485 lines
15 KiB
TeX
485 lines
15 KiB
TeX
% !TeX spellcheck = en_US
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\DocumentMetadata{}
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\documentclass[12pt,xcolor={dvipsnames},aspectratio=169]{beamer}
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\input{./headerDiapo.tex}
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\title[Semantics of 2-sortification]{Categorical semantics of the reduction of GATs to two-sorted GATs.
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\\[1ex] \large Notes on my 4.5-month internship at the LIX}
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\hypersetup{pdftitle={Categorical semantics of the reduction of GATs to two-sorted GATs}}
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\author[Samy Avrillon]{Samy Avrillon, supervised by
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\\[1ex] Ambroise Lafont (LIX, Palaiseau, France)}
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\date{}
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\begin{document}
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\begin{frame}[plain]
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\maketitle
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\end{frame}
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\section{GATs and 2-sortification}
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\begin{frame}{What is a GAT ?}
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\begin{itemize}
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\item A dependent \textbf{type theory}
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\item[\ding{220}] Enables to create sorts, object of those sorts, equalities between those objects
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\item A \textbf{syntactic object}
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\item[\ding{220}] Type judgements are defined with induction rules
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\item Describes \textbf{models}
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\item[\ding{220}] Defines a category of models
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\end{itemize}
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\end{frame}
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\begin{frame}{A GAT for a function in Set}
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\begin{tcolorbox}
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\begin{columns}
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\begin{column}{.6\textwidth}
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\renewcommand\arraystretch{1.5}
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\begin{tabular}{l}
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$A : \Set$ \\
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$B : \Set$ \\\hline
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$\operatorname{exec} : A \to B$
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\end{tabular}
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\end{column}
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\begin{column}{.4\textwidth}
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Models:
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triples (A,B,f)
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\end{column}
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\end{columns}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{A GAT for an bijective function in Set}
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\begin{tcolorbox}
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\begin{columns}
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\begin{column}{.6\textwidth}
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\renewcommand\arraystretch{1.5}
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\begin{tabular}{l}
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$A : \Set$ \\
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$B : \Set$ \\\hline
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$\operatorname{exec} : A \to B$ \\
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$\operatorname{invexec} : B \to A$\\\hline
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$\operatorname{isol} : (x : A) \to \operatorname{invexec}(\operatorname{exec}\;x) = x$\\
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$\operatorname{isor} : (y : B) \to \operatorname{exec}(\operatorname{invexec}\;y) = y$\\
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\end{tabular}
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\end{column}
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\begin{column}{.4\textwidth}
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Models:
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triples (A,B,f)
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s.t. f is bijective
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\end{column}
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\end{columns}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{A GAT for a small category}
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\begin{tcolorbox}
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\begin{columns}
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\begin{column}{0.8\textwidth}
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\renewcommand\arraystretch{1.5}
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\begin{tabular}{l}
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$\Obj : \Set$ \\
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$\Hom : \Obj \to \Obj \to \Set$ \\\hline
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$\id : (A : \Obj) \to \Hom\;A\;A$ \\
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$\operatorname{comp} : (A\;B\;C:\Obj) \to \Hom\;B\;C \to\Hom\;A\;B \to \Hom\;A\;C$ \\\hline
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$\operatorname{idl}: (A B : \Obj) \to (\sigma : \Hom\;A\;B) \to \operatorname{comp} (\id\;B) \sigma = \sigma$\\
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$\operatorname{idr}: (A B : \Obj) \to (\sigma : \Hom\;A\;B) \to \operatorname{comp} \sigma (\id\;A) = \sigma$\\
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$\operatorname{comp-trans}: \dots$\\
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\end{tabular}
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\end{column}
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\begin{column}{0.2\textwidth}
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Models:
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small categories
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\end{column}
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\end{columns}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{A GAT for Type Theory}
