quasireflexivity

Quasireflexivity is a concept in functional analysis, specifically within the study of Banach spaces. A Banach space X is said to be quasireflexive if its bidual X is reflexive. The bidual X of a Banach space X is the dual space of its dual space X, and it is also a Banach space. The bidual X is related to X via the canonical embedding map J: X -> X, which is an isometric linear embedding.

A space is reflexive if the canonical embedding J is surjective. If X is reflexive, then X

The codimension of the image of the canonical embedding J in X is finite for quasireflexive spaces.

An example of a quasireflexive space that is not reflexive is the space of bounded sequences c.

The concept of quasireflexivity provides a way to categorize Banach spaces based on the reflexivity properties