Bornological space
Template:Short description In mathematics, particularly in functional analysis, a bornological space is a type of space which, in some sense, possesses the minimum amount of structure needed to address questions of boundedness of sets and linear maps, in the same way that a topological space possesses the minimum amount of structure needed to address questions of continuity. Bornological spaces are distinguished by the property that a linear map from a bornological space into any locally convex spaces is continuous if and only if it is a bounded linear operator.
Bornological spaces were first studied by George Mackey.Script error: No such module "Unsubst". The name was coined by BourbakiScript error: No such module "Unsubst". after Template:Wikt-lang, the French word for "bounded".
Bornologies and bounded maps
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A Template:Em on a set is a collection of subsets of that satisfy all the following conditions:
- covers that is, ;
- is stable under inclusions; that is, if and then ;
- is stable under finite unions; that is, if then ;
Elements of the collection are called Template:Em or simply Template:Em if is understood.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". The pair is called a Template:Em or a Template:Em.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
A Template:Em or Template:Em of a bornology is a subset of such that each element of is a subset of some element of Given a collection of subsets of the smallest bornology containing is called the Template:EmScript error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
If and are bornological sets then their Template:Em on is the bornology having as a base the collection of all sets of the form where and Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". A subset of is bounded in the product bornology if and only if its image under the canonical projections onto and are both bounded.
Bounded maps
If and are bornological sets then a function is said to be a Template:Em or a Template:Em (with respect to these bornologies) if it maps -bounded subsets of to -bounded subsets of that is, if Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". If in addition is a bijection and is also bounded then is called a Template:Em.
Vector bornologies
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Let be a vector space over a field where has a bornology A bornology on is called a Template:Em if it is stable under vector addition, scalar multiplication, and the formation of balanced hulls (i.e. if the sum of two bounded sets is bounded, etc.).
If is a topological vector space (TVS) and is a bornology on then the following are equivalent:
- is a vector bornology;
- Finite sums and balanced hulls of -bounded sets are -bounded;Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- The scalar multiplication map defined by and the addition map defined by are both bounded when their domains carry their product bornologies (i.e. they map bounded subsets to bounded subsets).Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
A vector bornology is called a Template:Em if it is stable under the formation of convex hulls (i.e. the convex hull of a bounded set is bounded) then And a vector bornology is called Template:Em if the only bounded vector subspace of is the 0-dimensional trivial space
Usually, is either the real or complex numbers, in which case a vector bornology on will be called a Template:Em if has a base consisting of convex sets.
Bornivorous subsets
A subset of is called Template:Em and a Template:Em if it absorbs every bounded set.
In a vector bornology, is bornivorous if it absorbs every bounded balanced set and in a convex vector bornology is bornivorous if it absorbs every bounded disk.
Two TVS topologies on the same vector space have that same bounded subsets if and only if they have the same bornivores.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Every bornivorous subset of a locally convex metrizable topological vector space is a neighborhood of the origin.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Mackey convergence
A sequence in a TVS is said to be Template:Em if there exists a sequence of positive real numbers diverging to such that converges to in Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Bornology of a topological vector space
Every topological vector space at least on a non discrete valued field gives a bornology on by defining a subset to be bounded (or von-Neumann bounded), if and only if for all open sets containing zero there exists a with If is a locally convex topological vector space then is bounded if and only if all continuous semi-norms on are bounded on
The set of all bounded subsets of a topological vector space is called Template:Em or Template:Em of
If is a locally convex topological vector space, then an absorbing disk in is bornivorous (resp. infrabornivorous) if and only if its Minkowski functional is locally bounded (resp. infrabounded).Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Induced topology
If is a convex vector bornology on a vector space then the collection of all convex balanced subsets of that are bornivorous forms a neighborhood basis at the origin for a locally convex topology on called the Template:Em.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
If is a TVS then the Template:Em is the vector space endowed with the locally convex topology induced by the von Neumann bornology of Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Quasi-bornological spaces
Quasi-bornological spaces where introduced by S. Iyahen in 1968.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
A topological vector space (TVS) with a continuous dual is called a Template:EmScript error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". if any of the following equivalent conditions holds:
- Every bounded linear operator from into another TVS is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every bounded linear operator from into a complete metrizable TVS is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every knot in a bornivorous string is a neighborhood of the origin.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Every pseudometrizable TVS is quasi-bornological. Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". A TVS in which every bornivorous set is a neighborhood of the origin is a quasi-bornological space.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". If is a quasi-bornological TVS then the finest locally convex topology on that is coarser than makes into a locally convex bornological space.
Bornological space
In functional analysis, a locally convex topological vector space is a bornological space if its topology can be recovered from its bornology in a natural way.
Every locally convex quasi-bornological space is bornological but there exist bornological spaces that are Template:Em quasi-bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
A topological vector space (TVS) with a continuous dual is called a Template:Em if it is locally convex and any of the following equivalent conditions holds:
- Every convex, balanced, and bornivorous set in is a neighborhood of zero.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every bounded linear operator from into a locally convex TVS is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Recall that a linear map is bounded if and only if it maps any sequence converging to in the domain to a bounded subset of the codomain.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". In particular, any linear map that is sequentially continuous at the origin is bounded.
- Every bounded linear operator from into a seminormed space is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every bounded linear operator from into a Banach space is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
If is a Hausdorff locally convex space then we may add to this list:Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- The locally convex topology induced by the von Neumann bornology on is the same as 's given topology.
- Every bounded seminorm on is continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Any other Hausdorff locally convex topological vector space topology on that has the same (von Neumann) bornology as is necessarily coarser than
- is the inductive limit of normed spaces.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- is the inductive limit of the normed spaces as varies over the closed and bounded disks of (or as varies over the bounded disks of ).Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- carries the Mackey topology and all bounded linear functionals on are continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
-
has both of the following properties:
- is Template:Em or Template:Em, which means that every convex sequentially open subset of is open,
- is Template:Em or Template:Em, which means that every convex and bornivorous subset of is sequentially open.
