781 lines
19 KiB
TeX
781 lines
19 KiB
TeX
\documentclass{beamer}
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\usepackage[utf8]{inputenc}
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\usepackage{formal-grammar}
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\usepackage[dvipsnames]{xcolor}
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\usepackage{mathpartir}
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\usepackage{stmaryrd}
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%\usepackage{minted}
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%\usemintedstyle{tango}
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\usepackage{listings}% http://ctan.org/pkg/listings
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\lstset{
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basicstyle=\ttfamily,
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mathescape
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}
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\newcommand{\metavariable}[1]{\textcolor{teal}{#1}}
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\newcommand{\typeterminal}[1]{\textcolor{brown}{#1}}
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\newcommand{\exprterminal}[1]{\textcolor{Sepia}{#1}}
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\title{A functional core calculus with ladder-types}
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%\date[ISPN ’80]{27th International Symposium of Prime Numbers}
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\author[Euclid]{Michael Sippel \texttt{michael.sippel@mailbox.tu-dresden.de}\inst{1}}
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\institute{\inst{1} Technische Universität Dresden}
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\usetheme{ccc}
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\begin{document}
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\begin{frame}
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\titlepage
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\end{frame}
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\begin{frame}[t, fragile]
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\frametitle{Type Systems}
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\framesubtitle{Safety <> Flexibility}
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\centering
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\includegraphics[width=0.9\textwidth]{intro.pdf}
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\pause
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\begin{block}{type information in comments}
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\begin{lstlisting}
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/* this is an angle in degrees */
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double hue = 156.4;
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\end{lstlisting}
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\end{block}
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\end{frame}
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\begin{frame}[t, fragile]{Example - Image Processing}
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\begin{lstlisting}
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image-read :: FilePath -> [Color]
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image-write :: FilePath -> [Color] -> ()
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image-mix :: $\mathbb{R}$ -> [Color] -> [Color] -> [Color]
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image-saturate :: $\mathbb{R}$ -> [Color] -> [Color]
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let im1 = image-read "in1.png"
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let im2 = image-read "in2.png"
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let im3 = image-mix 0.5
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im1
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(image-saturate 0.8 im2)
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image-write "out.png" im3
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\end{lstlisting}
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\end{frame}
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\begin{frame}{Performance Checklist}
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\framesubtitle{(singlethreaded)}
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\begin{enumerate}
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\item<1-> algorithmic
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\begin{itemize}
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\item choose appropriate data structures\\
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(reduce complexity in frequent cases)
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\item identify special cases
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\end{itemize}
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\item<2-> implementation detail:
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\begin{itemize}
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\item optimize memory bottleneck
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\begin{itemize}
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\item improve cache \& bus efficiency with compact representations
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\item<3-> Synchronize locality in access order and memory layout.
