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1 changed files with 392 additions and 158 deletions
550
paper/main.tex
550
paper/main.tex
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@ -116,6 +116,13 @@ $$\\$$
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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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@ -136,13 +143,6 @@ $$\\$$
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\nonterm{ E }
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}{Value Morphism}
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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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\nonterm{ E }
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\quad
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@ -161,23 +161,25 @@ $$\\$$
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\exprterminal{as}
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\quad
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\nonterm{ T }
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}{Up-Cast}
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}{Ascription}
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\otherform{
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\nonterm{ E }
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\quad
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\exprterminal{to}
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\quad
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\nonterm{ T }
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}{Transformation}
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\otherform{\exprterminal{(} \quad \nonterm{E} \quad \exprterminal{)}}{Parenthesis}
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%\otherform{
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% \nonterm{ E }
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% \quad
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% \exprterminal{to}
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% \quad
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% \nonterm{ T }
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%}{Transformation}
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%\otherform{\exprterminal{(} \quad \nonterm{E} \quad \exprterminal{)}}{Parenthesis}
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$$\\$$
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\firstcase{V}{
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\exprterminal{\epsilon}
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}{Empty Value}
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\nonterm{ V } \quad
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\exprterminal{as} \quad
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\nonterm{ T }
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}{Ascribed Value}
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\otherform{
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\exprterminal{\Lambda} \metavariable{\alpha} \quad
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@ -193,19 +195,14 @@ $$\\$$
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\nonterm{ E }
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}{Abstraction Value}
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\otherform{
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\nonterm{ V } \quad
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\exprterminal{as} \quad
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\nonterm{ T }
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}{Cast Value}
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\end{grammar}
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\caption{Syntax of the core calculus with colors for \metavariable{metavariables}, \typeterminal{type-level terminal symbols}, \exprterminal{expression-level terminal symbols}
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where $\typenames, \typevars, \exprvars$ are mutually disjoint, countable sets of symbols to denote atomic type identifiers (\(\typenames\)), typevariables (\(\typevars\)), and expression variables (\(\exprvars\)).
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By default, assume \(\metavariable{\sigma} \in \typenames\), \(\metavariable{\alpha} \in \typevars\) and \(\metavariable{x} \in \exprvars\)
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By default, assume \(\metavariable{\sigma} \in \typenames\), \(\metavariable{\alpha} \in \typevars\) and \(\metavariable{x} \in \exprvars\).
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For simplicity, we write \(\metavariable{e} \in \nonterm{E}\) to say that the term \metavariable{e} is contained in the language generated by the nonterminal \(\nonterm{E}\).
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$$\\$$}
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\end{figure}
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@ -242,9 +239,9 @@ The following terms are valid types over \(\Sigma\):
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\begin{definition}[Substitution in Types]
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Given a type-variable assignment \(\psi_t = \{ \metavariable{\alpha_1} \mapsto \metavariable{\tau_1}, \quad \metavariable{\alpha_2} \mapsto \metavariable{\tau_2}, \quad \dots \}\),
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the thereby induced, substitution \(\overline{\psi_t}\) replaces all \emph{free} occurences of the variables \(\metavariable{\alpha_i}\) in a type-term \(\metavariable{\xi} \in \typenonterm{\{\metavariable{\alpha_1}, \quad \metavariable{\alpha_2}, \quad \dots\}}\) recursively with the type-term given by \(\psi_t(\metavariable{\alpha_i})\).
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Occourences of bound variables \(\metavariable{\alpha_i}\) are
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the thereby induced substitution \(\overline{\psi_t}\) replaces all \emph{free} occurences of the variables \(\metavariable{\alpha_i}\) in a type-term \(\metavariable{\xi} \in \nonterm{T}\) recursively with the type-term given by \(\psi_t(\metavariable{\alpha_i})\)
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, while occurences of bound variables are left untouched.
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Further, we assume that for all \(\tau_i\), all variable names are disjunct with the free variables of the term to which the substitution is applied.
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Coq definition is at \hyperref[coq:subst-type]{subst.v:\ref{coq:subst-type}}.
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\[\overline{\psi_t} \metavariable{\xi} = \begin{cases}
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@ -261,9 +258,39 @@ Coq definition is at \hyperref[coq:subst-type]{subst.v:\ref{coq:subst-type}}.
