# Moments of the weighted Cantor measures

**Authors:** Steven N. Harding, Alexander W. N. Riasanovsky

arXiv: 1908.05358 · 2019-08-16

## TL;DR

This paper studies the properties of weighted Cantor measures, including their moments, Laplacian, and generating functions, providing algorithms for moment estimation and characterizing decay behaviors.

## Contribution

It introduces new analytical tools for weighted Cantor measures, computes their moments and Laplacian, and develops efficient algorithms for moment estimation.

## Key findings

- Computed Laplacian and moment generating function of the measures
- Characterized when moments decay polynomially or exponentially
- Developed an algorithm for estimating moments within specified error

## Abstract

Based on the seminal work of Hutchinson, we investigate properties of {\em $\alpha$-weighted Cantor measures} whose support is a fractal contained in the unit interval. Here, $\alpha$ is a vector of nonnegative weights summing to $1$, and the corresponding weighted Cantor measure $\mu^\alpha$ is the unique Borel probability measure on $[0,1]$ satisfying $ \mu^\alpha(E) = \sum_{ n=0 }^{N-1} \alpha_n\mu^\alpha( \varphi_n^{-1}(E) )$ where $\varphi_n: x\mapsto (x+n)/N$. In Sections 1 and 2 we examine several general properties of the measure $\mu^\alpha$ and the associated Legendre polynomials in $L_{\mu^\alpha}^2[0,1]$. In Section 3, we (1) compute the Laplacian and moment generating function of $\mu^\alpha$, (2) characterize precisely when the moments $I_m = \int_{[0,1]}x^m\,d\mu^\alpha$ exhibit either polynomial or exponential decay, and (3) describe an algorithm which estimates the first $m$ moments within uniform error $\varepsilon$ in $O( (\log\log(1/\varepsilon))\cdot m\log m )$. We also state analogous results in the natural case where $\alpha$ is {\em palindromic} for the measure $\nu^{\alpha}$ attained by shifting $\mu^{\alpha}$ to $[-1/2,1/2]$.

## Full text

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## Figures

4 figures with captions in the complete paper: https://tomesphere.com/paper/1908.05358/full.md

## References

10 references — full list in the complete paper: https://tomesphere.com/paper/1908.05358/full.md

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Source: https://tomesphere.com/paper/1908.05358