AbstractIn this paper we describe families of commuting invertible formal power series in one indeterminate over , using the method of formal functional equations. We give a characterization of such families where the set of multipliers (first coefficients) σ of its members F (x) = σ x + . . . is infinite, in particular of such families which are maximal with respect to inclusion, so called families of type I. The description of these families is based on Aczél–Jabotinsky differential equations, iteration groups, and on some results on normal forms of invertible series with respect to conjugation.
k-Regular Power Series and Mahler-Type Functional Equations
