Dimension Theory for Ordinary Differential Equations, Softcover reprint of the original 1st ed. 2005 Teubner-Texte zur Mathematik Series, Vol. 141

This book is devoted to the estimation of dimension-like characteristics (Hausdorff dimension, fractal dimension, Lyapunov dimension, topological entropy) for attractors
(mainly global B-attractors) of ordinary differential equations, time-discrete systems and dynamical systems on finite-dimensional manifolds. The contraction under flows of
parameter-dependent outer measures is shown by introducing varying Lyapunov functions or metric tensors in the calculation of singular values. For the attractors of the Henon and Lorenz systems, exact formulae for the Lyapunov dimension are derived.

I Singular values, exterior calculus and Lozinskii-norms.- 1 Singular values and covering of ellipsoids.- 2 Singular value inequalities.- 3 Compound matrices.- 4 Logarithmic matrix norms.- 5 The Yakubovich-Kalman frequency theorem.- 6 Frequency-domain estimation of singular values.- 7 Exterior calculus in linear spaces.- II Attractors, stability and Lyapunov functions.- 1 Dynamical systems, limit sets and attractors.- 2 Dissipativity.- 3 Stability of motion.- 4 Existence of a homoclinic orbit in the Lorenz system.- 5 The generalized Lorenz system.- 6 Orbital stability for flows on manifolds.- III Introduction to dimension theory.- 1 Topological dimension.- 2 Hausdorff and fractal dimensions.- 3 Topological entropy.- 4 Dimension-like characteristics.- IV Dimension and Lyapunov functions.- 1 Estimation of the topological dimension.- 2 Upper estimates for the Hausdorff dimension.- 3 The application of the limit theorem to ODE’s.- 4 Convergence in third-order nonlinear systems.- 5 Estimates of fractal dimension.- 6 Estimates of the topological entropy.- 7 Fractal dimension estimates.- 8 Upper Lyapunov dimension.- 9 Formulas for the Lyapunov dimension.- 10 Invariant sets of vector fields.- 11 Use of a tubular Carathéodory structure.- 12 The Lyapunov dimension as upper bound.- 13 Lower estimates of the dimension of B-attractors.- A Some tools.- A.1 Definition of a differentiable manifold.- A.2 Tangent space, tangent bundle and differential.- A.3 Tensor products, exterior products and tensor fields.- A.4 Riemannian manifolds.- A.5 Covariant derivative.- A.6 Vector fields.- A.7 Spaces of vector fields and maps.- A.8 Parallel transport, geodesics and exponential map.- A.9 Curvature and torsion.- A.10 Fiber bundles and distributions.- A.11 Recurrence and hyperbolicity indynamical systems.- A.12 Homology theory.- A.13 Degree theory.- A.15 Geometric measure theory.- A.16 Totally ordered sets.- A.17 Almost periodic functions.

Dr. Vladimir A. Boichenko, Barrikada Company, St. Petersburg
Prof. Dr. Gennadij A. Leonov, St. Petersburg State University
Dr. Volker Reitmann, MPI for the Physics of Complex Systems, Dresden

Moderne Methoden für die Dimensionstheorie gewöhnlicher Differentialgleichungen: Fraktale Dimension und dynamische Systeme