in which case the pair is called a bounded structure or a bornological set. Elements of ℬ are called ℬ-bounded sets or simply bounded sets, if ℬ is understood. A subset ? of a bornology ℬ is called a base or fundamental system of ℬ if for every B ∈ ℬ, there exists an A ∈ ? such that B ⊆ A. A subset ? of a bornology ℬ is called a subbase of ℬ if the collection of all finite unions of sets in ? forms a base for ℬ. If ? and ℬ are bornologies on X then we say that ℬ is finer or stronger than ? and that ? is coarser or weaker than ℬ if ? ⊆ ℬ. If is a bounded structure and X ∉ ℬ, then the set of complements is a filter called the filter at infinity. Given a collection ? of subsets of X, the smallest bornology containing ? is called the bornology generated by ?. If f : S → X is a map and ℬ is a bornology on X, then we denote the bornology generated by by and called it the inverse image bornology or the initial bornology induced by f on S.
Morphisms: Bounded maps
Suppose that and are bounded structures. A map f : X → Y is called locally bounded or just bounded if the image under f of every ?-bounded set is a ℬ-bounded set; that is, if for every A ∈ ?, f ∈ ℬ. Since the composition of two locally bounded map is again locally bounded, it is clear that the class of all bounded structures forms a category whose morphisms are bounded maps. An isomorphism in this category is called a bornomorphism and it is a bijective locally bounded map whose inverse is also locally bounded.
;Discrete bornology For any set X, the power set of X is a bornology on X called the discrete bornology. ;Compact bornology For any topological spaceX, the set of all relatively compact subsets of X form a bornology on X called the compact bornology on X. ;Closure and interior bornologies Suppose that X is a topological space and ℬ is a bornology on X. The bornology generated by the set of all interiors of sets in ℬ is called the interior of ℬ and is denoted by int ℬ. The bornology ℬ is called open if ℬ = int ℬ. Then the bornology generated by the set of all closures of sets in ℬ is called the closure of ℬ and is denoted by cl ℬ. We necessarily have int ℬ ⊆ ℬ ⊆ cl ℬ. The bornology ℬ is called closed if it satisfies any of the following equivalent conditions:
The bornology ℬ is called proper if ℬ is both open and closed. The topological space X is called locally ℬ-bounded or just locally bounded if every x ∈ X has a neighborhood that belongs to ℬ. Every compact subset of a locally bounded topological space is bounded. ;Topological rings Suppose that X is a commutative topological ring. A subset S of X is called bounded if for each neighborhood U of 0 in X, there exists a neighborhood V of 0 in X such that SV ⊆ U.
If X is a topological vector space then the set of all boundedness subsets of X from a bornology on X called the von Neumann bornology of X, the usual bornology, or simply the bornology of X and is referred to as natural boundedness. In any locally convex TVS X, the set of all closed bounded disks form a base for the usual bornology of X.
Trivial examples
For any set X, the set of all finite subsets of X is a bornology on X; the same is true of the set of all countable subsets of X.
More generally, for any infinite cardinal ?, the set of all subsets of X having cardinality at most ? is a bornology on X.
The set of relatively compact subsets of ℝ form a bornology on ℝ. A base for this bornology is given by all closed intervals of the form for n a positive integer.
Let S be a set, be an I-indexed family of bounded structures, and let be an I-indexed family of maps where for all i ∈ I, fi : S → Ti. The inverse image bornology ? on S determined by these maps is the strongest bornology on S making each fi : → locally bounded. This bornology is equal to.
Let S be a set, be an I-indexed family of bounded structures, and let be an I-indexed family of maps where for all i ∈ I, fi : Ti → S. The direct image bornology ? on S determined by these maps is the weakest bornology on S making each fi : → locally bounded. If for each i ∈ I, ?i denotes the bornology generated by f, then this bornology is equal to the collection of all subsets A of S of the form where each Ai ∈ ?i and all but finitely manyAi are empty.
Subspace bornology
Suppose that is a bounded structure and S be a subset of X. The subspace bornology ? on S is the finest bornology on S making the natural inclusion map of S into X, Id : →, locally bounded.
Product bornology
Let be an I-indexed family of bounded structures, let X =, and for each i ∈ I, let fi : X → Xi denote the canonical projection. The product bornology on X is the inverse image bornology determined by the canonical projections fi : X → Xi. That is, it is the strongest bornology on X making each of the canonical projections locally bounded. A base for the product bornology is given by
