Algebraic duality for partially ordered sets
Abstract
For an arbitrary partially ordered set P its dual P* is built as the collection of all monotone mappings P\2 where \2=\0,1\ with 0<1. The set of mappings P* is proved to be a complete lattice with respect to the pointwise partial order. The second dual P** is built as the collection of all morphisms of complete lattices P*\2 preserving universal bounds. Then it is proved that the partially ordered sets P and P** are isomorphic.
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