Beauduin Kei
Published 2024-09-15Version 1
In this paper, we present five different formulas for both discrete and fractional iterations of an invertible power series $f$ utilizing a novel and unifying approach from umbral calculus. Established formulas are extended, and their proofs simplified, while new formulas are introduced. In particular, through the use of $q$-calculus identities, we eliminate the requirement for $f'(0)$ to equal $1$ and, consequently, the corresponding new expressions for the iterative logarithm are derived.
Comments: 14 pages, to be published
Polynomial Sequences of Binomial Type and Path Integrals
Set maps, umbral calculus, and the chromatic polynomial
Explicit expressions for the moments of the size of an (n, dn-1)-core partition with distinct parts
![QR code for arXiv:2409.09809 [math.CO]](http://oss.arxitics.com/images/favicon.svg)