Testing topological conjugacy of time series

Abstract

This paper considers a problem of testing, from a finite sample, a topological conjugacy of two dynamical systems (X,f) and (Y,g). More precisely, given x1,…, xn ⊂ X and y1,…,yn ⊂ Y such that xi+1 = f(xi) and yi+1 = g(yi) as well as h: X → Y, we deliver a number of tests to check if f and g are topologically conjugated via h. The values of the tests are close to zero for conjugated systems and large for systems that are not conjugated. Convergence of the test values, in case when sample size goes to infinity, is established. A number of numerical examples indicating scalability and robustness of the methods are given. In addition, we show how the presented method specialize to a test of sufficient embedding dimension in Takens' embedding theorem. Our methods also apply to the situation when we are given two observables of deterministic processes, of a form of one or higher dimensional time-series. In this case, their similarity can be accessed by comparing the dynamics of their Takens' reconstructions.