Every sequentially continuous linear operator from a locally convex bornological space into a locally convex TVS is continuous,Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". where recall that a linear operator is sequentially continuous if and only if it is sequentially continuous at the origin. Thus for linear maps from a bornological space into a locally convex space, continuity is equivalent to sequential continuity at the origin. More generally, we even have the following:
- Any linear map from a locally convex bornological space into a locally convex space that maps null sequences in to bounded subsets of is necessarily continuous.
Sufficient conditions
As a consequent of the Mackey–Ulam theorem, "for all practical purposes, the product of bornological spaces is bornological."Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
The following topological vector spaces are all bornological:
- Any locally convex pseudometrizable TVS is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Thus every normed space and Fréchet space is bornological.
- Any strict inductive limit of bornological spaces, in particular any strict LF-space, is bornological.
- This shows that there are bornological spaces that are not metrizable.
- A countable product of locally convex bornological spaces is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Quotients of Hausdorff locally convex bornological spaces are bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- The direct sum and inductive limit of Hausdorff locally convex bornological spaces is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Fréchet Montel spaces have bornological strong duals.
- The strong dual of every reflexive Fréchet space is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- If the strong dual of a metrizable locally convex space is separable, then it is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- A vector subspace of a Hausdorff locally convex bornological space that has finite codimension in is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- The finest locally convex topology on a vector space is bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Counterexamples
There exists a bornological LB-space whose strong bidual is Template:Em bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
A closed vector subspace of a locally convex bornological space is not necessarily bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". There exists a closed vector subspace of a locally convex bornological space that is complete (and so sequentially complete) but neither barrelled nor bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Bornological spaces need not be barrelled and barrelled spaces need not be bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". Because every locally convex ultrabornological space is barrelled,Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". it follows that a bornological space is not necessarily ultrabornological.
Properties
- The strong dual space of a locally convex bornological space is complete.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every locally convex bornological space is infrabarrelled.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every Hausdorff sequentially complete bornological TVS is ultrabornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Thus every complete Hausdorff bornological space is ultrabornological.
- In particular, every Fréchet space is ultrabornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- The finite product of locally convex ultrabornological spaces is ultrabornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every Hausdorff bornological space is quasi-barrelled.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Given a bornological space with continuous dual the topology of coincides with the Mackey topology
- In particular, bornological spaces are Mackey spaces.
- Every quasi-complete (i.e. all closed and bounded subsets are complete) bornological space is barrelled. There exist, however, bornological spaces that are not barrelled.
- Every bornological space is the inductive limit of normed spaces (and Banach spaces if the space is also quasi-complete).
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Let be a metrizable locally convex space with continuous dual Then the following are equivalent:
- is bornological.
- is quasi-barrelled.
- is barrelled.
- is a distinguished space.
- If is a linear map between locally convex spaces and if is bornological, then the following are equivalent:
- is continuous.
- is sequentially continuous.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- For every set that's bounded in is bounded.
- If is a null sequence in then is a null sequence in
- If is a Mackey convergent null sequence in then is a bounded subset of
- Suppose that and are locally convex TVSs and that the space of continuous linear maps is endowed with the topology of uniform convergence on bounded subsets of If is a bornological space and if is complete then is a complete TVS.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- In particular, the strong dual of a locally convex bornological space is complete.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters". However, it need not be bornological.
- Subsets
- In a locally convex bornological space, every convex bornivorous set is a neighborhood of ( is Template:Em required to be a disk).Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Every bornivorous subset of a locally convex metrizable topological vector space is a neighborhood of the origin.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
- Closed vector subspaces of bornological space need not be bornological.Script error: No such module "Footnotes".Script error: No such module "Check for unknown parameters".
Ultrabornological spaces
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A disk in a topological vector space is called Template:Em if it absorbs all Banach disks.
If is locally convex and Hausdorff, then a disk is infrabornivorous if and only if it absorbs all compact disks.
A locally convex space is called Template:Em if any of the following equivalent conditions hold:
- Every infrabornivorous disk is a neighborhood of the origin.
- is the inductive limit of the spaces as varies over all compact disks in
- A seminorm on that is bounded on each Banach disk is necessarily continuous.
- For every locally convex space and every linear map if is bounded on each Banach disk then is continuous.
- For every Banach space and every linear map if is bounded on each Banach disk then is continuous.
Properties
The finite product of ultrabornological spaces is ultrabornological. Inductive limits of ultrabornological spaces are ultrabornological.
See also
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References
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Bibliography
- Template:Adasch Topological Vector Spaces
- Template:Berberian Lectures in Functional Analysis and Operator Theory
- Template:Bourbaki Topological Vector Spaces Part 1 Chapters 1–5
- Template:Conway A Course in Functional Analysis
- Template:Edwards Functional Analysis Theory and Applications
- Template:Grothendieck Topological Vector Spaces
- Script error: No such module "citation/CS1".
- Template:Hogbe-Nlend Bornologies and Functional Analysis
- Template:Jarchow Locally Convex Spaces
- Template:Khaleelulla Counterexamples in Topological Vector Spaces
- Template:Köthe Topological Vector Spaces I
- Script error: No such module "citation/CS1".
- Template:Narici Beckenstein Topological Vector Spaces
- Template:Schaefer Wolff Topological Vector Spaces
- Template:Schechter Handbook of Analysis and Its Foundations
- Template:Swartz An Introduction to Functional Analysis
- Template:Wilansky Modern Methods in Topological Vector Spaces
Template:Functional analysis Template:Boundedness and bornology Template:Topological vector spaces