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- LF-space abstract "In mathematics, an LF-space is a topological vector space V that is a locally convex inductive limit of a countable inductive system of Fréchet spaces. This means that V is a direct limit of the system in the category of locally convex topological vector spaces and each is a Fréchet space.Original definition was also assuming that V is a strict locally convex inductive limit, which means that the topology induced on by is identical to the original topology on .The topology on V can be described by specifying that an absolutely convex subset U is a neighborhood of 0 if and only if is an absolutely convex neighborhood of 0 in for every n.".
- LF-space wikiPageID "2314852".
- LF-space wikiPageRevisionID "598542049".
- LF-space hasPhotoCollection LF-space.
- LF-space subject Category:Topological_vector_spaces.
- LF-space type Abstraction100002137.
- LF-space type Attribute100024264.
- LF-space type Space100028651.
- LF-space type TopologicalVectorSpaces.
- LF-space comment "In mathematics, an LF-space is a topological vector space V that is a locally convex inductive limit of a countable inductive system of Fréchet spaces.".
- LF-space label "(LF)-Raum".
- LF-space label "LF-space".
- LF-space label "LF空間".
- LF-space sameAs (LF)-Raum.
- LF-space sameAs LF空間.
- LF-space sameAs m.0735kx.
- LF-space sameAs Q158565.
- LF-space sameAs Q158565.
- LF-space sameAs LF-space.
- LF-space wasDerivedFrom LF-space?oldid=598542049.
- LF-space isPrimaryTopicOf LF-space.