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\[\overline{\psi_t} \metavariable{e} = \begin{cases}
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\metavariable{e} \quad \text{ if } \metavariable{e} \text{ is a variable}
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\exprterminal{\Lambda \metavariable{\alpha} \mapsto} \overline{\psi_t}\metavariable{e'} \quad \text{ if \metavariable{e} is of the form } \exprterminal{\Lambda \metavariable{\alpha} \mapsto \metavariable{e'}}\\
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\exprterminal{\lambda \metavariable{x} : }\overline{\psi_t}\metavariable{\tau} \exprterminal{\mapsto} \overline{\psi_t}\metavariable{e'} \quad \text{ if \metavariable{e} is of the form } \exprterminal{\lambda \metavariable{x} : \metavariable{\tau} \mapsto \metavariable{e'}}\\
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\exprterminal{\lambda \metavariable{x} : }\overline{\psi_t}\metavariable{\tau} \exprterminal{\mapsto_\text{morph}} \overline{\psi_t}\metavariable{e'} \quad \text{ if \metavariable{e} is of the form } \exprterminal{\lambda \metavariable{x} : \metavariable{\tau} \mapsto_\text{morph} \metavariable{e'}}\\
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\\
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\exprterminal{\text{let } \metavariable{x} = }\overline{\psi_t}\metavariable{a} \exprterminal{\text{ in }} \overline{\psi_t}\metavariable{e'}
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\quad \text{ if \metavariable{e} is of the form }
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\exprterminal{\text{let } \metavariable{x} = \metavariable{a} \text{ in } \metavariable{e'}}
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\\
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\exprterminal{\Lambda \metavariable{\alpha} \mapsto} \overline{\psi_t}\metavariable{e'}
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\quad \text{ if \metavariable{e} is of the form } \exprterminal{\Lambda \metavariable{\alpha} \mapsto \metavariable{e'}}
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\\
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\exprterminal{\lambda \metavariable{x} : }\overline{\psi_t}\metavariable{\tau} \exprterminal{\mapsto} \overline{\psi_t}\metavariable{e'}
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\quad \text{ if \metavariable{e} is of the form } \exprterminal{\lambda \metavariable{x} : \metavariable{\tau} \mapsto \metavariable{e'}}
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\\
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\exprterminal{\lambda \metavariable{x} : }\overline{\psi_t}\metavariable{\tau} \exprterminal{\mapsto_\text{morph}} \overline{\psi_t}\metavariable{e'}
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\quad \text{ if \metavariable{e} is of the form } \exprterminal{\lambda \metavariable{x} : \metavariable{\tau} \mapsto_\text{morph} \metavariable{e'}}
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\\
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\overline{\psi_t} \metavariable{e'} \overline{\psi_t}\metavariable{\tau}
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\quad \text{ if \metavariable{e} is of the form }
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\exprterminal{( \metavariable{e'} \metavariable{\tau} )}
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\\
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\overline{\psi_t} \metavariable{e_1} \overline{\psi_t} \metavariable{e_2}
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\quad \text{ if \metavariable{e} is of the form }
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\exprterminal{(\metavariable{e_1} \metavariable{e_2})}
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\\
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\overline{\psi_t} \metavariable{e'} \exprterminal{\text{ as }} \overline{\psi_t}\metavariable{\tau}
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\quad \text{ if \metavariable{e} is of the form }
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\exprterminal{ \metavariable{e'} \text{ as } \metavariable{\tau} }
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\end{cases}\]
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@ -276,96 +303,247 @@ Coq definition is at \hyperref[coq:subst-type]{subst.v:\ref{coq:subst-type}}.
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\begin{definition}[Substitution in Expressions]
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\todo{complete}
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Given an expression-variable assignment \(\psi_e = \{ \metavariable{x_1} \mapsto \metavariable{t_1}, \quad \metavariable{x_2} \mapsto \metavariable{t_2}, \quad \dots \}\),
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the thereby induced, lexically scoped substitution \(\overline{\psi_e}\) replaces all \emph{free} occurences of the expression variables \(\metavariable{x_i}\)
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in an expression \(
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e \in
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\exprnonterm
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{\typevars}
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{\{\metavariable{x_1}, \quad \metavariable{x_2}, \quad \dots\}}
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\). Lexical scoping is implemented by simply not substituting any bound occourences of variables \(\metavariable{\alpha_i}\). This allows to skip \(\alpha\)-conversion as done in classical \(\lambda\)-calculus.
