G.-C. Rota, D. Kahaner and A. Odlyzko, “Finite Operator Calculus,” Journal of Mathematical Analysis and Its Applications, Vol. 42, No. 3, 1973, pp. 684-760.
has been cited by the following article:
TITLE: Generalized Powers of Substitution with Pre-Function Operators
AUTHORS: Laurent Poinsot
KEYWORDS: Formal Power Series; Formal Substitution; Riordan Group; Generalized Powers; Sheffer Sequences; Umbral Calculus
JOURNAL NAME: Applied Mathematics, Vol.4 No.7A, July 5, 2013
ABSTRACT: An operator on formal power series of the form S μS , where μ is an invertible power series, and σ is a series of the formt+(t2)is called a unipotent substitution with pre-function. Such operators, denoted by a pair (μ ,σ ) , form a group. The objective of this contribution is to show that it is possible to define a generalized powers for such operators, as for instance fractional powers σ for every .