3-adic system and chaos (Q410846)

Summary: Let \((Z(3), \tau)\) be a 3-adic system. We prove in \((Z(3), \tau)\) the existence of uncountable distributional chaotic set of \(A(\tau)\), which is an almost periodic points set, and further come to a conclusion that \(\tau\) is chaotic in the sense of Devaney and Wiggins.