The role of transfer operators and shifts in the study of fractals: encoding-models, analysis and geometry, commutative and non-commutative

TL;DR

This paper explores the spectral theory of transfer operators and shifts in dynamical systems on infinite product spaces, with applications to wavelet analysis, fractals, and complex dynamics.

Contribution

It introduces a unified framework for analyzing transfer operators and shifts in $L^2$ spaces, encompassing fractals, hyperbolic systems, and Julia sets, with new insights into their spectral properties.

Findings

Spectral analysis of transfer operators in $L^2$ spaces of infinite products.

Application of the framework to wavelet analysis and fractal systems.

Inclusion of hyperbolic systems and Julia sets within the dynamical systems studied.

Abstract

We study a class of dynamical systems in $L^2$ spaces of infinite products $X$. Fix a compact Hausdorff space $B$. Our setting encompasses such cases when the dynamics on $X = B^\bn$ is determined by the one-sided shift in $X$, and by a given transition-operator $R$. Our results apply to any positive operator $R$ in $C(B)$ such that $R1 = 1$. From this we obtain induced measures $\Sigma$ on $X$, and we study spectral theory in the associated $L^2(X,\Sigma)$. For the second class of dynamics, we introduce a fixed endomorphism $r$ in the base space $B$, and specialize to the induced solenoid $\Sol(r)$. The solenoid $\Sol(r)$ is then naturally embedded in $X = B^\bn$, and $r$ induces an automorphism in $\Sol(r)$. The induced systems will then live in $L^2(\Sol(r), \Sigma)$. The applications include wavelet analysis, both in the classical setting of $\br^n$, and Cantor-wavelets in the setting of fractals induced by affine iterated function systems (IFS). But our solenoid analysis includes such hyperbolic systems as the Smale-Williams attractor, with the endomorphism $r$ there prescribed to preserve a foliation by meridional disks. And our setting includes the study of Julia set-attractors in complex dynamics.