beta-dual space

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

Definition

Given a sequence space the -dual of is defined as

:$X^:= \left \.$

If is an FK-space then each in defines a continuous linear form on

:$f_y(x) := \sum_^ x_i y_i \qquad x \in X.$

Examples

* $c_0^\beta = \ell^1$
* $(\ell^1)^\beta = \ell^\infty$
* $\omega^\beta = \$

Properties

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

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Functional analysis