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the thereby induced substitution \(\overline{\psi_e}\) replaces all \emph{free} occurences of the expression variables \(\metavariable{x_i}\)
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in an expression \(e \in \nonterm{E} \) with the \(\psi_e(\metavariable{x_i})\)
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\[\overline{\psi_e} \metavariable{e} = \begin{cases}
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\metavariable{e} \quad \text{if } \metavariable{e} \in \exprvars \text{ and } \metavariable{e} \notin \text{Dom}(\psi_e)\\
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\metavariable{t} \quad \text{if } \metavariable{e} \in \exprvars \text{ and } (\metavariable{e}\mapsto\metavariable{t}) \in \psi_e\\
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\exprterminal{\text{let } \metavariable{x} \text{ = }} \overline{\psi_e}\metavariable{a} \exprterminal{\text{ in }} \overline{\psi_e}\metavariable{e'}
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\quad \text{if }
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\\
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\exprterminal{\lambda\metavariable{x}:\metavariable{\tau} \mapsto } \overline{\psi_e} \metavariable{e'}
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\quad \text{if \metavariable{e} is of the form }
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\exprterminal{\lambda\metavariable{x}:\metavariable{\tau} \mapsto \metavariable{e'}}
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\text{ and } \metavariable{x} \notin \text{Dom}(\psi_e)
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\\
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\exprterminal{\lambda\metavariable{x}:\metavariable{\tau} \mapsto } \overline{\psi_e \setminus \{\metavariable{x} \mapsto \metavariable{t}\}} \metavariable{e'}
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\quad \text{if \metavariable{e} is of the form }
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\exprterminal{\lambda\metavariable{x}:\metavariable{\tau} \mapsto \metavariable{e'}}
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\text{ and } (\metavariable{x}\mapsto\metavariable{t}) \in \psi_e
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\\
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\[\overline{\psi} \metavariable{e} = \begin{cases}
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\metavariable{e} \quad \text{if } \metavariable{\xi} \in \typenames\\
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\metavariable{\tau} \quad \text{if } (\metavariable{\xi} \mapsto \metavariable{\tau}) \in \psi\\
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\typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \overline{\psi}\metavariable{\xi'} \quad \text{if } \metavariable{\xi} \text{ is of the form } \typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \metavariable{\xi'} \text{ and } \metavariable{\alpha} \notin \text{Dom}(\psi)\\
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\typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \metavariable{\xi'} \quad \text{if } \metavariable{\xi} \text{ is of the form } \typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \metavariable{\xi'} \text{ and } \metavariable{\alpha} \in \text{Dom}(\psi)\\
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\typeterminal{<} (\overline{\psi} \metavariable{\xi_1}) \quad (\overline{\psi} \metavariable{\xi_2}) \typeterminal{>} \quad \text{if } \metavariable{\xi} \text{ is of the form } \typeterminal{<} \metavariable{\xi_1} \quad \metavariable{\xi_2} \typeterminal{>}\\
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(\overline{\psi} \metavariable{\xi_1}) \typeterminal{\rightarrow} (\overline{\psi} \metavariable{\xi_2}) \quad \text{if } \metavariable{\xi} \text{ is of the form } \metavariable{\xi_1} \typeterminal{\rightarrow} \metavariable{\xi_2}\\
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(\overline{\psi} \metavariable{\xi_1}) \typeterminal{\rightarrow_{morph}} (\overline{\psi} \metavariable{\xi_2}) \quad \text{if } \metavariable{\xi} \text{ is of the form } \metavariable{\xi_1} \typeterminal{\rightarrow_{morph}} \metavariable{\xi_2}\\
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(\overline{\psi} \metavariable{\xi_1}) \typeterminal{\sim} (\overline{\psi} \metavariable{\xi_2}) \quad \text{if } \metavariable{\xi} \text{ is of the form } \metavariable{\xi_1} \typeterminal{\sim} \metavariable{\xi_2}\\
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\end{cases}\]
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\end{definition}
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\subsection{Typing}
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\subsubsection{Equivalence of Type Terms}
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\begin{definition}[Distributivity]
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\todo{}
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%We want distributivity of ladders over type-specialization as well as over function/morphism types.
