In this paper, we investigate the possible propagation of travelling waves of a chaotic profile in an unbounded one-dimensional array of inductively-coupled Modified Chua’s Circuits. We show that the basic unit (cell) of our array is a relaxation-like chaotic oscillator, and its dynamics can be modeled by a two-dimensional system with hysteresis. This hysteresis system is studied via an associated 1D point map, and the existence of various distinct chaotic attractors is proved.
Discussion(0)
No comments yet. Be the first to comment.