Directed Set

• a ≤ a for all a in A (reflexivity)
• if a ≤ b and b ≤ c, then a ≤ c (transitivity)
• for any two a and b in A, there exists a c in A with a ≤ c and b ≤ c (directedness)

• The set of natural numbers N with the ordinary order ≤ is a directed set (and so is every totally ordered set).
• If x₀ is a real number, we can turn the set R − {x₀} into a directed set by writing a ≤ b if and only if
  |a − x₀| ≥ |b − x₀|. We then say that the reals have been directed towards x₀. This is not a partial order.
• If T is a topological space and x₀ is a point in T, we turn the set of all neighbourhoods of x₀ into a directed set by writing U ≤ V if and only if U contains V.
• For every U: U ≤ U; since U contains itself.
• For every U,V,W: if U ≤ V and V ≤ W, then U ≤ W; since if U contains V and V contains W then U contains W.
• For every U, V: there exists the set U ∩V such that U ≤ U ∩V and V ≤ U ∩V; since both U and V contain U ∩V.
• In a poset P, every subset of the form {a| a in P, a ≤x}, where x is a fixed element from P, is directed.

• A is not the empty set,
• for any two a and b in A, there exists a c in A with a ≤ c and b ≤ c (directedness),

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