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(elements accessed in succession shall be close in memory,
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AoS vs SoA)
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\item<4-> \(\rightarrow\) De-/Encode Overhead
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vs. Fetch-Overhead,\\
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account for machine specific cache-sizes
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\end{itemize}
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\item
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\item<6-> use SIMD instructions
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\item<7-> interfacing with kernels running on accelerator devices
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\end{itemize}
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\end{enumerate}
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\end{frame}
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\begin{frame}[t, fragile]{Example - Image Processing}
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\begin{lstlisting}
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image-read :: FilePath -> [Color]
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image-write :: FilePath -> [Color] -> ()
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image-mix :: $\mathbb{R}$ -> [Color] -> [Color] -> [Color]
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image-saturate :: $\mathbb{R}$ -> [Color] -> [Color]
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let im1 = image-read "in1.png"
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let im2 = image-read "in2.png"
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let im3 = image-mix 0.5
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im1
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(image-saturate 0.8 im2)
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image-write "out.png" im3
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\end{lstlisting}
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\end{frame}
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\begin{frame}{Example - Image Processing}
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\framesubtitle{More Types}
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\begin{itemize}
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\item \texttt{ColorRGBu8}
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\item \texttt{ColorRGBf32}
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\item \texttt{ColorHSVu8}
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\item \texttt{ColorHSVf32}
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\end{itemize}
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\end{frame}
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\begin{frame}[t, fragile]{Example - Image Processing}
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\framesubtitle{More Types}
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\begin{lstlisting}
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image-read :: FilePath -> [ColorRGBu8]
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image-write :: FilePath -> [ColorRGBu8] -> ()
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image-mix :: f32 -> [ColorRGBf32] -> [ColorRGBf32] -> [ColorRGBf32]
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image-saturate:: f32->[ColorHSVf32]->[ColorHSVf32]
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let im1 = image-read "in1.png"
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let im2 = image-read "in2.png"
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let im3 = image-mix 0.5
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im1
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(image-saturate 0.8 im2)
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image-write "out.png" im3
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\end{lstlisting}
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\end{frame}
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\begin{frame}[t, fragile]{Example - Image Processing}
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\framesubtitle{AoS vs SoA}
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\begin{verbatim}
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[cacheline][cacheline][cacheline]
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\end{verbatim}
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\begin{verbatim}
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[RGBRGBRG][BRGBRGBR][GBRGBRGB]
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\end{verbatim}
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\begin{verbatim}
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[HSVHSVHS][VHSVHSVH][SVHSVHSV]
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\end{verbatim}
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\begin{verbatim}
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[HHHHHHHH][SSSSSSSS][VVVVVVVV]
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\end{verbatim}
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\end{frame}
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\begin{frame}{Example - Image Processing}
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\framesubtitle{OpenGL Image Formats}
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\begin{itemize}
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\item \texttt{GL\_R3\_G3\_B2}
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\item \texttt{GL\_RGB10\_A2}
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\item \texttt{GL\_R11F\_G11F\_B10F}
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\item \texttt{GL\_SRGB8\_ALPHA8}
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\item \ldots
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\end{itemize}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[width=0.5\textwidth]{sea-of-types/target/sea-of-types-0-bytes.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[width=0.5\textwidth]{sea-of-types/target/sea-of-types-1-ieee754.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.5\textheight]{sea-of-types/target/sea-of-types-2-real.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.5\textheight]{sea-of-types/target/sea-of-types-3-real.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-4-degrees.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-5-turns.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-6-radians.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-7-angle.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-8-hue.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[height=0.8\textheight]{sea-of-types/target/sea-of-types-9-u8.png}
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\end{frame}
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\begin{frame}{Sea of Types}
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\centering
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\includegraphics[width=\textwidth]{sea-of-types/target/sea-of-types-10-u8.png}
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\end{frame}
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\begin{frame}{Solutions (I): Traits / Typeclasses / Interfaces}
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\centering
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\includegraphics[width=0.5\textwidth]{solution-traits.png}
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\vskip1cm
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\begin{itemize}
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\item \texttt{impl Angle for Degrees \{ \dots \}}
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\item \texttt{impl Angle for Turns \{ \dots \}}
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\item \texttt{impl Angle for Radians \{ \dots \}}
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\end{itemize}
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\end{frame}
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\begin{frame}{Solutions (II): Wrapper structs / newtype}
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\centering
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\includegraphics[width=0.5\textwidth]{solution-wrappers.png}
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\vskip1cm
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\begin{itemize}
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\item \texttt{struct Degrees\{ value: f32 \}}
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\item \texttt{struct Turns\{ value: f32 \}}
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\item \texttt{struct Radians\{ value: f32 \}}
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\end{itemize}
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\end{frame}
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\begin{frame}{Solutions (II): Wrapper structs / newtype}
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\centering
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\includegraphics[width=0.5\textwidth]{solution-wrappers.png}
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\vskip1cm
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\begin{itemize}
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\item \texttt{struct Degrees<T: \(\mathbb{R}\)>\{ value: T \}}
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\item \texttt{struct Turns<T: \(\mathbb{R}\)>\{ value: T \}}
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\item \texttt{struct Radians<T: \(\mathbb{R}\)>\{ value: T \}}
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\end{itemize}
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\end{frame}
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\begin{frame}{Coercions: (In-)Coherence with Transitivity}
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\begin{itemize}
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\item<1-> Common example: coerce \texttt{Int -> Float}
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(subsumption \(\mathbb{N} \subset \mathbb{R}\))
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\begin{itemize}
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\item \texttt{Int -> Float}
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\item \texttt{Int -> String}
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\item \texttt{Float -> String}
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\end{itemize}
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\item<2-> transitivity creates two extensionally \emph{different} coercion paths:
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\begin{itemize}
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\item \texttt{Int -> String} (3 -> "3")
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\item \texttt{Int -> Float -> String} (3 -> "3.0")
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\end{itemize}
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\item<3-> Subsumptive interpretation is misleading!