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\begin{definition}[Distributivity in Types]
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\begin{mathpar}
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\typeterminal{< \metavariable{\sigma}\sim\metavariable{\sigma'} \quad \metavariable{\tau} >}
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\rightarrow_\text{distribute}
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\typeterminal{< \metavariable{\sigma} \quad \metavariable{\tau} > \sim < \metavariable{\sigma'} \quad \metavariable{\tau} > }
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\typeterminal{< \metavariable{\sigma} \quad \metavariable{\tau}\sim\metavariable{\tau'} >}
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\rightarrow_\text{distribute}
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\typeterminal{< \metavariable{\sigma} \quad \metavariable{\tau} > \sim < \metavariable{\sigma} \quad \metavariable{\tau'} > }
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\typeterminal{ \metavariable{\sigma}\sim\metavariable{\sigma'} \rightarrow \metavariable{\tau} }
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\rightarrow_\text{distribute}
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\typeterminal{ (\metavariable{\sigma} \rightarrow \metavariable{\tau} ) \sim ( \metavariable{\sigma'} \rightarrow \metavariable{\tau} ) }
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\typeterminal{ \metavariable{\sigma} \rightarrow \metavariable{\tau}\sim\metavariable{\tau'} }
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\rightarrow_\text{distribute}
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\typeterminal{ (\metavariable{\sigma} \rightarrow \metavariable{\tau} ) \sim ( \metavariable{\sigma} \rightarrow \metavariable{\tau'} ) }
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\typeterminal{ \metavariable{\sigma}\sim\metavariable{\sigma'} \rightarrow_\text{morph} \metavariable{\tau} }
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\rightarrow_\text{distribute}
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\typeterminal{ (\metavariable{\sigma} \rightarrow_\text{morph} \metavariable{\tau} ) \sim ( \metavariable{\sigma'} \rightarrow_\text{morph} \metavariable{\tau} ) }
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\typeterminal{ \metavariable{\sigma} \rightarrow_\text{morph} \metavariable{\tau}\sim\metavariable{\tau'} }
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\rightarrow_\text{distribute}
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\typeterminal{ (\metavariable{\sigma} \rightarrow_\text{morph} \metavariable{\tau} ) \sim ( \metavariable{\sigma} \rightarrow_\text{morph} \metavariable{\tau'} ) }
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\end{mathpar}
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Let \(\rightarrow_\text{condense}\) be the inverse to \(\rightarrow_\text{distribute}\).
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See \hyperref[coq:type-dist]{equiv.v:\ref{coq:type-dist}}.
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\end{definition}
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\begin{definition}[Equivalence Relation]
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\todo{}
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\begin{definition}[Alpha Conversion in Types]
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\begin{mathpar}
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\typeterminal{\forall \metavariable{\alpha} . \metavariable{\tau}}
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\rightarrow_{\alpha}
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\typeterminal{\forall \metavariable{\alpha'} . } \{ \metavariable{\alpha} \mapsto \metavariable{\alpha'} \} \metavariable{\tau}
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\end{mathpar}
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\end{definition}
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\begin{definition}[Equivalence Relation]
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Transitive closure over \(\rightarrow_\text{distribute}\), \(\rightarrow_\text{condense}\) and \(\rightarrow_\alpha\).
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\begin{mathpar}
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\inferrule[E-Refl]{
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\metavariable{\tau} \in \nonterm{T}
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}{
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\metavariable{\tau} \equiv \metavariable{\tau}
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}\and
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\inferrule[E-Trans]{
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\metavariable{\tau_1} \equiv \metavariable{\tau_2}\\
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\metavariable{\tau_2} \equiv \metavariable{\tau_3}
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}{
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\metavariable{\tau_1} \equiv \metavariable{\tau_3}
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}
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\inferrule[E-Rename]{
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\metavariable{\tau_1} \rightarrow_\alpha \metavariable{\tau_2}
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}{
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\metavariable{\tau_1} \equiv \metavariable{\tau_2}
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}
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\inferrule[E-Distribute]{
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\metavariable{\tau_1} \rightarrow_\text{distribute} \metavariable{\tau_2}
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}{
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\metavariable{\tau_1} \equiv \metavariable{\tau_2}
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}\and
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\inferrule[E-Condense]{
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\metavariable{\tau_1} \rightarrow_\text{condense} \metavariable{\tau_2}
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}{
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\metavariable{\tau_1} \equiv \metavariable{\tau_2}
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}
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\end{mathpar}
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See \hyperref[coq:type-equiv]{equiv.v:\ref{coq:type-equiv}}.
