Definition

Let $(X,d)$ be a metric space. Let $A\in\mathcal{P}(X)$ be an arbitrary subset of $X$. Then we say "$A$ is bounded in $(X,d)$" if^[1]:

• $\exists C<\infty\ \forall a,b\in A[d(a,b)<C]$ - where $C$ is real^{[Note 1]}

If a set is not bounded it is "unbounded" (that link redirects to this line)

Equivalent conditions

Let $(X,d)$ be a metric space and let $A\in\mathcal{P}(X)$ be an arbitrary subset of $X$. Then the following are all logical equivalent to each other^{[Note 2]}:

1. $\exists C<\infty\ \forall a,b\in A[d(a,b)<C]$ - $A$ is bounded (the definition)
2. $\forall x\in X\exists C<\infty\forall a\in A[d(a,x)<C]$^[1]

See also

• Diameter (set)

Notes

1. Jump up ↑ $C\in\mathbb{R}_{\ge 0}$ should do as $0$ could be a bound, I suppose on a one point set?
2. Jump up ↑ Just in case the reader isn't sure what this means, if $A$ and $B$ are logically equivalent then:
   • $A\iff B$. In words "$A$ if and only if $B$"

References

1. ↑ ^{Jump up to: 1.0 1.1} Functional Analysis - Volume 1: A gentle introduction - Dzung Minh Ha

OLD PAGE

Notes

TODO: Surely this can be generalised to an arbitrary Metric space

Of $\mathbb{R}^n$

Given a set $A\subseteq\mathbb{R}^n$ we say $A$ is bounded^[1] if:

• $\exists K\in\mathbb{R}$ such that $\forall x\in A$ (where $x=(x_1,\cdots,x_n)$) we have $\vert x_i\vert\le K$ for $i\in\{1,\cdots,n\}$

Immediate results

See also

• Topological property theorems

References

1. ↑ ^{Jump up to: 1.0 1.1 1.2} Introduction to topology - Bert Mendelson - Third Edition