Vector bornology

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In mathematics, especially functional analysis, a bornology ${\displaystyle ℬ}$ on a vector space ${\displaystyle X}$ over a field ${\displaystyle 𝕂,}$ where ${\displaystyle 𝕂}$ has a bornology ℬ_{${\displaystyle 𝔽}$}, is called a vector bornology if ${\displaystyle ℬ}$ makes the vector space operations into bounded maps.

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A Template:Em on a set ${\displaystyle X}$ is a collection ${\displaystyle ℬ}$ of subsets of ${\displaystyle X}$ that satisfy all the following conditions:

1. ${\displaystyle ℬ}$ covers ${\displaystyle X;}$ that is, ${\displaystyle X=\cup ℬ}$
2. ${\displaystyle ℬ}$ is stable under inclusions; that is, if ${\displaystyle B\in ℬ}$ and ${\displaystyle A\subseteq B,}$ then ${\displaystyle A\in ℬ}$
3. ${\displaystyle ℬ}$ is stable under finite unions; that is, if ${\displaystyle B_1,\dots ,B_n\in ℬ}$ then ${\displaystyle B_1\cup \cdots \cup B_n\in ℬ}$

Elements of the collection ${\displaystyle ℬ}$ are called Template:Em or simply Template:Em if ${\displaystyle ℬ}$ is understood. The pair ${\displaystyle (X,ℬ)}$ is called a Template:Em or a Template:Em.

A Template:Em or Template:Em of a bornology ${\displaystyle ℬ}$ is a subset ${\displaystyle {ℬ}_0}$ of ${\displaystyle ℬ}$ such that each element of ${\displaystyle ℬ}$ is a subset of some element of ${\displaystyle {ℬ}_0.}$ Given a collection ${\displaystyle 𝒮}$ of subsets of ${\displaystyle X,}$ the smallest bornology containing ${\displaystyle 𝒮}$ is called the bornology generated by ${\displaystyle 𝒮.}$Template:Sfn

If ${\displaystyle (X,ℬ)}$ and ${\displaystyle (Y,𝒞)}$ are bornological sets then their Template:Em on ${\displaystyle X\times Y}$ is the bornology having as a base the collection of all sets of the form ${\displaystyle B\times C,}$ where ${\displaystyle B\in ℬ}$ and ${\displaystyle C\in 𝒞.}$Template:Sfn A subset of ${\displaystyle X\times Y}$ is bounded in the product bornology if and only if its image under the canonical projections onto ${\displaystyle X}$ and ${\displaystyle Y}$ are both bounded.

If ${\displaystyle (X,ℬ)}$ and ${\displaystyle (Y,𝒞)}$ are bornological sets then a function ${\displaystyle f:X\to Y}$ is said to be a Template:Em or a Template:Em (with respect to these bornologies) if it maps ${\displaystyle ℬ}$-bounded subsets of ${\displaystyle X}$ to ${\displaystyle 𝒞}$-bounded subsets of ${\displaystyle Y;}$ that is, if ${\displaystyle f\left(ℬ\right)\subseteq 𝒞.}$Template:Sfn If in addition ${\displaystyle f}$ is a bijection and ${\displaystyle f^{-1}}$ is also bounded then ${\displaystyle f}$ is called a Template:Em.

Let ${\displaystyle X}$ be a vector space over a field ${\displaystyle 𝕂}$ where ${\displaystyle 𝕂}$ has a bornology ${\displaystyle {ℬ}_{𝕂}.}$ A bornology ${\displaystyle ℬ}$ on ${\displaystyle X}$ 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 ${\displaystyle X}$ is a vector space and ${\displaystyle ℬ}$ is a bornology on ${\displaystyle X,}$ then the following are equivalent:

1. ${\displaystyle ℬ}$ is a vector bornology
2. Finite sums and balanced hulls of ${\displaystyle ℬ}$-bounded sets are ${\displaystyle ℬ}$-boundedTemplate:Sfn
3. The scalar multiplication map ${\displaystyle 𝕂\times X\to X}$ defined by ${\displaystyle (s,x)\mapsto sx}$ and the addition map ${\displaystyle X\times X\to X}$ defined by ${\displaystyle (x,y)\mapsto x+y,}$ are both bounded when their domains carry their product bornologies (i.e. they map bounded subsets to bounded subsets)Template:Sfn

