Work on slides

2024-05-31 07:28:34 +02:00 · 2024-01-11 13:38:32 +01:00 · 2024-01-11 13:38:32 +01:00 · 7f3330f45c
commit 7f3330f45c
parent 202d130d33
7 changed files with 145 additions and 111 deletions
--- a/.gitignore
+++ b/.gitignore
@ -51,3 +51,4 @@ slides/*.pdf
 _region_.tex
 *.xdv
 thesis/_minted-main/
 slides/_minted-main/
--- a/slides/.vscode/settings.json
+++ b/slides/.vscode/settings.json
@ -7,7 +7,9 @@
        "-synctex=1",
        "-interaction=nonstopmode",
        "-file-line-error",
        "-shell-escape",
        "-pdf",
        "-xelatex",
        "-outdir=%OUTDIR%",
        "main.tex"
      ],
--- a/slides/code-examples/example.hs
+++ b/slides/code-examples/example.hs
@ -3,10 +3,11 @@ hd [] = error "empty list"
 hd (x : _) = x
 main :: IO ()
-main = print (hd []::[String])
+main = do
  print (Main.reverse ([1,2,3]::[Int]))
  print (hd []::[String])
 reverse :: [a] -> [a]
-reverse l = rev l []
+reverse = reverseAcc []
  where
-    rev []     a = a
+    reverseAcc = foldl (flip (:))
    rev (x:xs) a = rev xs (x:a)
--- a/slides/main.tex
+++ b/slides/main.tex
@ -24,8 +24,8 @@
 		   ]{styles/beamerthemefau}
 % ----------------------------------------------------------------------------------------
 % Input and output encoding
-\usepackage[T1]{fontenc}
+% \usepackage[T1]{fontenc}
-\usepackage[utf8]{inputenc}
+% \usepackage[utf8]{inputenc}
 % ----------------------------------------------------------------------------------------
 % Language settings
 \usepackage[english]{babel}
@ -36,6 +36,7 @@
 % - We use serif for math environements
 % - isomath is used for upGreek letters
 % ----------------------------------------------------------------------------------------
 \usepackage{fvextra}
 \usepackage{isomath}
 \usefonttheme[onlymath]{serif}
 \usepackage{exscale}
@ -49,7 +50,7 @@
 % ========================================================================================
 % Setup for Titlepage
 % ----------------------------------------------------------------------------------------
-\title{Implementing Notions of Partiality and Delay\\ in Agda}
+\title{Implementing Categorical Notions of Partiality and Delay in Agda}
 \subtitle{Subtitle}
 \author[L. Vatthauer]{
 Leon Vatthauer%\inst{1}
@ -138,71 +139,18 @@ Leon Vatthauer%\inst{1}
 % The main document
 % ------------------------------------------------
 \usepackage{MnSymbol} % for \squaredots
-\usepackage{listings}
+\usepackage{minted}
-\lstset{mathescape}
+\setminted[agda]{
-
+	linenos=true,
 \usepackage{xcolor}
 \definecolor{codegray}{rgb}{0.5,0.5,0.5}
 \definecolor{string}{HTML}{79731B}
 \definecolor{keyword}{HTML}{447A59}
 \definecolor{background}{HTML}{E6E6E6}
 \definecolor{error}{HTML}{9B0511}
 \definecolor{agda-name}{HTML}{3b31f9}
 \definecolor{agda-keyword}{HTML}{fc970a}
 \definecolor{agda-constructor}{HTML}{08aa20}
 \lstdefinestyle{mystyle}{
    backgroundcolor=\color{background},
    % commentstyle=\color{codegreen},
    % keywordstyle=\color{keyword},
    numberstyle=\tiny\color{codegray},
    stringstyle=\color{string},
    basicstyle=\ttfamily\small,
    breakatwhitespace=false,         
 	breaklines=true,
-    captionpos=b,                    
+	encoding=utf8,
-    keepspaces=true,                 
+	fontsize=\small,
-    numbers=left,                    
+	% frame=lines
    numbersep=5pt,                  
    showspaces=false,                
    showstringspaces=false,
    showtabs=false,                  
    tabsize=2
 }
 \lstdefinelanguage{myhaskell}{