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\item<3-> \texttt{Int -> Float} is not as unambiguous as it might seem.
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\begin{itemize}
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\item value ranges (e.g. map int to unit interval [0,1])
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\item multiple quantization functions (linear, exponential, \dots)
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\end{itemize}
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\end{itemize}
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\end{frame}
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\begin{frame}{Related Work}
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\begin{itemize}
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\item TODO
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\item cite
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\item some
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\item stuff
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\end{itemize}
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\end{frame}
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\begin{frame}{Ladder Types}
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\begin{block}{Intuition}
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Encode "represented-as" relation into type terms
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\end{block}
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\begin{block}{}
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\( \tau_1 \sim \tau_2 \) reads "\(\tau_1\) represented as \(\tau_2\)"
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\end{block}
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\begin{example}\(
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Color \sim sRGB
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\sim HSV \sim \langle \text{Vec3} \quad \mathbb{R}_{[0,1]}
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\sim \langle \text{QuantizeLinear} \quad 256 \rangle
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\sim \mathbb{Z}_{256} \sim \text{machine.UInt8} \sim \text{Byte}
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\rangle
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\sim \text{[Byte; 3]}
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\)\end{example}
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\end{frame}
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\begin{frame}{Morphisms}
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\begin{block}{Intuition}
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Transform between semantically equivalent representations of the same abstract concept
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\end{block}
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\begin{block}{Type}
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\( \tau \sim \tau_1 \rightarrow_\text{morph} \tau \sim \tau_2 \)
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\end{block}
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\begin{example}\(
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Angle \sim Degrees \sim \mathbb{R}
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\rightarrow_\text{morph}
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Angle \sim Radians \sim \mathbb{R}
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\)\end{example}
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\end{frame}
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\begin{frame}{Morphisms}
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\begin{block}{Morphism Condition}
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Assume\\
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\(\metavariable{m_\sigma} : \typeterminal{\metavariable{\sigma} \sim \metavariable{\sigma_1} \rightarrow_\text{morph} \metavariable{\sigma} \sim \metavariable{\sigma_2}}\)\\
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\(\metavariable{m_\tau} : \typeterminal{\metavariable{\tau} \sim \metavariable{\tau_1} \rightarrow_\text{morph} \metavariable{\tau} \sim \metavariable{\tau_2}}\)\\
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\(\metavariable{f_1} : \typeterminal{\metavariable{\sigma} \sim \metavariable{\sigma_1} \rightarrow \metavariable{\tau} \sim \metavariable{\tau_1} }\)\\
