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2024-11-22 18:13:14 -07:00 · 2024-11-22 18:13:14 -07:00 · 323f496b1f
parent 70bc640443
commit 323f496b1f
8 changed files with 204 additions and 14 deletions
--- a/betastable/Makefile
+++ b/betastable/Makefile
@ -0,0 +1,11 @@
 all: report.pdf
 %.pdf: %.tex
 	latexmk -f -e '$$max_repeat=10' -pdf $<
 clean:
 	${RM} *.pdf
 	${RM} *.bbl
 	${RM} *.blg
 	latexmk -C
--- a/betastable/report.out
+++ b/betastable/report.out
--- a/betastable/report.tex
+++ b/betastable/report.tex
@ -0,0 +1,129 @@
 \documentclass{article}
 \usepackage{xspace}
 \usepackage{hyperref}
 \usepackage{bm}
 \usepackage[english]{babel}
 \usepackage{amsthm}
 \usepackage{amsmath}
 \usepackage{mathtools}
 \usepackage{hyperref}
 \hypersetup{
 colorlinks=true,
 linkcolor=black,
 filecolor=black,      
 urlcolor=black,
 pdfpagemode=FullScreen,
 }
 \input{../notation.tex}
 \input{../glossary.tex}
 \pagenumbering{arabic}
 \pagestyle{plain}
 \newtheorem{theorem}{Theorem}
 \newtheorem{corollary}{Corollary}
 \newtheorem{lemma}{Lemma}
 \newtheorem{proposition}{Proposition}
 \newtheorem{definition}{Definition}
 \newtheorem{example}{Example}
 \title{Consistent n-Approximators ($\beta$)}
 \author{}
 \date{}
 \begin{document}
 \maketitle
 \begin{definition}
    \AnNdaoO is a $\langle \lte, \lte \rangle$-\Monotone function $o: \LL^2 \rightarrow \powersetO(\LL^2)$ s.t.\ for any $x \in \LL^2$
    \begin{itemize}
        \item $o(x, x)_1 = o(x, x)_2$
    \end{itemize}
 \end{definition}
 \begin{definition}
    \AnNdaoO is {\em extra consistent} if for every $\lte$-\Prefixpoint $y$ of $o(x, \cdot)_2$, $x \lte y$.
 \end{definition}
 What about the bottom half does it matter?
 \begin{lemma}[From Heyninck]
    \AnNdaoO is consistent, for every $(x, y)$, $o(x, y)_1 \times o(x, y)_2$ contains at least one consistent pair.
 \end{lemma}
 \begin{definition}
    Regular stable revision
    \begin{align*}
        S(o)(x, y)_1 \define \minLattice_{\lte}(\fixpointsOf(o(\cdot, y))) \\
        S(o)(x, y)_2 \define \minLattice_{\lte}(\fixpointsOf(o(x, \cdot)))
    \end{align*}
 \end{definition}
 \begin{definition}
    "beta" stable revision
    \begin{align*}
        S(o)(x, y)_2 \define \minLattice_{\lte}(\fixpointsOf(o(x, \cdot)) \setminus ((y \downclosure) \setminus (x \upclosure)))
    \end{align*}
 \end{definition}
 \begin{theorem}
    For an extra consistent \Ndao $o$, regular stable revision is equivalent to beta stable revision
 \end{theorem}
 \begin{example}
    SHowing without ultra consistency
    \begin{align*}
        o(x, y) \define (\{ \bot \}, \{ \bot \})
    \end{align*}
    below properties don't hold
 \end{example}
 \begin{proposition}\label{prop:ultra-consistency}
    Works fo rdouble sided ordering
    Given \AnNdaoO $o: \LL^2 \rightarrow \powersetO(\L)^2$ that is \Monotone from $\lte_p^2$ to $<_p^2$,\ we have for any consistent pair $(x, y) \in \LL^2$,
    \begin{align*}
        o(x, y) \lte_p^2 (o(x, y)_2, o(x, y)_1)
    \end{align*}
 \end{proposition}
 \begin{lemma}
    This probably needs double sides :()
    Given an \Ndao $o$, if $y$ is a \Prefixpoint of $o(x, \cdot)_2$, then for some $y' \in o(x, \cdot)_2$, we have
        $x \lte y' \lte y$.
