On Hopf algebras of dimension pn in characteristic p

Abstract

Let be an algebraically closed field of characteristic p>0. We study the general structures of pn-dimensional Hopf algebras over with pn-1 group-like elements or a primitive element generating a pn-1-dimensional Hopf subalgebra. As applications, we have proved that Hopf algebras of dimension p2 over are pointed or basic for p 5, and provided a list of characterizations of the Radford algebra R(p). In particular, R(p) is the unique nontrivial extension of [Cp]* by [Cp], where Cp is the cyclic group of order p. In addition, we have proved a vanishing theorem for some 2nd Sweedler cohomology group and investigated the extensions of p-dimensional Hopf algebras. All these extensions have been identified and shown to be pointed.