# Chain-complete partial order

In mathematics, specifically order theory, a partially ordered set is **chain-complete** if every chain in it has a least upper bound. It is **ω-complete** when every increasing sequence of elements (a type of countable chain) has a least upper bound; the same notion can be extended to other cardinalities of chains.^{[1]}

Every complete lattice is chain-complete. Unlike complete lattices, chain-complete posets are relatively common. Examples include:

A poset is chain-complete if and only if it is a pointed dcpo.^{[1]} However, this equivalence requires the axiom of choice.

Zorn's lemma states that, if a poset has an upper bound for every chain, then it has a maximal element. Thus, it applies to chain-complete posets, but is more general in that it allows chains that have upper bounds but do not have least upper bounds.

Chain-complete posets also obey the Bourbaki–Witt theorem, a fixed point theorem stating that, if *f* is a function from a chain complete poset to itself with the property that, for all *x*, *f*(*x*) ≥ *x*, then *f* has a fixed point. This theorem, in turn, can be used to prove that Zorn's lemma is a consequence of the axiom of choice.^{[2]}^{[3]}

By analogy with the Dedekind–MacNeille completion of a partially ordered set, every partially ordered set can be extended uniquely to a minimal chain-complete poset.^{[1]}