Element

A cube with a highlighted vertex, edge, and face.

An element of a polytope is any of its fundamental building blocks. These include vertices, edges, faces, and so on. Elements are categorized by their rank, so that a vertex is a rank 0 element, an edge is a rank 1 element, and so on.

In formal mathematical writing, the term face is almost exclusively used instead, though here it is used with a different meaning (an element of rank 2 specifically).

Though they're often ignored and are more of a theoretical construct, every polytope of rank n has an element of rank −1 called the minimal, null, or least element, and an element of rank n called the maximal or greatest element. These two elements together are called the improper elements. The minimal element is often denoted by ${\displaystyle \varnothing}$ and is identified with the nullitope. The maximal element is often identified by the polytope itself.

Naming[edit | edit source]

Elements have special names based on their rank. Some of these are in professional use, while others have been coined within the amateur community and don't have wider usage.

Definition[edit | edit source]

The precise definition of an element varies depending on the precise notion of a polytope being worked with. When dealing with abstract polytopes, elements are precisely the elements (in the set-theoretic sense) of the polytope. For convex polytopes, the definition is more elaborate.

Elements as polytopes[edit | edit source]

Elements are often identified with polytopes. For instance, an edge in a polytope might be thought of as a dyad. When dealing with convex polytopes, this identification is literal. When dealing with abstract polytopes however, these are distinct notions. Rather, from any element ${\displaystyle P}$ a section ${\displaystyle P/\varnothing}$ may be built, which is then identified with the element.

See also[edit | edit source]

• Pseudo-element

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