The finite dual of commutative-by-finite Hopf algebras

Abstract

The finite dual H of an affine commutative-by-finite Hopf algebra H is studied. Such a Hopf algebra H is an extension of an affine commutative Hopf algebra A by a finite dimensional Hopf algebra F. The main theorem gives natural conditions under which H decomposes as a crossed or smash product of F by the finite dual of A. This decomposition is then further analysed using the Cartier- Gabriel-Kostant theorem to obtain component Hopf subalgebras of H mapping onto the classical components of A. The detailed consequences for a number of families of examples are then studied.