g) T(g) d g\), \(f \in L^{1}(G)\), is semisimple. 1994 Acad

Let G be an abelian p-group, let K be a field of characteristic different from p, and let KG be the group algebra of G over K. In this paper we give a description Ž . Ž. of the unit group U KG of KG when i K is a field of the first kind with respect 1 Ž . to p and the first Ulm factor GrG is a direc

The semisimplicity of Iwahori᎐Hecke algebras has been studied by several Ž . authors. A. Gyoja J. Algebra 174, 1995, 553᎐572 gave a necessary and sufficient condition for Iwahori᎐Hecke algebras to be semisimple, using the modular repre-Ž . sentation theory. The author J. Algebra 183, 1996, 514᎐544 s

For a finite dimensional semisimple cosemisimple Hopf algebra A and its dual Hopf algebra B, we set up a natural one-to-one correspondence between categories with actions of the monoidal categories of representations of A and of B. This gives a categorical interpretation of the duality for actions o

This paper makes a contribution to the problem of classifying finitedimensional semisimple Hopf algebras H over an algebraically closed field k of characteristic 0. Specifically, we show that if H has dimension pq for primes p and q, then H is trivial; that is, H is either a group algebra or the dua