On exponentials of exponential generating series

Abstract

Identifying the algebra of exponential generating series with the shuffle algebra of formal power series, one can define an exponential map exp!:X K[[X]] 1+X K[[X]] for the associated Lie group formed by exponential generating series with constant coefficient 1 over an arbitrary field K. The main result of this paper states that the map exp! (and its inverse map log!) induces a bijection between rational, respectively algebraic, series in X K [[X]] and 1+X K[[X]] if the field K is a subfield of the algebraically closed field Fp of characteristic p.