Detecting invariant expanding cones for generating word sets to identify chaos in piecewise-linear maps

Abstract

We show how the existence of three objects, trap, W, and C, for a continuous piecewise-linear map f on RN, implies that f has a topological attractor with a positive Lyapunov exponent. First, trap ⊂ RN is trapping region for f. Second, W is a finite set of words that encodes the forward orbits of all points in trap. Finally, C ⊂ T RN is an invariant expanding cone for derivatives of compositions of f formed by the words in W. We develop an algorithm that identifies these objects for two-dimensional homeomorphisms comprised of two affine pieces. The main effort is in the explicit construction of trap and C. Their existence is equated to a set of computable conditions in a general way. This results in a computer-assisted proof of chaos throughout a relatively large regime of parameter space. We also observe how the failure of C to be expanding can coincide with a bifurcation of f. Lyapunov exponents are evaluated using one-sided directional derivatives so that forward orbits that intersect a switching manifold (where f is not differentiable) can be included in the analysis.