Strongly Ruelle-Takens, strongly Auslander-Yorke and Poincaré chaos on semiflows

Abstract

In this paper, we study strongly Ruelle–Takens chaos, strongly Auslander–Yorke chaos and Poincaré chaos on the product of semiflows. It is proved that if the finite product or the countably infinite product of semiflows is chaotic then at least one of the factors is chaotic. We also provide necessary examples/counterexamples, wherever possible, related to our results.