Los puntos clave no están disponibles para este artículo en este momento.
Let/, t e R) be a differentiable flow on a compact manifold M. A compact in-variant set A containing no fixed points is called hyperbolic if the tangent bundle restricted to A can be written as the Whitney sum of three Zyj-invariant continuous subbundles TAM = E + Es + Eu, where Eis the one-dimensional bundle tangent to the flow, and there are constants c, X 0 so that (a) ||l/, (v) | | S cr * ||v| | for veE, t⁰, (b) ||2/-, (v) | g certo ||v| | for veE», t ^ 0. A hyperbolic set A is called basic if, (a) the periodic orbits of ft | A are dense in A, {b) ft\ is a topologically transitive flow, (c) there is an open set U 3 A with A = fie*/ ^ Basic hyperbolic sets occur in Smales Axiom A flows 11, a class containing all known structurally stable flows. An important special case is an Anosov flow; here M itself is a hyperbolic set. We will outline a method for studying the structure of basic sets, namely sym-bolic dynamics. The space 2 „ = IL{1 •- » » is compact when given the product topology (and 1, •••, « the discrete topology). One writes x = (#, -) £- » for a point in 2n and x { = {x) t-. The shift homeomorphism a: 2n- 2n is defined by G{X) ì = Jfy+i. For A an « x n matrix of 0s and ls, the set 2A = {xe2„: AX/tXj+l = 1 for all i) is compact and tf-invariant. A basic hyperbolic set A will be closely related to a certain symbolic space IA.
Rufus Bowen (Mon,) studied this question.