193.174.19.232<HTML><HEAD><TITLE>Abstract: D. L. Crane, R. L. Davidchack, A. N. Gorban (2025)</TITLE></HEAD><BODY BGCOLOR="#EEDFCC"><p>
<small> Communications in Nonlinear Science and Numerical Simulation, 140(1), 108345p.  (2025) <a href="http://dx.doi.org/10.1016/j.cnsns.2024.108345" target="_blank">DOI:10.1016/j.cnsns.2024.108345</a></small
><h2>Minimal cover of high-dimensional chaotic attractors by embedded recurrent patterns</h2>
<strong>D. L. Crane, R. L. Davidchack, A. N. Gorban</strong><br>
<hr><p>We propose a general method for constructing a minimal cover of high-dimensional chaotic attractors by embedded unstable recurrent patterns. By minimal cover we mean a subset of available patterns such that the approximation of chaotic dynamics by a minimal cover with a predefined proximity threshold is as good as the approximation by the full available set. The proximity measure, based on the concept of a directed Hausdorff distance, can be chosen with considerable freedom and adapted to the properties of a given chaotic system. In the context of a spatiotemporally chaotic attractor of the Kuramoto–Sivashinsky system on a periodic domain, we demonstrate that the minimal cover can be faithfully constructed even when the proximity measure is defined within a subspace of dimension much smaller than the dimension of space containing the attractor. We discuss how the minimal cover can be used to provide a reduced description of the attractor structure and the dynamics on it.</p>
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