A vector bornology ${\displaystyle ℬ}$ 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 ${\displaystyle ℬ.}$ And a vector bornology ${\displaystyle ℬ}$ is called Template:Em if the only bounded vector subspace of ${\displaystyle X}$ is the 0-dimensional trivial space ${\displaystyle \{0\}.}$

Usually, ${\displaystyle 𝕂}$ is either the real or complex numbers, in which case a vector bornology ${\displaystyle ℬ}$ on ${\displaystyle X}$ will be called a Template:Em if ${\displaystyle ℬ}$ has a base consisting of convex sets.

Suppose that ${\displaystyle X}$ is a vector space over the field ${\displaystyle 𝔽}$ of real or complex numbers and ${\displaystyle ℬ}$ is a bornology on ${\displaystyle X.}$ Then the following are equivalent:

1. ${\displaystyle ℬ}$ is a vector bornology
2. addition and scalar multiplication are bounded mapsTemplate:Sfn
3. the balanced hull of every element of ${\displaystyle ℬ}$ is an element of ${\displaystyle ℬ}$ and the sum of any two elements of ${\displaystyle ℬ}$ is again an element of ${\displaystyle ℬ}$Template:Sfn

If ${\displaystyle X}$ is a topological vector space then the set of all bounded subsets of ${\displaystyle X}$ from a vector bornology on ${\displaystyle X}$ called the Template:Em, the Template:Em, or simply the Template:Em of ${\displaystyle X}$ and is referred to as Template:Em.Template:Sfn In any locally convex topological vector space ${\displaystyle X,}$ the set of all closed bounded disks form a base for the usual bornology of ${\displaystyle X.}$Template:Sfn

Unless indicated otherwise, it is always assumed that the real or complex numbers are endowed with the usual bornology.

Suppose that ${\displaystyle X}$ is a vector space over the field ${\displaystyle 𝕂}$ of real or complex numbers and ${\displaystyle ℬ}$ is a vector bornology on ${\displaystyle X.}$ Let ${\displaystyle 𝒩}$ denote all those subsets ${\displaystyle N}$ of ${\displaystyle X}$ that are convex, balanced, and bornivorous. Then ${\displaystyle 𝒩}$ forms a neighborhood basis at the origin for a locally convex topological vector space topology.

Let ${\displaystyle 𝕂}$ be the real or complex numbers (endowed with their usual bornologies), let ${\displaystyle (T,ℬ)}$ be a bounded structure, and let ${\displaystyle LB(T,𝕂)}$ denote the vector space of all locally bounded ${\displaystyle 𝕂}$-valued maps on ${\displaystyle T.}$ For every ${\displaystyle B\in ℬ,}$ let ${\displaystyle p_B(f):=\sup |f(B)|}$ for all ${\displaystyle f\in LB(T,𝕂),}$ where this defines a seminorm on ${\displaystyle X.}$ The locally convex topological vector space topology on ${\displaystyle LB(T,𝕂)}$ defined by the family of seminorms ${\displaystyle \{p_B:B\in ℬ\}}$ is called the Template:Em.Template:Sfn This topology makes ${\displaystyle LB(T,𝕂)}$ into a complete space.Template:Sfn

Let ${\displaystyle T}$ be a topological space, ${\displaystyle 𝕂}$ be the real or complex numbers, and let ${\displaystyle C(T,𝕂)}$ denote the vector space of all continuous ${\displaystyle 𝕂}$-valued maps on ${\displaystyle T.}$ The set of all equicontinuous subsets of ${\displaystyle C(T,𝕂)}$ forms a vector bornology on ${\displaystyle C(T,𝕂).}$Template:Sfn

• Bornivorous set
• Bornological space
• Bornology
• Space of linear maps
• Ultrabornological space

Template:Reflist

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• Template:Hogbe-Nlend Bornologies and Functional Analysis
• Template:Cite book
• Template:Narici Beckenstein Topological Vector Spaces
• Template:Schaefer Wolff Topological Vector Spaces

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Template:Functional analysis Template:Boundedness and bornology Template:Topological vector spaces