Affine space/Affine generating system/Introduction/Section

Lemma

Let ${}E$ be an affine space over the ${}K$ -vector space ${}V$ . In this situation, the intersection of a family of affine subspaces ${}F_{i}\subseteq E$ , ${}i\in I$ ,

is again an affine subspace.

Proof

If the intersection is empty, then the statement holds by definition. So let ${}P\in \bigcap _{i\in I}F_{i}$ . We may write the affine subspaces as

{}F_{i}=P+U_{i}\,

with linear subspaces ${}U_{i}\subseteq V$ . Let

{}U=\bigcap _{i\in I}U_{i}\,,

which is a linear subspace, due to fact (1). We claim that

{}\bigcap _{i\in I}F_{i}=P+U\,.

From ${}Q\in \bigcap _{i\in I}F_{i}$ , we can deduce

{}Q=P+u\,

with ${}u\in \bigcap _{i\in I}U_{i}$ , so that ${}Q\in P+U$ holds. If ${}Q\in P+U$ holds, then directly ${}Q\in P+U_{i}=F_{i}$ follows.

\Box

In particular, for every subset ${}T\subseteq E$ in an affine space ${}E$ , there exist a smallest affine subspace containing ${}T$ .

Let ${}E$ be an affine space over the ${}K$ -vector space ${}V$ , and let ${}T\subseteq E$ denote a subset. Then, the smallest affine subspace ${}F\subseteq E$ of ${}E$ , which contains ${}T$ , consists of all barycentric combinations

\sum _{i=1}^{n}a_{i}P_{i}{\text{ with }}P_{i}\in T{\text{ and }}\sum _{i=1}^{n}a_{i}=1.

Proof

The given set contains the points from ${}T$ , as we can take a standard tuple as a barycentric coordinate tuple. Therefore, the claim follows from fact and exercise.

\Box

Definition

Let ${}E$ be an affine space over the ${}K$ -vector space ${}V$ , and let ${}F\subseteq E$ be an affine subspace. A family of points ${}P_{i}\in F$ , ${}i\in I$ , is called an affine generating system

of

{}F

, if

{}F

is the smallest affine subspace of

{}E

containing all points

{}P_{i}

.

A point generates, as an affine space, the point itself, two points generate the connecting line.