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\begin{tcolorbox}
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\begin{columns}
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\begin{column}{0.7\textwidth}
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\renewcommand\arraystretch{1.5}
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\begin{tabular}{l}
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$\Con : \Set$ \\
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$\Ty : \Con \to \Set$ \\
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$\Tm : (\Gamma : \Con) \to \Ty\;\Gamma \to \Set$ \\\hline
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$\operatorname{empty}: \Con$ \\
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$\operatorname{ext}: (\Gamma:\Con)\to(A:\Ty\;\Gamma)\to\Con$ \\
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$\operatorname{implies} : (\Gamma:\Con) \to \Ty\;\Gamma \to \Ty\;\Gamma \to \Ty\;\Gamma$ \\
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$\operatorname{app} : (\Gamma : \Con) \to (A\;B :\Ty\;\Gamma) \to$\\
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\qquad$\Tm\;\Gamma\;(\operatorname{implies}\;A\;B)\to\Tm\;\Gamma\; A \to \Tm\;\Gamma\; B$
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\end{tabular}
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\end{column}
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\begin{column}{0.3\textwidth}
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Models : Triples
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$(X_\Con,X_\Ty,X_\Tm)$
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with constructors
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$\operatorname{empty} \in X_\Con$
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\qquad\vdots
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\end{column}
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\end{columns}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{2-sortification}
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\begin{center}
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{\large Transform a GAT into a GAT with only two sorts}
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\ding{229} Simplify a study of GATs
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\end{center}
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\end{frame}
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\begin{frame}{2-sortification of the Set Function GAT}
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\begin{tcolorbox}
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\renewcommand\arraystretch{1.5}
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\begin{tabular}{llrcl}
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\pause
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$\mathcal{O} : \Set$ & \color{RoyalBlue} \text{sorts} & $o:\mathcal{O}$ &$\leftrightarrow$&$o$ is a sort \\
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$\El : \mathcal{O} \to \Set$ & \color{RoyalBlue}\text{objects of that sort} & \qquad $x : \El\;o$ & $\leftrightarrow$ & $x : \mathcal{O}$ \pause\\\hline
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$A : \mathcal{O}$ &&\multicolumn{1}{l}{\color{teal}$A : \Set$}&&\\
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$B : \mathcal{O}$ &&\multicolumn{1}{l}{\color{teal}$B : \Set$}&&\\
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$\operatorname{exec} : \El\;A \to \El\;B$&&\color{teal}$\operatorname{exec} : A \to B$&&
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\end{tabular}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{2-sortification of Type Theory GAT}
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\begin{tcolorbox}
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\renewcommand\arraystretch{1.4}
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\begin{tabular}{l}
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$\mathcal{O} : \Set$ \\
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$\El : \mathcal{O} \to \Set$ \pause\\\hline
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$\Con : \mathcal{O}$ \\
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$\Ty : \El\;\Con \to \mathcal{O}$ \\
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$\Tm : (\Gamma : \El\;\Con) \to \El\;(\Ty\;\Gamma) \to \mathcal{O}$ \\
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$\operatorname{empty}: \El\;\Con$ \\
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$\operatorname{ext}: (\Gamma:\El\;\Con)\to(A:\El\;(\Ty\;\Gamma))\to\El\;\Con$ \\
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$\operatorname{implies} : (\Gamma:\El\;\Con) \to \El\;(\Ty\;\Gamma) \to \El\;(\Ty\;\Gamma) \to \El\;(\Ty\;\Gamma)$
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\end{tabular}
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\end{tcolorbox}
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\end{frame}
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\begin{frame}{Goal of the internship}{}
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{\large Is this transformation correct ?}
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\ding{229} Can one study all GATs by studying only GATs with two sorts
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\vspace{1ex}
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{\large How to state this fact}
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\ding{229} Semantical proof
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\begin{center}
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\includesvg[scale=.4]{graphs/diagrammeFG.svg}
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\end{center}
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\ding{229} This adjunction proves that one can make the initial model of any GAT from the initial model of the transformed GAT
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\end{frame}
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\section{One Example}
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\begin{frame}{Constructing the categories}
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\begin{center}
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\only<1>{GAT = sorts + constructors + equalities}
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\only<2>{GAT = sorts + \sout{constructors} + \sout{equalities}}
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\end{center}
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\pause[2]
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\begin{center}
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\begin{tabular}{|l|l|}
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\hline
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$\begin{array}{l}
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\Con : \Set \\
