Convex body

In mathematics, a convex body in $n$ -dimensional Euclidean space $\mathbb {R} ^{n}$ is a compact convex set with non-empty interior. Some authors do not require a non-empty interior, merely that the set is non-empty.

A convex body $K$ is called symmetric if it is centrally symmetric with respect to the origin; that is to say, a point $x$ lies in $K$ if and only if its antipode, $-x$ also lies in $K.$ Symmetric convex bodies are in a one-to-one correspondence with the unit balls of norms on $\mathbb {R} ^{n}.$

Some commonly known examples of convex bodies are the Euclidean ball, the hypercube and the cross-polytope.

Metric space structure

Write ${\mathcal {K}}^{n}$ for the set of convex bodies in $\mathbb {R} ^{n}$ . Then ${\mathcal {K}}^{n}$ is a complete metric space with metric

$d(K,L):=\inf\{\epsilon \geq 0:K\subset L+B^{n}(\epsilon ),L\subset K+B^{n}(\epsilon )\}$ .^[1]

Further, the Blaschke Selection Theorem says that every d-bounded sequence in ${\mathcal {K}}^{n}$ has a convergent subsequence.^[1]

Polar body

If $K$ is a bounded convex body containing the origin $O$ in its interior, the polar body $K^{*}$ is $\{u:\langle u,v\rangle \leq 1,\forall v\in K\}$ . The polar body has several nice properties including $(K^{*})^{*}=K$ , $K^{*}$ is bounded, and if $K_{1}\subset K_{2}$ then $K_{2}^{*}\subset K_{1}^{*}$ . The polar body is a type of duality relation.