# Differences

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distributive_lattice_ordered_semigroups [2018/10/14 16:08]
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distributive_lattice_ordered_semigroups [2018/10/14 16:16] (current)
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Example 1: Any collection $\mathbf A$ of binary relations on a set $X$ such that $\mathbf A$ is closed under union, intersection and composition. Example 1: Any collection $\mathbf A$ of binary relations on a set $X$ such that $\mathbf A$ is closed under union, intersection and composition.
-Andreka 1991 AU proves that these examples generate the variety DLOS.+H. Andreka[(Andreka1991)] proves that these examples generate the variety DLOS.
====Basic results==== ====Basic results====
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f(4)= &479\\   f(4)= &479\\
f(5)= &\\   f(5)= &\\
-\end{array}$-$\begin{array}{lr}
-  f(6)= &\\
-  f(7)= &\\
-  f(8)= &\\
-  f(9)= &\\
-  f(10)= &\\
\end{array}$\end{array}$
-
====Subclasses==== ====Subclasses====
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====References==== ====References====
-[(Andreka1991> +[(Andreka1991>Hajnal Andreka, \emph{Representations of distributive lattice-ordered semigroups with binary relations}, Algebra Universalis \textbf{28} (1991), 12--25)]
-Hajnal Andr\'eka, \emph{Representations of distributive lattice-ordered semigroups with binary relations}, Algebra Universalis \textbf{28} (1991), 12--25 +
-)]+