Teichmüller–Tukey lemma

In mathematics, the Teichmüller–Tukey lemma (sometimes named just Tukey's lemma), named after John Tukey and Oswald Teichmüller, is a lemma that states that every nonempty collection of finite character has a maximal element with respect to inclusion. Over Zermelo–Fraenkel set theory, the Teichmüller–Tukey lemma is equivalent to the axiom of choice, and therefore to the well-ordering theorem, Zorn's lemma, and the Hausdorff maximal principle.^[1]

A family of sets ${\displaystyle ℱ}$ is of finite character provided it has the following properties:

1. For each ${\displaystyle A\in ℱ}$, every finite subset of ${\displaystyle A}$ belongs to ${\displaystyle ℱ}$.
2. If every finite subset of a given set ${\displaystyle A}$ belongs to ${\displaystyle ℱ}$, then ${\displaystyle A}$ belongs to ${\displaystyle ℱ}$.

Let ${\displaystyle Z}$ be a set and let ${\displaystyle ℱ\subseteq 𝒫(Z)}$. If ${\displaystyle ℱ}$ is of finite character and ${\displaystyle X\in ℱ}$, then there is a maximal ${\displaystyle Y\in ℱ}$ (according to the inclusion relation) such that ${\displaystyle X\subseteq Y}$.^[2]

In linear algebra, the lemma may be used to show the existence of a basis. Let V be a vector space. Consider the collection ${\displaystyle ℱ}$ of linearly independent sets of vectors. This is a collection of finite character. Thus, a maximal set exists, which must then span V and be a basis for V.

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• Brillinger, David R. "John Wilder Tukey" [1]