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partial ordering
(i.e. it is reflexive (x R x) and transitive (x R y R z =@#
x R z)) and it is also antisymmetric (x R y R x =@# x = y).
The ordering is partial, rather than total, because there may
exist elements x and y for which neither x R y nor y R x.
In domain theory, if D is a set of values including the
undefined value (bottom) then we can define a partial
ordering relation #@= on D by
x #@= y if x = bottom or x = y.
The constructed set D x D contains the very undefined element,
(bottom, bottom) and the not so undefined elements, (x,
bottom) and (bottom, x). The partial ordering on D x D is
then
(x1,y1) #@= (x2,y2) if x1 #@= x2 and y1 = y2.
The partial ordering on D - D is defined by
f #@= g if f(x) #@= g(x) for all x in D.
(No f x is more defined than g x.)
A lattice is a partial ordering where all finite subsets
have a least upper bound and a greatest lower bound.
("#@=" is written in LaTeX as sqsubseteq).
(1995-02-03)