 \end{lemma}
 \begin{proof}
    begin
 \end{proof}
 % iven an \gls{ndao} $o$, its {\em $\beta$-n-stable fixpoints} are fixpoints of the following    
 %     \begin{align*}
 %         B^o_{high}(x) &\define \{ a ~|~ a \in o({x}, a), \neg \exists a',
 %         \\ &\hspace{1.5cm}(\boxed{x \preceq_{}}~ a' \prec_{} a) \land (a' \in o({x}, a))) \}\\
 %         S(o)(x, y) &\define (C^{o}_{low}(y), B^{o}_{high}(x))
 %     \end{align*}}
 % \newcommand{\betastablefixpoint}{\hyperlink{glossary:betastablefixpoint}{$\beta$-stable fixpoint}}
 % \newglossaryentry{betastablefixpoint}{
 %     name={$\beta$-stable fixpoint},
 %     description={
 %         An \gls{interpretation} $(T, P)$ is a {\em $\alpha$-stable fixpoint} (or a $\beta$-stable fixpoint) if it is a \gls{fixpoint} of some $h \in H$ and for each $h' \in H$, none of the following hold
 %         \begin{enumerate}[(i.)]
 %             \item $\stablerevisionoperator(h')(T, P)_1 \prec_{} T$,
 %             \item ($\alpha$-stable only)~$\stablerevisionoperator(h')(T, P)_2 \prec_{} P$, nor
 %             \item ($\beta$-stable only) $\exists Z \in \L, T \preceq_{} (h'(T, Z)_2 = Z) \prec_{} P$
 %         \end{enumerate}
 % }}
 \bibliographystyle{plain}
 \bibliography{../references}
 \end{document}
--- a/glossary.tex
+++ b/glossary.tex
@ -1,21 +1,45 @@
-\newcommand{\definition}[2]{\hypertarget{glossary:#1}{#2}}
+\newcommand{\definitionBody}[2]{\hypertarget{glossary:#1}{#2}}
 \newcommand{\definitionLink}[2]{\hyperlink{glossary:#1}{#2}\xspace}
 \newcommand{\Monotone}{\definitionLink{monotone}{monotone}}
 \newcommand{\Image}{\definitionLink{image}{monotone}}
-\let\imageNoLink\image
+\let\imageNoLink\image{}
 \renewcommand{\image}[1]{\imageNoLink{#1}}
-\let\lubNoLink\lub
+\let\lubNoLink\lub{}
 \renewcommand{\lub}{\definitionLink{lubglb}{\lubNoLink}}
-\let\glbNoLink\glb
+\let\glbNoLink\glb{}
 \renewcommand{\glb}{\definitionLink{lubglb}{\glbNoLink}}
 \newcommand{\CompleteLattice}{\definitionLink{completelattice}{complete lattice}}
 \let\LLNoLink\LL{}
 \renewcommand{\LL}{\definitionLink{completelattice}{\LLNoLink}}
-\let\topNoLink\top
+\let\topNoLink\top{}
 \renewcommand{\top}{\definitionLink{topbot}{\topNoLink}}
-\let\botNoLink\bot
+\let\botNoLink\bot{}
 \renewcommand{\bot}{\definitionLink{topbot}{\botNoLink}}
 \let\fixpointsOfNoLink\fixpointsOf{}
 \renewcommand{\fixpointsOf}{\definitionLink{fixpointsOf}{\fixpointsOfNoLink}}
 \let\powersetNoLink\powerset{}
 \renewcommand{\powerset}{\definitionLink{powerset}{\powersetNoLink}}
 \let\powersetONoLink\powersetO{}
 \renewcommand{\powersetO}{\definitionLink{powerset}{\powersetONoLink}}
 \newcommand{\Poset}{\definitionLink{poset}{poset}}
 \let\lteNoLink\lte{}
 \renewcommand{\lte}{\definitionLink{poset}{\lteNoLink}}
 \let\lteSubNoLink\lteSub{}
 \renewcommand{\lteSub}[1]{\definitionLink{poset}{\lteSubNoLink{#1}}}
 \newcommand{\Ndao}{\definitionLink{ndao}{ndao}}
 \newcommand{\AnNdao}{an \definitionLink{ndao}{ndao}}
 \newcommand{\AnNdaoO}{An \definitionLink{ndao}{ndao}}
 \newcommand{\Interpretation}{\definitionLink{interpretation}{interpretation}}
 \newcommand{\Prefixpoint}{\definitionLink{prefixpoint}{prefixpoint}}
 \newcommand{\minLattice}{\bm{min}}
 \newcommand{\maxLattice}{\bm{max}}
--- a/notation.tex
+++ b/notation.tex
@ -1,8 +1,13 @@
 \newcommand{\fixpointsOf}{\textbf{\textit{fix}}}
-\renewcommand{\L}{\mathcal{L}}
