On a class between Devaney chaotic and Li-Yorke chaotic generalized shift dynamical systems

Abstract

In the following text, for finite discrete X with at least two elements, nonempty countable , and : we prove the generalized shift dynamical system (X,σ) is densely chaotic if and only if : does not have any (quasi-)periodic point. Hence the class of all densely chaotic generalized shifts on X is intermediate between the class of all Devaney chaotic generalized shifts on X and the class of all Li-Yorke chaotic generalized shifts on X. In addition, these inclusions are proper for infinite countable . Moreover we prove (X,σ) is Li-Yorke sensitive (resp. sensitive, strongly sensitive, asymptotic sensitive, syndetically sensitive, cofinitely sensitive, multi-sensitive, ergodically sensitive, spatiotemporally chaotic, Li-Yorke chaotic) if and only if : has at least one non-quasi-periodic point.