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\end{definition}
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\begin{lemma}[Symmetry of \(\equiv\)]
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\begin{mathpar}
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\inferrule[E-Symm]{
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\metavariable{\tau_1} \equiv \metavariable{\tau_2}
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}{
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\metavariable{\tau_2} \equiv \metavariable{\tau_1}
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}
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\end{mathpar}
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\begin{proof}
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\(\rightarrow_{distribute}\) is the inverse of \(\rightarrow_{condense}\) and \(\rightarrow_{\alpha}\) is symmetric by itself.
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\end{proof}
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\end{lemma}
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\subsubsection{Normal Forms}
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\begin{definition}[Ladder Normal Form]
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\todo{}
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LNF is reached by exhaustive application of \(\rightarrow_\text{distribute}\).
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\end{definition}
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\subsubsection{Subtyping}
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\begin{definition}[Syntactic Subtyping]
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\todo{}
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\begin{definition}[Parameter Normal Form]
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PNF reached by exhaustive application of \(\rightarrow_\text{condense}\).
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\end{definition}
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\begin{definition}[Semantic Subtyping]
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\todo{}
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\subsubsection{Subtype Relations}
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We define two relations: first the syntatic subtype relation \(\leq\) and second the semantic subtype relation \(\precsim\).
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\begin{definition}[Syntactic Subtype (\(\tau_1\leq\tau_2\))]
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\begin{mathpar}
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\inferrule[S-Refl]{
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\metavariable{\tau} \equiv \metavariable{\tau'}
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||||
}{
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\metavariable{\tau} \leq \metavariable{\tau'}
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}
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\inferrule[S-Syntactic]{
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\metavariable{\sigma} \leq \metavariable{\tau}
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}{
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\metavariable{\sigma'} \typeterminal{\sim} \metavariable{\sigma} \leq \metavariable{\tau}
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||||
}
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\end{mathpar}
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\end{definition}
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||||
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\begin{definition}[Semantic Subtype (\(\tau_1\precsim\tau_2\))]
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\begin{mathpar}
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||||
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||||
\inferrule[S-Refl]{
|
||||
\metavariable{\tau} \equiv \metavariable{\tau'}
|
||||
}{
|
||||
\metavariable{\tau} \precsim \metavariable{\tau'}
|
||||
}
|
||||
|
||||
\inferrule[S-Syntactic]{
|
||||
\metavariable{\sigma} \precsim \metavariable{\tau}
|
||||
}{
|
||||
\metavariable{\sigma'} \typeterminal{\sim} \metavariable{\sigma} \precsim \metavariable{\tau}
|
||||
}
|
||||
|
||||
\inferrule[S-Semantic]{
|
||||
\metavariable{\sigma} \equiv \metavariable{\tau}
|
||||
}{
|
||||
\metavariable{\sigma} \typeterminal{\sim} \metavariable{\sigma'} \precsim \metavariable{\tau} \typeterminal{\sim} \metavariable{\tau'}
|
||||
}
|
||||
|
||||
|
||||
\end{mathpar}
|
||||
\end{definition}
|
||||
|
||||
|
||||
\begin{example}[Syntactic \& Semantic Subtypes]$\\$
|
||||
|
||||
\begin{enumerate}
|
||||
\item \typeterminal{ <Digit 10> \(\sim\) Char \( \quad \leq \quad \) Char }\\
|
||||
.. is a \emph{syntactic subtype}, because the representation of \typeterminal{<Digit 10>} is \emph{embedded} into \typeterminal{Char}.\\
|
||||
|
||||
\item \typeterminal{ <Digit 10> \(\sim\) Char \( \quad \precsim \quad \) <Digit 10> \(\sim\) machine.UInt64}\\
|
||||
.. is a \emph{semantic subtype}, because the \typeterminal{Char} based representation can be transformed into a representation based on \typeterminal{machine.UInt64},
|
||||
while preserving its semantics.
|
||||
\end{enumerate}
|
||||
\end{example}
|
||||
|
||||
\subsubsection{Inference of Expression Types}
|
||||
|
||||
The type-context \(\Gamma = \{ \metavariable{x_1} : \metavariable{\tau_1} , \quad \metavariable{x_2} : \metavariable{\tau_2} , \quad \ldots \}\) is a finite mapping from variables \(\metavariable{x_i} \in \exprvars\) to ground types \(\metavariable{\tau_i} \in \typenonterm{\emptyset}\).