+\newcommand{\LL}{\mathcal{L}}
 \newcommand{\lte}{\preceq}
 \newcommand{\lteSub}[1]{\lteNoLink_{#1}}
 \newcommand{\image}[1]{[#1]}
 \newcommand{\define}{\coloneqq}
 \newcommand{\union}{\cup}
 \newcommand{\glb}{\bigwedge}
 \newcommand{\lub}{\bigvee}
 \newcommand{\powerset}{\wp}
 \newcommand{\powersetO}{\wp^o}
 \newcommand{\upclosure}{\uparrow}
 \newcommand{\downclosure}{\downarrow}
--- a/note.out
+++ b/note.out
@ -0,0 +1,2 @@
 \BOOKMARK [1][-]{section.1}{\376\377\000B\000a\000c\000k\000g\000r\000o\000u\000n\000d}{}% 1
 \BOOKMARK [1][-]{section.2}{\376\377\000C\000o\000n\000t\000e\000n\000t}{}% 2
--- a/note.tex
+++ b/note.tex
@ -7,7 +7,14 @@
 \usepackage{amsthm}
 \usepackage{amsmath}
 \usepackage{mathtools}
-\newcommand{\jh}[1]{{\leavevmode\color{blue!50!red}#1}}
+\usepackage{hyperref}
 \hypersetup{
 colorlinks=true,
 linkcolor=black,
 filecolor=black,      
 urlcolor=black,
 pdfpagemode=FullScreen,
 }
 \input{notation.tex}
 \input{glossary.tex}
@ -23,18 +30,17 @@
 % \maketitle
 \definition{monotone}{define monotone}
 \definition{image}{define set image}
 \definition{lubglb}{define glb and lub}
 \definition{topbot}{define $\top$ and $\bot$}
 \definition{completelattice}{define complete lattice}
 Hello world\cite{tarskilatticetheoretical1955}
 First, we generalize Knaster-Tarski Fixpoint Theorem.
 $$\fixpointsOf(S)$$
 \section{Background}
 \input{sections/background.tex}
 \section{Content}
 \begin{theorem}[Tarski-Knaster Fixpoint Theorem~\cite{tarskilatticetheoretical1955}]\label{tarskitheorem}
    For a \Monotone function $o$ over a \CompleteLattice $\langle \L, \lte \rangle$, we have that $\langle \fixpointsOf(o), \lte \rangle$ is a \CompleteLattice.
 \end{theorem}
--- a/sections/background.tex
+++ b/sections/background.tex
@ -0,0 +1,13 @@
 \definition{powerset}{Given a set $S$, we denote its powerset, i.e.\ $\{ x \subseteq S \}$ with $\powerset(S)$. We use $\powersetO(S)$ to denote the powerset of $S$ without the empty set.}
 \definition{poset}{
    We call $\langle S, \lte \rangle$ a {\em poset} (a partially ordered set) if $\lte$ is reflexive, transitive and antisymmetric. 
 }
 \definition{lubglb}{An element is an {\em upper or lower bound} of a subset $S$ of a \Poset if it is greater than or equal or less than or equal, respectively, to every element inside $S$.}
 \definition{completelattice}{A {\em complete lattice} is a \Poset $\langle \LL, \lte \rangle$ s.t.\ every subset $S$ of $\LL$ has a unique greatest lower bound $\glb^{\LL} S$ and least upper bound $\lub^{\LL} S$}
 \definition{topbot}{We use $\top^{\LL}$ and $\bot^{\LL}$ to denote $\lub^{\LL} \LL$ and $\glb^{\LL} \LL$ respectively.}
 \definition{monotone}{A function $f: A \rightarrow B$ is {\em monotone} w.r.t. the orderings $\langle A, \lteSub{A} \rangle$ and $\langle B, \lteSub{B} \rangle$ if for all $a_1, a_2 \in A$, $a_1 \lte a_2$ implies $f(a_1) \lte f(a_2)$}
 \definition{image}{Given a function $f: A \rightarrow B$, we use $f[A]$ to denote the {\em image of $f$} w.r.t.\ $A$, i.e.\ the set $\{ f(a) ~|~ a \in A \} \subseteq B$.
 With abuse to notation, when given a set of functions $F$, we write $\bigcup \{ f\image{A} ~|~ f \in F \}$ as $F\image{A}$.}
		`@ -0,0 +1,2 @@`
							`\BOOKMARK [1][-]{section.1}{\376\377\000B\000a\000c\000k\000g\000r\000o\000u\000n\000d}{}% 1`
							`\BOOKMARK [1][-]{section.2}{\376\377\000C\000o\000n\000t\000e\000n\000t}{}% 2`