On the convergence of the Zassenhaus formula

Using the decomposition principle in groups of coalgebra morphisms we give a simple proof of a theorem of H. J. Baues related to an identity of Zassenhaus in algebras of prime characteristic p > 0. The authors of [2] did not relate their method to the original identity of Zassenhaus ([3, §6]) in al

Working in the setting of graded algebra we study the groups of coalgebra morphisms from connected cocommutative coalgebras to connected Hopf algebras. We show that, under certain conditions, these groups have presentations closely related to the Zassenhaus formulae. Furthermore, a new proof of thes

In this paper the problem of the convergence of the Baker-Campbell-Hausdorff series for Z = log(e X e Y ) is revisited. We collect some previous results about the convergence domain and present a new estimate which improves all of them. We also provide a new expression of the truncated Lie presentat