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Definition 72

[1Y5] An order relation (or simply order) is a relation between elements of \(A\) that enjoys the properties: reflective, antisymmetrical, transitive.

An order relation is total if all elements are comparable, i.e. if for every \(a,b ∈ A\) you have \(aRb ∨ bRa\).

(When an order relation is not total, it is said to be partial).

Symbols such as ”\(≀\)” or ”\(βŠ†\)” or ”\(βͺ―\)” or similar are generally used.

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Authors: "Mennucci , Andrea C. G." .
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  • order relation
  • order, total
  • order, partial
  • total order , see order, total
  • partial order , see order, partial
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