 	keywords=[1]{
 		where
 	},
 	keywordstyle=[1]\color{agda-keyword},
 	keywords=[2]{
 		error
 	},
 	keywordstyle=[2]\color{error},
 	keywords=[3]{
 		head, reverse, rev
 	},
 	keywordstyle=[3]\color{agda-name},
 	morestring=[b]"
 }
 \usepackage{multicol}
-\lstdefinelanguage{myagda}{
+\usepackage{fontspec}
-	keywords=[1]{
+\setmonofont{Noto Sans Mono}
 		data, where
 	},
 	keywordstyle=[1]\color{agda-keyword},
 	keywords=[2]{
 		Delay, Set, foldl, Colist, reverse, reverseAcc, run_for_steps, run, for, steps, fin-colist, inf-colist, never, head, List, Maybe
 	},
 	keywordstyle=[2]\color{agda-name},
 	keywords=[3]{
 		now, later, zero, suc, just, nothing, nil, cons
 	},
 	keywordstyle=[3]\color{agda-constructor}
 }
 \lstset{style=mystyle}
 \usepackage{lmodern}
@ -236,6 +184,8 @@ at (#3) {#4};
 \end{frame}
 \input{sections/00_intro.tex}
 \input{sections/01_abstracting.tex}
 \input{sections/02_goals.tex}
 % Stylized outline
 %\begin{frame}[title]{-}
--- a/slides/sections/00_intro.tex
+++ b/slides/sections/00_intro.tex
@ -1,27 +1,28 @@
 \section{Partiality in Type Theory}
 \begin{frame}[t, fragile]{Partiality in Haskell}{}
-  \begin{itemize}[<+->]
+  \begin{itemize}
-    \item Haskell allows users to define arbitrary partial functions, some can be spotted easily by their definition:
+    \item<1-> Haskell allows users to define arbitrary partial functions, some can be spotted easily by their definition:
    \vskip 1cm
-    \begin{lstlisting}[language=myhaskell, linewidth=12cm]
+    \begin{minted}{agda}
 head :: [a] -> a
 head []     = error "empty list"
 head (x:xs) = x
-\end{lstlisting}
+\end{minted}
-      \mycallout<3->{21, 1.5}{
+      \mycallout<2->{21, 1.5}{
        ghci> head []\\
        *** Exception: empty list\\
        CallStack (from HasCallStack):\\
        error, called at example.hs:2:9 in main:Main
      }
-    \item
+    \item<3->
    others might be more subtle:
    \vskip 1cm
-    \begin{lstlisting}[language=myhaskell, linewidth=12cm]
+    \begin{minted}{agda}
-reverse l = rev l []
+reverse :: [a] -> [a]
 reverse = reverseAcc []
  where
-  rev []     a = a
+    reverseAcc = foldl (flip (:))
-  rev (x:xs) a = rev xs (x:a)
+\end{minted}
 \end{lstlisting}
    \mycallout<4->{21, 2}{
    ghci> ones = 1 : ones\\
@ -30,7 +31,6 @@ where
    }
  \end{itemize}
 % TODO right of this add error bubble that shows `reverse ones`
 \end{frame}
 \begin{frame}[t, fragile]{Partiality in Agda}{The Maybe Monad}
@ -38,59 +38,59 @@ In Agda every function has to be total and terminating, so how do we model parti
 \begin{itemize}[<+->]
  \item Simple errors can be modelled with the maybe monad
-  \begin{lstlisting}[linewidth=14cm, language=myagda]
+  \begin{minted}{agda}
 data Maybe (A : Set) : Set where
-  just : A $\rightarrow$ Maybe A
+  just : A → Maybe A
  nothing : Maybe A
-\end{lstlisting}
+\end{minted}
  for head we can then do:
-  \begin{lstlisting}[linewidth=14cm, language=myagda]
+  \begin{minted}{agda}
-head : $\forall$ A $\rightarrow$ List A $\rightarrow$ Maybe A
+head : ∀ A → List A → Maybe A
 head nil         = nothing
 head (cons x xs) = just x
-\end{lstlisting}
+\end{minted}
-  \item What about \lstinline|reverse|?
+  \item What about \mintinline{agda}|reverse|?
 \end{itemize}
 \end{frame}
 \begin{frame}[t, fragile]{Partiality in Agda}{Capretta's Delay Monad}
  \begin{itemize}[<+->]
    \item Capretta's Delay Monad is a \textbf{coinductive} data type whose inhabitants can be viewed as suspended computations. 