|
||||
As usual, the typing-context \(\Gamma = \{ \metavariable{x_1} : \metavariable{\tau_1} , \quad \metavariable{x_2} : \metavariable{\tau_2} , \quad \ldots \}\)
|
||||
is a finite mapping which assigns variables \(\metavariable{x_i} \in \exprvars\) to types \(\metavariable{\tau_i} \in \nonterm{T}\).
|
||||
Using the inference rules given in \ref{def:typerules}, further typing-judgements
|
||||
of the form
|
||||
\begin{itemize}
|
||||
\item \(\metavariable{e} : \metavariable{\tau} \quad\) read as "expression \(\metavariable{e}\) is of type \(\metavariable{\tau}\)" and
|
||||
\item \(\metavariable{e} :\approx \metavariable{\tau} \quad\) read as "expression \(\metavariable{e}\) is compatible with type \(\metavariable{\tau}\)"
|
||||
\item \(\Gamma \vdash \metavariable{e} : \metavariable{\tau} \quad\) read as "expression \(\metavariable{e}\) is of type \(\metavariable{\tau}\)" and
|
||||
\item \(\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau} \quad\) read as "expression \(\metavariable{e}\) is compatible with type \(\metavariable{\tau}\)"
|
||||
\end{itemize}
|
||||
can be derived from the context \(\Gamma\) where \(\metavariable{e} \in \exprnonterm{\emptyset}{\exprvars}\) and \(\metavariable{\tau} \in \typenonterm{\emptyset}\)
|
||||
can be derived from the context \(\Gamma\) where \(\metavariable{e} \in \nonterm{E}\) and \(\metavariable{\tau} \in \nonterm{T}\).
|
||||
|
||||
|
||||
|
||||
\begin{definition}[Syntactic Well-Typedness]
|
||||
An expression \(\metavariable{e} \in \exprnonterm{\emptyset}{\emptyset}\) is \textbf{syntactically well-typed} if there exists a type \(\metavariable{\tau} \in \typenonterm{\emptyset}\),
|
||||
An expression \(\metavariable{e} \in \nonterm{E}\) is \textbf{syntactically well-typed} if there exists a type \(\metavariable{\tau} \in \nonterm{T}\),
|
||||
such that \( \emptyset \vdash \metavariable{e} : \metavariable{\tau} \) by \ref{def:typerules}.
|
||||
\end{definition}
|
||||
|
||||
\begin{definition}[Semantic Well-Typedness]
|
||||
An expression \(\metavariable{e} \in \exprnonterm{\emptyset}{\emptyset}\) is \textbf{semantically well-typed} if there exists a type \(\metavariable{\tau} \in \typenonterm{\emptyset}\),
|
||||
such that \( \emptyset \vdash \metavariable{e} :\approx \metavariable{\tau} \) by \ref{def:typerules}.
|
||||
An expression \(\metavariable{e} \in \nonterm{E}\) is \textbf{semantically well-typed} if there exists a type \(\metavariable{\tau} \in \nonterm{T}\),
|
||||
such that \( \emptyset \vdash \metavariable{e} :\approx \metavariable{\tau} \) by \ref{def:typerules} and \ref{def:semtyperules}.
|
||||
\end{definition}
|
||||
|
||||
\begin{definition}[Inference Rules for the Typing Relation.]
