论文信息 - Sur l'Inversion et l'Iteration Continue des Séries Formelles

Sur l'Inversion et l'Iteration Continue des Séries Formelles

This paper deals with the composition of normalised formal power series, in one variable, over an arbitrary field K of characteristic zero. A suitable group structure B ⊙ on the set B of polynomial sequences of binomial type is introduced. This group is used first to obtain many formal variants of the classical Lagrange inversion formula (without using any complex integration). Secondly, via one-parameter subgroups of B ⊙ , iteration (i.e., successive composition) of normalised formal power series is studied in detail for arbitrary orders s ∈ K (“continuous” iteration). The case s = −1 coincides with power series inversion. Many new formulas are derived in the course of the text. The end of the work contains suggestions for future research.

Gilbert Labelle

[1] I. J. Good,et al. Generalizations to several variables of Lagrange's expansion, with applications to stochastic processes , 1960, Mathematical Proceedings of the Cambridge Philosophical Society.

[2] Adriano M. Garsia,et al. An exposá of the mullin-rota theory of polynomials of binomial type , 1973 .

[3] Pierre Leroux,et al. Catégories de Möbius et fonctorialités: un cadre général pour I'inversioin de Möbius , 1980, J. Comb. Theory, Ser. A.

[4] S. G. Williamson,et al. A linear algebra setting for the rota-mullin theory of polynomials of binomial type , 1973 .

[5] S. A. Joni,et al. A new expression for umbral operators and power series inversion , 1977 .

[6] S. A. Joni. Lagrange inversion in higher dimensions and umbral operators , 1978 .

[7] Laurent Chottin. Une demonstration combinatoire de la formule de lagrange a deux variables , 1975, Discret. Math..

[8] H. Gould. Coefficient Identities for Powers of Taylor and Dirichlet Series , 1974 .