On proximal relations in transformation semigroups arising from generalized shifts

Abstract

For a finite discrete topological space X with at least two elements, a nonempty set , and a map :, σ:X X with σ((xα)α∈)= (x(α))α∈ (for (xα)α∈∈ X) is a generalized shift. In this text for S=\σ:∈\ and H=\σ: → is bijective\ we study proximal relations of transformation semigroups (S,X) and (H,X). Regarding proximal relation we prove: \[P( S,X)=\((xα)α∈,(yα)α∈) ∈ X× X: ∃β∈\:(xβ=yβ)\\] and P( H,X)⊂eq \((xα)α∈,(yα)α∈) ∈ X× X: \β∈:xβ=yβ\ is infinite~\\ (x,x):x∈ X\. \\ Moreover, for infinite , both transformation semigroups ( S,X) and ( H,X) are regionally proximal, i.e., Q( S,X)=Q( H,X)=X × X, also for sydetically proximal relation we have L( H,X)=\((xα)α∈,(yα)α∈) ∈ X× X: \γ∈:xγ≠ yγ\ is finite\.