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\Ty : \Con \to \Set \\
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\Tm : (\Gamma : \Con) \to \Ty\;\Gamma \to \Set
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\end{array}$
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&
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$\begin{array}{l}
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\mathcal{O} : \Set\\
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\El : \mathcal{O} \to \Set \\\hline
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\underline{\Con} : \mathcal{O} \\
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\underline{\Ty} : \El\;\underline{\Con} \to \mathcal{O} \\
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\underline{\Tm} : (\Gamma : \El\;\underline{\Con}) \to \El(\underline{\Ty}\;\Gamma) \to \mathcal{O}
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\end{array}$\\\hline\rule{0pt}{1.0\normalbaselineskip}
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\only<2>{$\CC \hookrightarrow (\Con,\Ty,\Tm)$}
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\only<3->{$\CC_0 \hookrightarrow ()$}
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&
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\only<2>{$\BB \hookrightarrow (\mathcal{O},\El,\underline{\Con},\underline{\Ty},\underline{\Tm})$}
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\only<3->{$\BB_0 \hookrightarrow (\mathcal{O},\El)$}\\
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\uncover<3->{$\CC_1 \hookrightarrow (\Con)$} &
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\uncover<3->{$\BB_1 \hookrightarrow (\mathcal{O},\El,\underline{\Con})$}\\
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\uncover<3->{$\CC_2 \hookrightarrow (\Con,\Ty)$} &
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\uncover<3->{$\BB_2 \hookrightarrow (\mathcal{O},\El,\underline{\Con},\underline{\Ty})$}\\
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\uncover<3->{$\CC_3 \hookrightarrow (\Con,\Ty,\Tm)$} &
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\uncover<3->{$\BB_3 \hookrightarrow (\mathcal{O},\El,\underline{\Con},\underline{\Ty},\underline{\Tm})$}\\\hline
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\end{tabular}
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\end{center}
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\end{frame}
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\begin{frame}{Category of Models \& Generalization}
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\begin{tabular}{lcp{0.5\textwidth}}
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$\boxed{()}$ & $\CC_0 :=$ &
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$\one$ \\
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$\boxed{\Con : \Set}$ & $\CC_1 := $&
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\only<1>{$\left[X_\Con\right]$}
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\only<2>{$\left[X_\Con : \Set\right]$}
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\only<3>{$(\bullet : \CC_0) \times \left(\Set\right)$}
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\only<4>{$\left(X : \CC_0\right) \times \Set^{H_1(X)}$} \\
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$\boxed{\Ty : (\Gamma : \Con) \to \Set}$ & $\CC_2 := $&
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\only<1>{$\left[X_\Con, \left(X_\Ty(\Gamma)\right)_{\Gamma \in X_\Con}\right]$}
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\only<2>{$\left[X_\Con : \Set, X_\Ty : \Set^{X_\Con}\right]$}
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\only<3>{$\left(X_\Con : \CC_1\right) \times \left(\Set^{X_\Con}\right)$}
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\only<4>{$\left(X : \CC_1\right) \times \Set^{H_2(X)}$} \\
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$\boxed{\Tm : (\Delta : \Con) \to (A : \Ty\;\Delta) \to \Set}$ & $\CC_3 :=$&
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\only<1>{$\left[X_\Con, \left(X_\Ty(\Gamma)\right)_{\Gamma \in X_\Con},\right.$}
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\only<2>{$\left[X_\Con : \Set, X_\Ty : \Set^{X_\Con},\right.$}
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\only<3>{$\left((X_\Con,X_\Ty) : \CC_2\right) \times$}
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\only<4>{$\left(X : \CC_2\right) \times \Set^{H_3(X)}$} \\ &&
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\only<1>{$\left.\left(\left(X_\Tm(\Delta,A)\right)_{A \in \Ty(\Delta)}\right)_{\Delta \in X_\Con} \right]$}
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\only<2>{\quad$\left.X_\Tm : \Set^{\prod_{\Delta:X_\Con}X_\Ty(\Delta)}\right]$}
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\only<3>{\quad$\left(\Set^{\prod_{\Delta:X_\Con}X_\Ty(\Delta)}\right)$}
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\end{tabular}
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\pause[4]
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\[\begin{array}{rcl}
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H_1(\bullet) &=& 1_\Set \\
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H_2(X_\Con) &=& X_\Con \\
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H_3(X_\Con,X_\Ty) &=& \displaystyle\prod_{\Delta:X_\Con}X_\Ty(\Delta)
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\end{array}\]
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\end{frame}
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\begin{frame}{Category of Models of transformed GAT}
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\[
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\begin{array}{|c|}
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\hline
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\mathcal{O} : \Set \\
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\El : \mathcal{O} \to \Set \\
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\hline
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\end{array}
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\]
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\[
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\BB_0 := \left(X_\UU : \Set, X_\El : \Set^{X_\UU}\right)
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\]
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\pause
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\begin{center}
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\begin{tabular}{ll}
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$X_\UU$:& Sorts \\
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$X_\El(o)$:& Objects of sort $o$\\
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\end{tabular}
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\end{center}
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\end{frame}
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\begin{frame}{Adding transformed sort declarations}
