A Class of Reflexive Symmetric Bk-Spaces

Abstract

We denote by ω the linear space of all sequences of real or complex numbers. A linear subspace of ω is called a sequence space. A sequence space E is a BK-space (9) if it is equipped with a norm under which: first, E is a Banach space and second, each of the coordinate maps x → x_i is continuous. Let ∑ be the group of all permutations of Z⁺ = {1, 2, 3, …}. If x ∈ ω and σ ∈ ∑, the sequence x_σ is defined by (x_σ)_i = x_σ(i)). A sequence space E is symmetric if x_σ ∈ E whenever x ∈ E and σ ∈ ∑. Accounts of symmetric sequence spaces occur in (3; 7; 8).