Calculations of Some Groups of Hopf Algebra Extensions

The aim of this paper is to study Hopf algebra extensions arising from semi-direct products of groups in terms of group cohomology. This enables us to compute and describe explicitly some groups of Hopf algebra extensions.

We bring together ideas in analysis on Hopf f-algebra actions on II 1 subfactors of finite Jones index [9,24] and algebraic characterizations of Frobenius, Galois and cleft Hopf extensions [3,13,14] to prove a non-commutative algebraic analogue of the classical theorem: a finite degree field extensi

We construct spectral sequences which provide a way to compute the cohomology theory that classifies extensions of graded connected Hopf algebras over a Ž . commutative ring as described by William M. Singer. Specifically, for A, B an abelian matched pair of graded connected R-Hopf algebras, we cons

The purpose of this paper is to give a ''universal'' construction of Hopf algebras over any commutative ring. The mod-p Steenrod algebras are all examples of this construction; other examples of Hopf algebras related to the mod-p Steenrod algebras are also produced. Then we give an argument to produ