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\begin{center}
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\begin{tabular}{ll}
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$X_\UU$:& Sorts \\
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$X_\El(o)$:& Objects of sort $o$\\
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\end{tabular}
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\end{center}
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\begin{center}
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\renewcommand\arraystretch{1.4}
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\begin{tabular}{lrp{0.4\textwidth}}
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$\boxed{\mathcal{O} : \Set\quad\El : \mathcal{O} \to \Set}$ & $\BB_0 =$ &
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$(X_\UU,X_\El)$ \\
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$\boxed{\Con : \mathcal{O}}$ & $\Cstr_\Con :$ &
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\only<1>{$X_\UU$}
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\only<2>{$H_1F_0(X) \to X_\UU$} \\
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$\boxed{\Ty : (\Gamma : \underline{\Con}) \to \mathcal{O}}$ & $\Cstr_\Ty :$&
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\only<1>{$\left(\Gamma \in X_\El(\Cstr_\Con)\right) \to X_\UU $}
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\only<2>{$H_2F_1(X,\Cstr_\Con) \to X_\UU$} \\
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$\boxed{\Tm : (\Delta : \underline{\Con}) \to (A : \underline{\Ty\;\Delta}) \to \mathcal{O}}$ & $\Cstr_\Tm : $ &
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\only<1>{\rule[6ex]{0pt}{0pt}\renewcommand\arraystretch{0.9}$\begin{array}{c}\left(\Delta \in X_\El(\Cstr_\Con)\right) \to\\ \left(A \in X_\El(\Cstr_\Ty(\Delta))\right) \to\\ X_\UU\end{array}$}
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\only<2>{$H_3F_2(X,\Cstr_\Con,\Cstr_\Ty) \to X_\UU$}
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\end{tabular}
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\end{center}
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\end{frame}
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\begin{frame}{Constructing the functors}
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\[
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\begin{array}{l|l}
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Y : \mathbf{\CC_3} & X : \mathbf{\BB_3} \\\hline
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& X_\UU : \Set \quad X_\El : \Set^{X_\UU}\\
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Y_\Con : \Set & \Cstr_\Con : X_\UU \\
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\left(Y_\Ty(\Gamma)\right)_{\Gamma \in Y_\Con} &
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\Cstr_\Ty : H_2 F_{1} (X,\Cstr_\Con) \to X_\UU \\
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\left(\left(Y_\Tm(\Delta,A)\right)_{A \in Y_\Ty(\Delta)}\right)_{\Delta \in Y_\Con} &
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\Cstr_\Tm : H_3 F_{2} (X,\Cstr_\Con,\Cstr_\Ty) \to X_\UU \\
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\end{array}
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\]
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\begin{center}
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\begin{tabular}{ll}
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$X_\UU$:& Sorts \\
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$X_\El(o)$:& Objects of sort $o$\\
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\end{tabular}
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\end{center}
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\end{frame}
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\begin{frame}{Constructing $G_3$}
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\only<1>{
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\[\begin{array}{ccl}
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X_\UU & = & \text{«sorts»}\\
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X_\El(o) & = & \text{«objects of sort $o$»}
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\end{array}\]
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}
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\pause
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\[\begin{array}{ccccccc}
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X_\UU & = &
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1 & \oplus &
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Y_\Con & \oplus&
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\displaystyle\coprod_{\Delta \in Y_\Con}Y_\Ty(\Delta) \\
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X_\El(\inj_1(\star)) & = &
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Y_\Con &&&&\\
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X_\El(\inj_2(\Gamma)) & = &
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&&Y_\Ty(\Gamma) &&\\
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X_\El(\inj_3(\Delta,A)) & = &
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&&&& Y_\Tm(\Delta,A)\\
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\end{array}\]
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\pause
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\[\begin{array}{lcl}
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\Cstr_\Con &=& \inj_1(\star)\\
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\Cstr_\Ty(\Gamma) &=& \inj_2(\Gamma) \\
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\Cstr_\Tm(\Delta,A) &=& \inj_3(\Delta,A)
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\end{array}\]
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\pause
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\begin{remark}
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All sorts of $X_\UU$ are reached by some $\Cstr$
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\end{remark}
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\end{frame}
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\begin{frame}{Constructing $F_3$}
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\renewcommand\arraystretch{1.8}
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\[
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\begin{array}{l|l}
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X : \mathbf{\BB_3} & Y = F_3(X): \mathbf{\CC_3}\\\hline
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X_\UU : \Set\quad X_\El : \Set^{X_\UU} &\\
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\Cstr_\Con : X_\UU & Y_\Con =
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\uncover<2->{\ensuremath{X_\El(\Cstr^X_\Con)}}\\
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\Cstr_\Ty : H_2 F_{1} (X,\Cstr_\Con) \to X_\UU &
