Let
0 has an atom
a below it, that is, there is some
a such that
b ≥
a :>
0. Every finite partially ordered set with
0 is atomic, but the set of nonnegative
real numbers (ordered in the usual way) is not atomic (and in fact has no atoms). A partially ordered set is
relatively atomic (or
strongly atomic) if for all
a <
b there is an element
c such that
a <:
c ≤
b or, equivalently, if every interval [
a,
b] is atomic. Every relatively atomic partially ordered set with a least element is atomic. Every finite poset is relatively atomic. A partially ordered set with least element
0 is called
atomistic (not to be confused with
atomic) if every element is the
least upper bound of a set of atoms. The linear order with three elements is not atomistic (see Fig. 2). Atoms in partially ordered sets are abstract generalizations of
singletons in
set theory (see Fig. 1). Atomicity (the property of being atomic) provides an abstract generalization in the context of
order theory of the ability to select an element from a non-empty set. ==Coatoms==