Dynamical Systems and Linear Algebra
Fritz Colonius
Price
1795
ISBN
9781470437299
Language
English
Pages
304
Format
Paperback
Dimensions
158 x 240 mm
Year of Publishing
2017
Territorial Rights
Restricted
Imprint
Universities Press

This book provides an introduction to the interplay between linear algebra and dynamical systems in continuous time and in discrete time. It first reviews the d autonomous case for one matrix A via induced dynamical systems in R and on Grassmannian manifolds. Then the main nonautonomous approaches are presented for which the time dependency of A(t) is given via skew-product flows using periodicity, or topological (chain recurrence) or ergodic properties (invariant measures). The authors develop generalizations of (real parts of) eigenvalues and eigenspaces as a starting point for a linear algebra for classes of time-varying linear systems, namely periodic, random, and perturbed (or controlled) systems.

The book presents for the first time in one volume a unified approach via Lyapunov exponents to detailed proofs of Floquet theory, of the properties of the Morse spectrum, and of the multiplicative ergodic theorem for products of random matrices. The main tools, chain recurrence and Morse decompositions, as well as classical ergodic theory are introduced in a way that makes the entire material accessible for beginning graduate students.

Fritz Colonius: Universität Augsburg, Augsburg, Germany

Wolfgang Kliemann: Iowa State University, Ames, IA