# Vi\`ete's fractal distributions and their momenta

**Authors:** A. A. Kutsenko

arXiv: 1906.04579 · 2020-06-29

## TL;DR

This paper explores the solutions of Schr"oder-Poincaré polynomial equations, establishing a correspondence between zeros and discrete functions, and deriving explicit formulas for zeros and inverse branches using Weierstrass-Hadamard factorization.

## Contribution

It introduces a novel approach to represent solutions of polynomial equations via infinite products and explicit formulas, advancing the understanding of their zeros and inverse functions.

## Key findings

- Established a one-to-one correspondence between zeros of solutions and discrete functions.
- Derived explicit momenta formulas for zeros.
- Provided explicit branches of the multi-valued inverse function.

## Abstract

Solutions of Schr\"oder-Poincar\'e's polynomial equations $f(az)=P(f(z))$ usually do not admit a simple closed-form representation in terms of known standard functions. We show that there is a one-to-one correspondence between zeros of $f$ and a set of discrete functions stable at infinity. The corresponding Vi\`ete-type infinite products for zeros of $f$ are also provided. This allows us to obtain a special kind of closed-form representation for $f$ based on the Weierstrass-Hadamard factorization. From this representation, it is possible to derive explicit momenta formulas for zeros. We discuss also the rate of convergence of WH-factorization and momenta formulas. Obtaining explicit closed-form expressions is the main motivation for this work. Finally, all the branches of the multi-valued function $f^{-1}$ are computed explicitly.

## Full text

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## Figures

4 figures with captions in the complete paper: https://tomesphere.com/paper/1906.04579/full.md

## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1906.04579/full.md

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Source: https://tomesphere.com/paper/1906.04579