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\(\metavariable{f_2} : \typeterminal{\metavariable{\sigma} \sim \metavariable{\sigma_2} \rightarrow \metavariable{\tau} \sim \metavariable{\tau_2} }\)\\
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\vskip1cm
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then it holds that:\\
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\(\forall x:\typeterminal{\metavariable{\sigma}\sim\metavariable{\sigma_1}},\quad
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\metavariable{m_\tau}(\metavariable{f_1} x) = \metavariable{f_2} (\metavariable{m_\sigma} x) \)
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\vskip-4.5cm
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\hfill\includegraphics[width=0.3\textwidth]{morphisms.png}
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\end{block}
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\end{frame}
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\begin{frame}{Extending System F}
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\small
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\begin{grammar}
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\firstcase{ T }{
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\metavariable{\sigma}
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}{Base Type}
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\otherform{
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\metavariable{\alpha}
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}{Type Variable}
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\otherform{
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\typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \nonterm{T}
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}{Universal Type}
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\otherform{
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\typeterminal{<} \nonterm{T} \quad \nonterm{T} \typeterminal{>}
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}{Specialized Type}
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\otherform{
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\nonterm{T} \quad \typeterminal{\rightarrow} \quad \nonterm{T}
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}{Function Type}
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\otherform{
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\nonterm{T} \quad \typeterminal{\rightarrow_\text{morph}} \quad \nonterm{T}
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}{Morphism Type}
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\otherform{
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\nonterm{T} \quad \typeterminal{\sim} \quad \nonterm{T}
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}{Ladder Type}
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$$\\$$
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\firstcase{ E
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% T_\selexpr
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}
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{ \metavariable{x}
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} {Variable}
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\otherform{
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\exprterminal{let} \quad \metavariable{x} \quad \exprterminal{=} \quad
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\nonterm{ E }
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\quad \exprterminal{in} \quad
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\nonterm{ E }
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}{Variable Binding}
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\otherform{
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$$ \exprterminal{\Lambda} \metavariable{\alpha}
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\quad \exprterminal{\mapsto} \quad $$
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\nonterm{ E }
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}{Type Abstraction}
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\otherform{
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$$ \exprterminal{\lambda} \metavariable{x} $$
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\exprterminal{:} \nonterm{ T }
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\quad $$\exprterminal{\mapsto}$$ \quad
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\nonterm{ E }
