equivalence of Hausdorff’s maximum principle, Zorn’s lemma and the well-ordering theorem

Considera partially ordered set $X$, where every chain has an upper bound. According to the maximum principlethere exists a maximal totally ordered subset $Y\subseteq X$. This then has an upper bound, $x$. If$x$ is not the largest element in $Y$ then $\{x\}\cup Y$ would be a totally ordered set in which $Y$would be properly contained, contradicting the definition. Thus $x$ is a maximal element in $X$.

Let $X$ be any non-empty set, and let $𝒜$ be the collection of pairs $(A,\le )$, where $A\subseteq X$and $\le$ is a well-ordering on $A$. Define a relation $⪯$, on $𝒜$ so that for all $x,y\in 𝒜:x⪯y$iff $x$ equals an initial of $y$. It is easy to see that this defines a partial order relation on $𝒜$(it inherits reflexibility, anti symmetry and transitivity from one set being an initial and thus a subset ofthe other).

For each chain $C\subseteq 𝒜$, define $C^{\prime }=(R,{\le }^{\prime })$ where R is the union of all the sets $A$for all $(A,\le )\in C$, and ${\le }^{\prime }$ is the union of all the relations $\le$ for all $(A,\le )\in C$.It follows that $C^{\prime }$ is an upper bound for $C$ in $𝒜$.

According to Zorn’s lemma, $𝒜$ now has a maximal element, $(M,{\le }_M)$. We postulate that $M$ contains allmembers of $X$, for if this were not true we could for any $a\in X-M$ construct $(M_{*},{\le }_{*})$ where$M_{*}=M\cup \{a\}$ and ${\le }_{*}$ is extended so $S_a(M_{*})=M$. Clearly ${\le }_{*}$ then defines a well-order on$M_{*}$, and $(M_{*},{\le }_{*})$ would be larger than $(M,{\le }_M)$ contrary to the definition.

Since $M$ contains all the members of $X$ and ${\le }_M$ is a well-ordering of $M$, it is also awell-ordering on $X$ as required.

Let $(X,⪯)$ be a partially ordered set, and let $\le$ be a well-ordering on $X$. We definethe function $\varphi$ by transfinite recursion over $(X,\le )$ so that

It follows that ${\bigcup }_{x\in X}\varphi (x)$ is a maximal totally ordered subset of $X$ as required.