http://mathcs.chapman.edu/structuresold/files/Action_lattices.pdf
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\begin{document}
\textbf{\Large Action lattices}
\quad\href{http://math.chapman.edu/cgi-bin/structures?action=edit;id=Action_lattices}{edit}
\abbreviation{ActLat}
\begin{definition}
An \emph{action lattice} is a structure $\mathbf{A}=\langle A,\vee,\wedge,0,\cdot,1,^*,\backslash ,/\rangle$
of type $\langle 2,2,0,2,0,1,2,2\rangle$ such that
$\langle A,\vee,0,\cdot,1,^*\rangle$ is a \href{Kleene_algebras.pdf}{Kleene algebras}
$\langle A,\vee,\wedge\rangle$ is a \href{Lattices.pdf}{Lattices}
$\backslash$ is the left residual of $\cdot $: $y\leq x\backslash z\Longleftrightarrow xy\leq z$
$/$ is the right residual of $\cdot$: $x\leq z/y\Longleftrightarrow xy\leq z$
\end{definition}
\begin{morphisms}
Let $\mathbf{A}$ and $\mathbf{B}$ be action lattices. A morphism from $\mathbf{A}$
to $\mathbf{B}$ is a function $h:A\rightarrow B$ that is a homomorphism:
$h(x\vee y)=h(x)\vee h(y) \mbox{and} h(x\wedge y)=h(x)\wedge h(y)
\mbox{and} h(x\cdot y)=h(x)\cdot h(y) \mbox{and} h(x\backslash
y)=h(x)\backslash h(y) \mbox{and} h(x/y)=h(x)/h(y) \mbox{and}
h(x^*)=h(x)^* \mbox{and} h(0)=0 \mbox{and} h(1)=1$
\end{morphisms}
\begin{basic_results}
\end{basic_results}
\begin{examples}
\begin{example}
\end{example}
\end{examples}
\begin{properties} Description of properties.
\begin{tabular}{|ll|}\hline
Classtype & variety\\\hline
Equational theory & open\\\hline
Quasiequational theory & undecidable\\\hline
First-order theory & undecidable\\\hline
Locally finite & no\\\hline
Residual size & unbounded\\\hline
Congruence distributive & yes\\\hline
Congruence modular & yes\\\hline
Congruence n-permutable & yes, $n=2$\\\hline
Congruence regular & no\\\hline
Congruence e-regular & yes\\\hline
Congruence uniform & no\\\hline
Congruence extension property & no\\\hline
Definable principal congruences & no\\\hline
Equationally def. pr. cong. & no\\\hline
Amalgamation property & \\\hline
Strong amalgamation property & \\\hline
Epimorphisms are surjective & \\\hline
\end{tabular}
\end{properties}
\begin{finite_members} $f(n)=$ number of members of size $n$.
$\begin{array}{lr}
f(1)= &1\\
f(2)= &1\\
f(3)= &3\\
f(4)= &16\\
f(5)= &149\\
f(6)= &1488\\
\end{array}$
\end{finite_members}
\hyperbaseurl{http://math.chapman.edu/structures/files/}
\parskip0pt
\begin{subclasses}\
\href{Commutative_action_lattices.pdf}{Commutative action lattices}
\end{subclasses}
\begin{superclasses}\
\href{Action_algebras.pdf}{Action algebras}
\href{Residuated_lattices.pdf}{Residuated lattices}
\end{superclasses}
\begin{thebibliography}{10}
\bibitem{Ln19xx}
\end{thebibliography}
\end{document}
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