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}{Value Abstraction}
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\otherform{
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$$ \exprterminal{\lambda} \metavariable{x} $$
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\exprterminal{:} \nonterm{ T }
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\quad $$\exprterminal{\mapsto_\text{morph}}$$ \quad
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\nonterm{ E }
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}{Value Morphism}
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\otherform{
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\nonterm{ E }
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\quad
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\nonterm{ T }
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}{Type Application}
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\otherform{
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\nonterm{ E }
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\quad
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\nonterm{ E }
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}{Value Application}
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\otherform{
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\nonterm{ E }
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\quad
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\exprterminal{as}
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\quad
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\nonterm{ T }
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}{Ascension}
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\otherform{
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\nonterm{ E }
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\quad
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\exprterminal{des}
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\quad
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\nonterm{ T }
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}{Descension}
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\end{grammar}
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\end{frame}
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\begin{frame}{Typing}
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\begin{definition}[Typing Relation]
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\begin{mathpar}
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\inferrule[T-App]{
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\Gamma \vdash \metavariable{f} : \metavariable{\sigma} \typeterminal{\rightarrow} \metavariable{\tau}\\
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\Gamma \vdash \metavariable{a} : \metavariable{\sigma'}\\
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\Gamma \vdash \metavariable{\sigma'} \leadsto \metavariable{\sigma}
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}{
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\Gamma \vdash (\metavariable{f} \quad \metavariable{a}) : \metavariable{\tau}
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}
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\end{mathpar}
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\end{definition}
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\end{frame}
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\begin{frame}{Morphism Graph}
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||
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\begin{definition}[Morphism Paths]
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\label{def:pathrules}
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\begin{mathpar}
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\inferrule[M-Sub]{
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\metavariable{\tau} \leq \metavariable{\tau'}
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}{
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\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
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}
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\inferrule[M-Single]{
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(\metavariable{h} : \metavariable{\tau} \typeterminal{\rightarrow_\text{morph}} \metavariable{\tau'}) \in \Gamma
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}{