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Y_\Ty(\Gamma) =
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\uncover<3->{\ensuremath{X_\El(\Cstr^X_\Ty(\Gamma))}}\\
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\Cstr_\Tm : H_3 F_{2} (X,\Cstr_\Con,\Cstr_\Ty) \to X_\UU &
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Y_\Tm(\Delta,A) =
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\uncover<4->{\ensuremath{X_\El(\Cstr^X_\Tm(\Delta,A))}} \\
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\end{array}
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\]
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\pause[5]
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\begin{remark}
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Each object of $Y$ are associated by $X_\El$ to some $\Cstr$
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\end{remark}
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\end{frame}
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\begin{frame}{Adjunction $F \vdash G$}
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\[
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\Hom_{\BB_3}\left(G_3Y,X\right) \simeq \Hom_{\CC_3}\left(Y,F_3X\right)
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\]
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\pause
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\begin{remark}
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All sorts of $G_3Y$ are reached by some $\Cstr$ of $G_3Y$
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\uncover<3>{\ding{220}$\Hom_{\BB_3}\left(G_3Y,X\right)$ transforms constructible into constructible}
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Each object of $F_3X$ are associated by $X_\El$ to some $\Cstr$ of $X$
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\uncover<3>{\ding{220}$\Hom_{\CC_3}\left(Y,F_3X\right)$ transforms constructible into constructible}
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\end{remark}
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\end{frame}
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\section{Conclusion}
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\begin{frame}{Conclusion}
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\begin{center}
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\hspace{2ex}$\CC$ \hspace{3.5cm} $\BB$
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\vspace{.5cm}
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\includesvg[scale=.4]{graphs/diagrammeFG.svg}
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\end{center}
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\end{frame}
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\begin{frame}{Future work}
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\begin{itemize}
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\item Complete GAT (term constructors + equalities)
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\item Proof Assistant Formalization
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\item $S_i$ non-direct
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\end{itemize}
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\end{frame}
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\begin{frame}
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\begin{center}
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\Large Thank you for your attention
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\end{center}
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\end{frame}
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\appendix
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\begin{frame}
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\[\begin{array}{lcl}
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F_3G_3(Y)_\Con &=& G_3(Y)_p^{-1}(\{\Cstr^{G_3(Y)}_\Con\})\\
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&=& G_3(Y)_p^{-1}(\{\inj_1 \star\}) \\
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&=& Y_\Con
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\end{array}\]
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and
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\[\begin{array}{lcl}
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F_3G_3(Y)_\Ty(\Gamma) &=& G_3(Y)_p^{-1}(\{\Cstr^{G_3(Y)}_\Ty(\Gamma)\})\\
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&=& G_3(Y)_p^{-1}(\{\inj_2 \Gamma\}) \\
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&=& \operatorname{proj}_1^{-1}(\Gamma) \\
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&=& \left\{(\Gamma',A) \in \coprod_{\Gamma' \in Y_\Con}Y_\Ty(\Gamma') \middle| \Gamma' = \Gamma\right\}\\
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&\simeq& Y_\Ty(\Gamma)
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\end{array}\]
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and finally, with the same method, we get that
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\[
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F_3G_3(Y)_\Tm(\Delta,A) \simeq Y_\Tm(\Delta,A)
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\]
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\end{frame}
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\begin{frame}{Structure of the global proof}
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\begin{itemize}
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\item Categories $\CC_i$ \quad $\BB_i$
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\item Functors $F_i : \BB_i \to \CC_i : G_i$
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\item Adjunction $F_i \vdash G_i$
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\item Forgetful functor $R_{i-1}^i : \BB_i \to \BB_{i-1}$
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\item Operator $\tl^i : \BB_i \times \BB_0 \to \BB_i$ \quad
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$\inj_1^i : X \to X \tl^i Y$ \quad
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$\inj_2^i : Y \to R_0^i(X \tl^i Y)$
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\item Coreflection $F_iG_i \cong \Id_{\CC_i}$
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\item Isomorphism $F_i\inj_1^i$
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\item Isomorphism $(R_{i-1}^i X) \tl^{i-1} Y \to R_{i-1}^i (X \tl^i Y)$
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\end{itemize}
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\end{frame}
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\begin{frame}{Fibration of $\CC_i$}
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\end{frame}
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\begin{frame}{$S_i$ from syntax}
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\end{frame}
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\end{document}
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