Distributional chaotic generalized shifts

Abstract

Suppose X is a finite discrete space with at least two elements, is a nonempty countable set, and consider self--map :. We prove that the generalized shift σ:X X with σ((xα)α∈)=(x(α))α∈ (for (xα)α∈∈ X) is: distributional chaotic (uniform, type 1, type 2) if and only if : has at least a non-quasi-periodic point, dense distributional chaotic if and only if : does not have any periodic point, transitive distributional chaotic if and only if : is one--to--one without any periodic point. We complete the text by counterexamples.