Cyclic renormalization and automorphism groups of rooted trees
Author(s)
Bibliographic Information
Cyclic renormalization and automorphism groups of rooted trees
(Lecture notes in mathematics, 1621)
Springer-Verlag, c1996
- : pbk
Available at 92 libraries
Note
Includes bibliographical references and index
Description and Table of Contents
Description
The theme of the monograph is an interplay between dynamical systems and group theory. The authors formalize and study "cyclic renormalization", a phenomenon which appears naturally for some interval dynamical systems. A possibly infinite hierarchy of such renormalizations is naturally represented by a rooted tree, together with a "spherically transitive" automorphism; the infinite case corresponds to maps with an invariant Cantor set, a class of particular interest for its relevance to the description of the transition to chaos and of the Mandelbrot set. The normal subgroup structure of the automorphism group of such "spherically homogeneous" rooted trees is investigated in some detail. This work will be of interest to researchers in both dynamical systems and group theory.
Table of Contents
Cyclic renormalization.- Itinerary calculus and renormalization.- Spherically transitive automorphisms of rooted trees.- Closed normal subgroups of Aut(X(q)).
by "Nielsen BookData"