Topological Properties of Invariant Sets for Anosov Maps with Holes

Simmons, Skyler C.

10 November 2011

We begin by studying various topological properties of invariant sets of hyperbolic toral automorphisms in the linear case. Results related to cardinality, local maximality, entropy, and dimension are presented. Where possible, we extend the results to the case of hyperbolic toral automorphisms in higher dimensions, and further to general Anosov maps.

Dynamical Systems

Open Systems

Hyperbolic Toral Automorphism

Hausdorff Dimension

Box Dimension

Anosov Map

Mathematics

Properties of a generalized Arnold’s discrete cat map

Svanström, Fredrik

January 2014

After reviewing some properties of the two dimensional hyperbolic toral automorphism called Arnold's discrete cat map, including its generalizations with matrices having positive unit determinant, this thesis contains a definition of a novel cat map where the elements of the matrix are found in the sequence of Pell numbers. This mapping is therefore denoted as Pell's cat map. The main result of this thesis is a theorem determining the upper bound for the minimal period of Pell's cat map. From numerical results four conjectures regarding properties of Pell's cat map are also stated. A brief exposition of some applications of Arnold's discrete cat map is found in the last part of the thesis.

Arnold’s discrete cat map

Hyperbolic toral automorphism

Discrete-time dynamical systems

Poincaré recurrence theorem

Number theory

Linear algebra

Fibonacci numbers

Pell numbers

Cryptography

Symbolic and geometric representations of unimodular Pisot substitutions

Wieler, Susana

11 July 2007

We review the construction of three Smale spaces associated to a unimodular Pisot substitution on d letters: a subshift of finite type (SFT), a substitution tiling space, and a hyperbolic toral automorphism on the Euclidean d-torus. By considering an SFT whose elements are biinfinite, rather than infinite, paths in the graph associated to the substitution, we modify a well-known map to obtain a factor map between our SFT and the hyperbolic toral automorphism on the d-torus given by the incidence matrix of the substitution. We prove that if the tiling substitution forces its border, then this factor map is the composition of an s-resolving factor map from the SFT to a one-dimensional substitution tiling space and a u-resolving factor map from the tiling space to the d-torus.

substitutions

dynamical systems

tilings

Smale spaces

Pisot

hyperbolic toral automorphism

subshift of finite type

Symbolic and geometric representations of unimodular Pisot substitutions

Wieler, Susana

11 July 2007

We review the construction of three Smale spaces associated to a unimodular Pisot substitution on d letters: a subshift of finite type (SFT), a substitution tiling space, and a hyperbolic toral automorphism on the Euclidean d-torus. By considering an SFT whose elements are biinfinite, rather than infinite, paths in the graph associated to the substitution, we modify a well-known map to obtain a factor map between our SFT and the hyperbolic toral automorphism on the d-torus given by the incidence matrix of the substitution. We prove that if the tiling substitution forces its border, then this factor map is the composition of an s-resolving factor map from the SFT to a one-dimensional substitution tiling space and a u-resolving factor map from the tiling space to the d-torus.

substitutions

dynamical systems

tilings

Smale spaces

Pisot

hyperbolic toral automorphism

subshift of finite type