-
46A03
General theory of locally convex spaces
-
46A04
Locally convex Fréchet spaces and (DF)-spaces
-
46A08
Barrelled spaces, bornological spaces
-
46A11
Spaces determined by compactness or summability properties (nuclear spaces, Schwartz spaces, Montel spaces, etc.)
-
46A13
Spaces defined by inductive or projective limits (LB, LF, etc.) [See also
46M40]
-
46A16
Not locally convex spaces (metrizable topological linear spaces, locally bounded spaces, quasi-Banach spaces, etc.)
-
46A17
Bornologies and related structures; Mackey convergence, etc.
-
46A19
Other “topological” linear spaces (convergence spaces, ranked spaces, spaces with a metric taking values in an ordered structure more general than ${\bf R}$, etc.)
-
46A20
Duality theory
-
46A22
Theorems of Hahn-Banach type; extension and lifting of functionals and operators [See also
46M10]
-
46A25
Reflexivity and semi-reflexivity [See also
46B10]
-
46A30
Open mapping and closed graph theorems; completeness (including $B$-, $B_r$-completeness)
-
46A32
Spaces of linear operators; topological tensor products; approximation properties [See also
46B28,
46M05,
47L05,
47L20]
-
46A35
Summability and bases [See also
46B15]
-
46A40
Ordered topological linear spaces, vector lattices [See also
06F20,
46B40,
46B42]
-
46A45
Sequence spaces (including Köthe sequence spaces) [See also
46B45]
-
46A50
Compactness in topological linear spaces; angelic spaces, etc.
-
46A55
Convex sets in topological linear spaces; Choquet theory [See also
52A07]
-
46A61
Graded Fréchet spaces and tame operators
-
46A63
Topological invariants ((DN), ($\Omega$), etc.)
-
46A70
Saks spaces and their duals (strict topologies, mixed topologies, two-norm spaces, co-Saks spaces, etc.)
-
46A80
Modular spaces
-
46A99
None of the above, but in this section