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\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
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}
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\inferrule[M-Chain]{
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\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}\\
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\Gamma \vdash \metavariable{\tau'} \leadsto \metavariable{\tau''}
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}{
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\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau''}
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||
}
|
||
|
||
\inferrule[M-MapSeq]{
|
||
\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
|
||
}{
|
||
\Gamma \vdash
|
||
\typeterminal{\langle\text{Seq } \metavariable{\tau}\rangle} \leadsto
|
||
\typeterminal{\langle\text{Seq } \metavariable{\tau'}\rangle}
|
||
}
|
||
\end{mathpar}
|
||
\end{definition}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}{Morphism Graph}
|
||
\begin{example}[Morphism Graph]
|
||
\begin{mathpar}
|
||
\small
|
||
\text{Assume }
|
||
\Gamma := \{\\
|
||
\exprterminal{\text{degrees-to-turns}} : \typeterminal{\text{Angle}\sim\text{Degrees}\sim\mathbb{R} \quad \rightarrow_\text{morph} \quad \text{Angle}\sim\text{Turns}\sim\mathbb{R}},\\
|
||
\exprterminal{\text{turns-to-radians}} : \typeterminal{\text{Angle}\sim\text{Turns}\sim\mathbb{R} \quad \rightarrow_\text{morph} \quad \text{Angle}\sim\text{Radians}\sim\mathbb{R}},\\
|
||
\}.
|
||
\end{mathpar}
|
||
\end{example}
|
||
\end{frame}
|
||
|
||
|
||
|
||
\begin{frame}{Morphism Graph}
|
||
\begin{example}[Morphism Graph]
|
||
Then ..
|
||
\small
|
||
\begin{itemize}
|
||
\item \(\Gamma \vdash \typeterminal{\text{Angle}\sim\text{Degrees}\sim\mathbb{R}} \leadsto \typeterminal{\mathbb{R}}\) (by \textsc{M-Sub})
|
||
\item \(\Gamma \vdash \typeterminal{\text{Angle}\sim\text{Degrees}\sim\mathbb{R}} \leadsto \typeterminal{\text{Angle}\sim\text{Radians}\sim\mathbb{R}}\) (by \textsc{M-Chain})
|
||
\item \(\Gamma \vdash \typeterminal{\langle\text{Seq }\text{Angle}\sim\text{Degrees}\sim\mathbb{R}\rangle} \leadsto \typeterminal{\langle\text{Seq }\text{Angle}\sim\text{Radians}\sim\mathbb{R}\rangle}\) (by \textsc{M-MapSeq})
|
||
\end{itemize}
|
||
\end{example}
|
||
\end{frame}
|
||
|
||
|
||
|
||
\begin{frame}{Translation}
|
||
\begin{definition}[Morphism Translation]
|
||
\begin{mathpar}
|
||
\small
|
||
|
||
\Big{\llbracket}
|
||
\inferrule[M-Sub]{
|
||
\metavariable{\tau} \leq \metavariable{\tau'}
|
||
}{
|
||
\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
|
||
}
|
||
\Big{\rrbracket} = \exprterminal{\lambda x:\metavariable{\tau} \mapsto x}
|
||
\and
|
||
|
||
\Big{\llbracket}
|
||
\inferrule[M-Single]{
|
||
(\metavariable{h} : \metavariable{\tau} \typeterminal{\rightarrow_\text{morph}} \metavariable{\tau'}) \in \Gamma
|
||
}{
|
||
\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
|
||
}
|
||
\Big{\rrbracket} = \metavariable{h}
|
||
\and
|
||
|
||
\end{mathpar}
|
||
\end{definition}
|
||
\end{frame}
|
||
|
||
\begin{frame}{Translation}
|
||
\begin{definition}[Morphism Translation (2)]
|
||
\begin{mathpar}
|
||
\small
|
||
\Big{\llbracket}
|
||
\inferrule[M-Chain]{
|
||
C_1 :: \Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}\\
|
||
C_2 :: \Gamma \vdash \metavariable{\tau'} \leadsto \metavariable{\tau''}
|
||
}{
|
||
\Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau''}
|
||
}
|
||
\Big{\rrbracket} = \exprterminal{\lambda \text{x}:\metavariable{\tau} \mapsto}
|
||
\Big{\llbracket} C_2 \Big{\rrbracket}
|
||
\exprterminal{(}\Big{\llbracket} C_1 \Big{\rrbracket} \exprterminal{\text{x})}
|
||
\and
|
||
|
||
|
||
\Big{\llbracket}
|
||
\inferrule[M-MapSeq]{
|
||
C_1 :: \Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}
|
||
}{
|
||
\Gamma \vdash
|
||
\typeterminal{\langle\text{Seq } \metavariable{\tau}\rangle} \leadsto
|
||
\typeterminal{\langle\text{Seq } \metavariable{\tau'}\rangle}
|
||
}
|
||
\Big{\rrbracket} = \exprterminal{\lambda \text{xs}:\typeterminal{\langle\text{Seq }\metavariable{\tau}\rangle} \mapsto}
|
||
\exprterminal{( \text{map}} \Big{\llbracket} C_1 \Big{\rrbracket} \exprterminal{\text{xs})}
|
||
|
||
\end{mathpar}
|
||
\end{definition}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}{Translation}
|
||
\begin{example}[Morphism Translation]
|
||
\begin{mathpar}
|
||