-    \begin{lstlisting}[linewidth=20cm, language=myagda]
+    \begin{minted}{agda}
 data Delay (A : Set) : Set where
-  now : A $\rightarrow$ Delay A
+  now : A → Delay A
-  later : $\infty$ (Delay A) $\rightarrow$ Delay A
+  later : ∞ (Delay A) → Delay A
-\end{lstlisting}
+\end{minted}
    \item The delay datatype contains a constant for non-termination:
-    \begin{lstlisting}[linewidth=20cm, language=myagda]
+    \begin{minted}{agda}
 never : Delay A
-never = later ($\sharp$ never)
+never = later (♯ never)
-\end{lstlisting}
+\end{minted}
    \item and we can define a function for \textit{running} a computation (for some amount of steps):
-    \begin{lstlisting}[linewidth=20cm, language=myagda]
+    \begin{minted}{agda}
-run_for_steps : Delay A $\rightarrow$ $\mathbb{N}$ $\rightarrow$ Delay A
+run_for_steps : Delay A → ℕ → Delay A
 run now   x for n     steps = now x
 run later x for zero  steps = later x
-run later x for suc n steps = run $\flat$ x for n steps
+run later x for suc n steps = run ♭ x for n steps
-\end{lstlisting}
+\end{minted}
  \end{itemize}
 \end{frame}
 \begin{frame}[c, fragile]{Partiality in Agda}{Reversing (possibly infinite) lists}
 \centering
-\begin{lstlisting}[language=myagda]
+\begin{minted}{agda}
-foldl : $\forall$ {A B : Set} $\rightarrow$ (A $\rightarrow$ B $\rightarrow$ A) $\rightarrow$ A $\rightarrow$ Colist B $\rightarrow$ Delay A
+foldl : ∀ {A B : Set} → (A → B → A) → A → Colist B → Delay A
 foldl c n []       = now n
-foldl c n (x $\squaredots$ xs) = later ($\sharp$ foldl c (c n x) ($\flat$ xs))
+foldl c n (x ∷ xs) = later (♯ foldl c (c n x) (♭ xs))
-reverse : $\forall$ {A : Set} $\rightarrow$ Colist A $\rightarrow$ Delay (Colist A)
+reverse : ∀ {A : Set} → Colist A → Delay (Colist A)
 reverse {A} = reverseAcc []
  where
-    reverseAcc : Colist A $\rightarrow$ Colist A $\rightarrow$ Delay (Colist A)
+    reverseAcc : Colist A → Colist A → Delay (Colist A)
-    reverseAcc = foldl ($\lambda$ xs x $\rightarrow$ x $\squaredots$ ($\sharp$ xs))
+    reverseAcc = foldl (λ xs x → x ∷ (♯ xs))
-\end{lstlisting}
+\end{minted}
 \end{frame}
--- a/slides/sections/01_abstracting.tex
+++ b/slides/sections/01_abstracting.tex
@ -0,0 +1,56 @@
 \section{Categorical Notions of Partiality}
 % \begin{frame}[t, fragile]{Classifying Partiality Monads}
 % A partiality monad should have the following properties:
 %   \begin{itemize}
 %     \item The following two programs should yield equal results:
 %     \begin{multicols}{2}
 %       \begin{minted}{haskell}
 %         do x <- p
 %            y <- q
 %            return (x, y)
 %         \end{minted}
 %         \begin{minted}{haskell}
 %         do y <- q
 %            x <- p
 %            return (x, y)
 %       \end{minted}
 %     \end{multicols}
 %     where p and q are (partial) computations.
 %   \end{itemize}
 % \end{frame}
 \begin{frame}[t, fragile]{Capturing Partiality Categorically}
 \begin{itemize}
  \item moggi denotational semantics (values A, computations TA)
  \item restriction categories
  \item equational lifting monads
 \end{itemize}
 \end{frame}
 \begin{frame}[t, fragile]{The Maybe Monad}
 \begin{itemize}
  \item Short definition
  \item is equational lifting monad
 \end{itemize}
 \end{frame}
 \begin{frame}[t, fragile]{The Delay Monad}
 \begin{itemize}
  \item Definition
  \item Strong-Bisimilarity
  \item Weak-Bisimilarity (Monad?)
 \end{itemize}
 \end{frame}
 \begin{frame}[t, fragile]{Iteration}
 \begin{itemize}
  \item Elgot-Algebras
  \item Free Elgot-Algebras yield monad K
  \item K is equational lifting
  \item K instantiates to maybe and delay
 \end{itemize}
 \end{frame}
--- a/slides/sections/02_goals.tex
+++ b/slides/sections/02_goals.tex
@ -0,0 +1,24 @@
 \section{Implementation in Agda}
 \begin{frame}[t, fragile]{Goals}
  \begin{itemize}
    \item Formalize delay monad (categorically as terminal coalgebra) + properties
    \item Formalize K + properties
    \item Case study on Setoids
  \end{itemize}
 \end{frame}
 \begin{frame}[t, fragile]{Category theory in Agda}
  agda-categories
 \end{frame}
 \begin{frame}[t, fragile]{What I managed to show}
  TODO
 \end{frame}
 \begin{frame}[t, fragile]{Further work}
 \begin{itemize}
  \item Show that $\tilde{D}$ is monad (under conditions)
  \item Show that $K \cong \tilde{D}$ (under conditions)
 \end{itemize}
 \end{frame}