# Differences

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varieties [2010/07/29 17:21]
jipsen
varieties [2010/08/20 10:08] (current)
jipsen
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$P\mathcal{K}=\{$direct products of members of $\mathcal{K}\}$. $P\mathcal{K}=\{$direct products of members of $\mathcal{K}\}$.
-See [http://www.thoralf.uwaterloo.ca/htdocs/ualg.html Stanley N. Burris and H.P. Sankappanavar,  A Course in Universal Algebra] for+Equivalently, $\mathcal K$ is a variety iff $\mathcal K=HSP\mathcal K$.
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+In particular, given any class $\mathcal K$ of algebras, $V\mathcal K=HSP\mathcal K$ is the smallest variety that contains $\mathcal K$, and is called the \emph{variety generated by $\mathcal K$}.
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+See [[http://www.thoralf.uwaterloo.ca/htdocs/ualg.html| Stanley N. Burris and H.P. Sankappanavar,  A Course in Universal Algebra]] for
more details. more details.
-Show all pages on [http://math.chapman.edu/~jipsen/structures/doku.php/?do=search&id=%22|variety%22&fulltext=Search varieties]+Show all pages on [[http://math.chapman.edu/~jipsen/structures/doku.php/?do=search&id=variety&fulltext=Search| varieties]]
-A picture of some [http://www.chapman.edu/~jipsen/PCP/theoriesPO1.html theories ordered by interpretability]+A picture of some [[http://www.chapman.edu/~jipsen/PCP/theoriesPO1.html| theories ordered by interpretability]]
=== Some varieties and quasivarieties listed by signature and (first) subclass relation === === Some varieties and quasivarieties listed by signature and (first) subclass relation ===