\small
|
||
\Big{\llbracket}
|
||
\inferrule[M-Chain]{
|
||
\ldots
|
||
}{
|
||
\Gamma \vdash \typeterminal{\langle\text{Seq}\quad\text{Angle}\sim\text{Degrees}\sim\mathbb{R}\rangle}\\
|
||
\leadsto \typeterminal{\langle\text{Seq}\quad\text{Angle}\sim\text{Radians}\sim\mathbb{R}\rangle}
|
||
}
|
||
\Big{\rrbracket} =
|
||
\exprterminal{\lambda \text{xs}:\typeterminal{\langle\text{Seq}\quad \text{Angle}\sim\text{Degrees}\sim\mathbb{R} \rangle}}
|
||
\newline
|
||
\exprterminal{\mapsto (map \text{ }(\lambda \text{x}:\metavariable{\tau} \mapsto \text{turns-to-radians } (\text{degrees-to-turns } x)) \text{ } xs) }
|
||
\end{mathpar}
|
||
\end{example}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}{Translation}
|
||
\begin{definition}[Expression Translation]
|
||
Translates a type-derivation tree into a fully expanded expression
|
||
|
||
\begin{mathpar}
|
||
\Big{\llbracket}
|
||
\inferrule[T-App]{
|
||
D_1 :: \Gamma \vdash \metavariable{f} : \metavariable{\sigma} \typeterminal{\rightarrow} \metavariable{\tau}\\
|
||
D_2 :: \Gamma \vdash \metavariable{a} : \metavariable{\sigma'}\\\\
|
||
C :: \Gamma \vdash \metavariable{\sigma'} \leadsto \metavariable{\sigma}
|
||
}{
|
||
\Gamma \vdash (\metavariable{f} \quad \metavariable{a}) : \metavariable{\tau}
|
||
}
|
||
\Big{\rrbracket} =
|
||
\Big{\llbracket}D_1\Big{\rrbracket}
|
||
\exprterminal{(}
|
||
\Big{\llbracket}C\Big{\rrbracket}
|
||
\Big{\llbracket}D_2\Big{\rrbracket}
|
||
\exprterminal{)}
|
||
\end{mathpar}
|
||
\end{definition}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}{Soundness}
|
||
|
||
\begin{lemma}[Morphism generation has correct type]
|
||
\begin{mathpar}
|
||
C :: \Gamma \vdash \metavariable{\tau} \leadsto \metavariable{\tau'}\\
|
||
\Rightarrow \Gamma \vdash \llbracket C \rrbracket : \metavariable{\tau} \typeterminal{\rightarrow_\text{morph}} \metavariable{\tau'}
|
||
\end{mathpar}
|
||
\end{lemma}
|
||
|
||
\begin{lemma}[Expression Translation preserves typing]
|
||
\begin{mathpar}
|
||
D :: \Gamma \vdash \metavariable{e} : \metavariable{\tau}\\
|
||
\Rightarrow \Gamma \vdash \llbracket D \rrbracket : \metavariable{\tau}
|
||
\end{mathpar}
|
||
\end{lemma}
|
||
\end{frame}
|
||
|
||
|
||
|
||
|
||
\begin{frame}{Soundness}
|
||
\begin{theorem}[Preservation]
|
||
\begin{mathpar} \forall \Gamma, \metavariable{e}, \metavariable{\tau},\\
|
||
D :: \Gamma \vdash \metavariable{e} : \metavariable{\tau}\\
|
||
\Rightarrow \llbracket D \rrbracket \rightarrow_{eval} \metavariable{e'} \\
|
||
\Rightarrow \Gamma \vdash \metavariable{e'} : \metavariable{\tau}
|
||
\end{mathpar}
|
||
\end{theorem}
|
||
\end{frame}
|
||
|
||
|
||
|
||
|
||
\begin{frame}{Soundness}
|
||
\begin{theorem}[Progress]
|
||
\begin{mathpar} \forall \Gamma, \metavariable{e}, \metavariable{\tau},\\
|
||
D :: \Gamma \vdash \metavariable{e} : \metavariable{\tau}\\
|
||
\Rightarrow \llbracket D \rrbracket \text{ is a value} \\ \vee
|
||
\exists \metavariable{e'} . \llbracket D \rrbracket \rightarrow_{eval} \metavariable{e'} \\
|
||
\end{mathpar}
|
||
\end{theorem}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}[t, fragile]{Summary}
|
||
|
||
\begin{tabular*}{\textwidth}{p{0.5\textwidth}|p{0.5\textwidth}}
|
||
|
||
\textbf{Problem}
|
||
\small
|
||
\begin{itemize}
|
||
\item fixed memory representation derived from type
|
||
(loss of low level control)
|
||
|
||
\item weak type interpretations
|
||
(loss of safety)
|
||
\end{itemize}
|
||
|
||
&
|
||
|
||
\textbf{Goal}
|
||
\small
|
||
\begin{itemize}
|
||
\item handle data transformations in type-safe way
|
||
\item allow low-level optimizations
|
||
with strong, unambiguous types
|
||
\end{itemize}
|
||
|
||
\\
|
||
|
||
\hline
|
||
|
||
\textbf{Ladder-Types}
|
||
\small
|
||
\begin{itemize}
|
||
\item connect low-level representation \&
|
||
high-level concept via structure of type terms
|
||
\end{itemize}
|
||
|
||
&
|
||
|
||
\textbf{Result}
|
||
\small
|
||
\begin{itemize}
|
||
\item extended SystemF with ladder types \& morphisms
|
||
\item formalized in Coq
|
||
\item proved basic lemmas about correctness of translation
|
||
\end{itemize}
|
||
|
||
\end{tabular*}
|
||
\end{frame}
|
||
|
||
|
||
|
||
%%%
|
||
%%% BACKUP
|
||
%%%
|
||
|
||
\begin{frame}{Subtype Relation}
|
||
\includegraphics[width=\textwidth]{sot-int.png}
|
||
\end{frame}
|
||
|
||
|
||
\begin{frame}{Subtype Relation}
|
||
\includegraphics[width=\textwidth]{sot-json.png}
|
||
\end{frame}
|
||
|
||
|
||
\end{document}
|
||
|