In functional analysis, a topological vector space (TVS) is said to be countably quasi-barrelled if every strongly bounded countable union of equicontinuous subsets of its continuous dual space is again equicontinuous. This property is a generalization of quasibarrelled spaces.
A TVS X with continuous dual space
X\prime
B\prime\subseteqX\prime
X\prime
X\prime
B\prime
A TVS with continuous dual space
X\prime
X\prime
A TVS with continuous dual space
X\prime
X\prime
Every countably quasi-barrelled space is a σ-quasi-barrelled space.
Every barrelled space, every countably barrelled space, and every quasi-barrelled space is countably quasi-barrelled and thus also σ-quasi-barrelled space. The strong dual of a distinguished space and of a metrizable locally convex space is countably quasi-barrelled.
Every σ-barrelled space is a σ-quasi-barrelled space. Every DF-space is countably quasi-barrelled. A σ-quasi-barrelled space that is sequentially complete is a σ-barrelled space.
There exist σ-barrelled spaces that are not Mackey spaces. There exist σ-barrelled spaces (which are consequently σ-quasi-barrelled spaces) that are not countably quasi-barrelled spaces. There exist sequentially complete Mackey spaces that are not σ-quasi-barrelled.There exist sequentially barrelled spaces that are not σ-quasi-barrelled. There exist quasi-complete locally convex TVSs that are not sequentially barrelled.