Is there any nontrivial compact generalized shift operator on Hilbert spaces?

Abstract

In the following text for cardinal number τ>0, and self--map :ττ we show the generalized shift operator σ(2(τ))⊂eq2(τ) (where σ((xα)α<τ)=(x(α))α<τ for (xα)α<τ∈ Cτ) if and only if :ττ is bounded and in this case σ_2(τ):2(τ)2(τ) is continuous, consequently σ_2(τ):2(τ)2(τ) is a compact operator if and only if τ is finite.