total order

A totally ordered set (or linearly ordered set) is a poset $(T,\le )$ which has the property of comparability:

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  for all $x,y\in T$, either $x\le y$ or $y\le x$.

In other words, a totally ordered set is a set $T$ with a binary relation $\le$ on itsuch that the following hold for all $x,y,z\in T$:

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  $x\le x$. (reflexivity)

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  If $x\le y$ and $y\le x$, then $x=y$. (antisymmetry)

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  If $x\le y$ and $y\le z$, then $x\le z$. (transitivity)

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  Either $x\le y$ or $y\le x$. (comparability)

The binary relation $\le$ is then called a total order or a linear order (or total ordering or linear ordering).A totally ordered set is also sometimes called a chain, especially when it is considered as a subset of some other poset.If every nonempty subset of $T$ has a least element, then the total order is called a well-order (http://planetmath.org/WellOrderedSet).

Some people prefer to define the binary relation as a total order, rather than $\le$.In this case, is required to be transitive (http://planetmath.org/Transitive3) and to obey the law of trichotomy.It is straightforward to check that this is equivalent to the above definition, with the usual relationship between and $\le$(that is, $x\le y$ if and only if either or $x=y$).

A totally ordered set can also be defined as a lattice $(T,\vee ,\wedge )$ in which the following property holds:

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  for all $x,y\in T$, either $x\wedge y=x$ or $x\wedge y=y$.

Then totally ordered sets are distributive lattices (http://planetmath.org/DistributiveLattice).