Affine hull

In mathematics, the affine hull or affine span of a set S in Euclidean space Rⁿ is the smallest affine set containing S, or equivalently, the intersection of all affine sets containing S. Here, an affine set may be defined as the translation of a vector subspace.

The affine hull aff(S) of S is the set of all affine combinations of elements of S, that is,

\operatorname {aff} (S)=\left\{\sum _{i=1}^{k}\alpha _{i}x_{i}\,{\Bigg |}\,k>0,\,x_{i}\in S,\,\alpha _{i}\in \mathbb {R} ,\,\sum _{i=1}^{k}\alpha _{i}=1\right\}.

Examples

The affine hull of the empty set is the empty set.
The affine hull of a singleton (a set made of one single element) is the singleton itself.
The affine hull of a set of two different points is the line through them.
The affine hull of a set of three points not on one line is the plane going through them.
The affine hull of a set of four points not in a plane in R³ is the entire space R³.

Properties

For any subsets $S,T\subseteq X$

$\operatorname {aff} (\operatorname {aff} S)=\operatorname {aff} S$
$\operatorname {aff} S$ is a closed set if $X$ is finite dimensional.
$\operatorname {aff} (S+T)=\operatorname {aff} S+\operatorname {aff} T$
If $0\in S$ then $\operatorname {aff} S=\operatorname {span} S$ .
If $s_{0}\in S$ then $\operatorname {aff} (S)-s_{0}=\operatorname {span} (S-s_{0})$ is a linear subspace of $X$ .
$\operatorname {aff} (S-S)=\operatorname {span} (S-S)$ $\text{[math]}$ .
- So in particular, $\operatorname {aff} (S-S)$ is always a vector subspace of $X$ .
If $S$ is convex then $\operatorname {aff} (S-S)=\displaystyle \bigcup _{\lambda >0}\lambda (S-S)$
For every $s_{0}\in S$ $\text{[math]}$ , $\operatorname {aff} S=s_{0}+\operatorname {cone} (S-S)$ $\text{[math]}$ where $\operatorname {cone} (S-S)$ $\text{[math]}$ is the smallest cone containing $S-S$ $\text{[math]}$ (here, a set $C\subseteq X$ $\text{[math]}$ is a cone if $rc\in C$ $\text{[math]}$ for all $c\in C$ $\text{[math]}$ and all non-negative $r\geq 0$ $\text{[math]}$ ).
- Hence $\operatorname {cone} (S-S)$ is always a linear subspace of $X$ parallel to $\operatorname {aff} S$ .

Related sets

If instead of an affine combination one uses a convex combination, that is one requires in the formula above that all $\alpha _{i}$ be non-negative, one obtains the convex hull of S, which cannot be larger than the affine hull of S as more restrictions are involved.
The notion of conical combination gives rise to the notion of the conical hull
If however one puts no restrictions at all on the numbers $\alpha _{i}$ , instead of an affine combination one has a linear combination, and the resulting set is the linear span of S, which contains the affine hull of S.

gollark: And I don't think it'll be shifted significantly by being able to deal with that kind of rare event much better as much as... blind luck, happening to have had relevant opportunities, social skills and intelligence.

gollark: Evolutionary fitness is also not the same as physical fitness.

gollark: That's plausible I guess, but it's possible that many of those could have been avoided (and your definition would count this as "fitness", even). I'm pretty sure it's still less common than, well, other day to day bad things.

gollark: Are those *common*? I don't think I know anyone who's actually experienced any of those. Except maybe animals, very broadly.

gollark: I mean, most common bad situations are going to be along the lines of "someone was rude to me at work" or "my car broke down", not "I must run away from a thing very fast" or "I have to lift a several hundred kilogram object for some reason".

References

R.J. Webster, Convexity, Oxford University Press, 1994. ISBN 0-19-853147-8.

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