Beta-dual space

In functional analysis and related areas of mathematics, the beta-dual or $β$ -dual is a certain linear subspace of the algebraic dual of a sequence space.

Definition[edit]

Given a sequence space $X$ , the $β$ -dual of $X$ is defined as

X^{\beta }:=\left\{x\in \mathbb {K} ^{\mathbb {N} }\ :\ \sum _{i=1}^{\infty }x_{i}y_{i}{\text{ converges }}\quad \forall y\in X\right\}.

Here, $\mathbb {K} \in \{\mathbb {R} ,\mathbb {C} \}$ so that $\mathbb {K}$ denotes either the real or complex scalar field.

If $X$ is an FK-space then each $y$ in $X β$ defines a continuous linear form on $X$

f_{y}(x):=\sum _{i=1}^{\infty }x_{i}y_{i}\qquad x\in X.

Examples[edit]

$c_{0}^{\beta }=\ell ^{1}$
$(\ell ^{1})^{\beta }=\ell ^{\infty }$
$\omega ^{\beta }=\{0\}$

Properties[edit]

The beta-dual of an FK-space $E$ is a linear subspace of the continuous dual of $E$ . If $E$ is an FK-AK space then the beta dual is linear isomorphic to the continuous dual.

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