|
||||
\label{def:typerules}
|
||||
|
||||
As usual, each rule is composed of premises (above the horizontal line) and a conclusion (below the line):
|
||||
\begin{definition}[Syntactic Typing Relation]
|
||||
|
||||
\label{def:typerules}
|
||||
\begin{mathpar}
|
||||
|
||||
\inferrule[T-Variable]{
|
||||
\metavariable{x} \in \exprvars\\
|
||||
\metavariable{\tau} \in \nonterm{T}\\
|
||||
% \metavariable{x} \in \exprvars\\
|
||||
% \metavariable{\tau} \in \nonterm{T}\\
|
||||
\metavariable{x}:\metavariable{\tau} \in \Gamma\\
|
||||
}{
|
||||
\Gamma \vdash \metavariable{x}:\metavariable{\tau}
|
||||
}\and
|
||||
|
||||
|
||||
\inferrule[T-LetBinding]{
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\sigma} \\
|
||||
\Gamma , \metavariable{x}:\metavariable{\sigma} \vdash \metavariable{t} : \metavariable{\tau}
|
||||
|
|
@ -373,17 +551,16 @@ As usual, each rule is composed of premises (above the horizontal line) and a co
|
|||
\Gamma \vdash (\exprterminal{\text{let }}\metavariable{x}\exprterminal{\text{ = }}\metavariable{e}\exprterminal{\text{ in }} \metavariable{t}) : \metavariable{\tau}
|
||||
}
|
||||
|
||||
|
||||
\inferrule[T-TypeAbs]{
|
||||
\metavariable{\tau} \in \nonterm{T} \\
|
||||
\metavariable{e} \in \nonterm{E} \\
|
||||
% \metavariable{\tau} \in \nonterm{T} \\
|
||||
% \metavariable{e} \in \nonterm{E} \\
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau} \\
|
||||
}{
|
||||
\Gamma \vdash (\exprterminal{\Lambda} \metavariable{\alpha} \exprterminal{\mapsto} \metavariable{e}) : \typeterminal{\forall}\metavariable{\alpha}\typeterminal{.}\metavariable{\tau}
|
||||
}
|
||||
|
||||
\inferrule[T-TypeApp]{
|
||||
\metavariable{\tau} \in \nonterm{T} \\
|
||||
% \metavariable{\tau} \in \nonterm{T} \\
|
||||
\Gamma \vdash \metavariable{e} : \typeterminal{\forall} \metavariable{\alpha} \typeterminal{.} \metavariable{\tau} \\
|
||||
\metavariable{\sigma} \in \nonterm{T}
|
||||
}{
|
||||
|
|
@ -391,42 +568,34 @@ As usual, each rule is composed of premises (above the horizontal line) and a co
|
|||
}
|
||||
|
||||
|
||||
\inferrule[T-ValueAbs]{
|
||||
\metavariable{\sigma}, \metavariable{\tau} \in \nonterm{T} \\
|
||||
\metavariable{e} \in \nonterm{E} \\
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau} \\
|
||||
\inferrule[T-Abs]{
|
||||
% \metavariable{\sigma}, \metavariable{\tau} \in \nonterm{T} \\
|
||||
% \metavariable{e} \in \nonterm{E} \\
|
||||
\Gamma,\metavariable{x}:\metavariable{\sigma} \vdash \metavariable{e} : \metavariable{\tau} \\
|
||||
}{
|
||||
\Gamma \vdash (\exprterminal{\lambda} \metavariable{x} \exprterminal{:} \metavariable{\sigma} \exprterminal{\mapsto} \metavariable{e}) : \metavariable{\sigma}\typeterminal{\rightarrow}\metavariable{\tau}
|
||||
}
|
||||
|
||||
\inferrule[T-ValueApp]{
|
||||
\inferrule[T-App]{
|
||||
\Gamma \vdash \metavariable{f} : \metavariable{\sigma} \typeterminal{\rightarrow} \metavariable{\tau} \\
|
||||
\Gamma \vdash \metavariable{a} : \metavariable{\sigma} \\
|
||||
}{
|
||||
\Gamma \vdash (\metavariable{f} \quad \metavariable{a}) : \metavariable{\tau}
|
||||
}\and
|
||||
|
||||
|
||||
\inferrule[T-Compatible]{
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau}
|
||||
}\and
|
||||
|
||||
\inferrule[T-MorphAbs]{
|
||||
\metavariable{\sigma}, \metavariable{\tau} \in \nonterm{T} \\
|
||||
\metavariable{e} \in \nonterm{E} \\
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau} \\
|
||||
}{
|
||||
\Gamma \vdash (\exprterminal{\lambda} \metavariable{x} \exprterminal{:} \metavariable{\tau} \exprterminal{\mapsto_{morph}} \metavariable{e}) : \metavariable{\sigma}\typeterminal{\rightarrow_{morph}}\metavariable{\tau}
|
||||
}\and
|
||||
|
||||
\inferrule[T-MorphApp]{
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau}\\
|
||||
\exists \metavariable{h} . \Gamma \vdash \metavariable{h} : \metavariable{\tau} \typeterminal{\rightarrow_{morph}} \metavariable{\tau'}\\
|
||||
% \metavariable{\sigma}, \metavariable{\tau} \in \nonterm{T} \\
|
||||
% \metavariable{e} \in \nonterm{E} \\
|
||||
\Gamma,\metavariable{x}:\metavariable{\tau} \vdash \metavariable{e} : \metavariable{\tau'} \\
|
||||
\metavariable{\tau} \precsim \metavariable{\tau'}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau'}
|
||||
\Gamma \vdash (\exprterminal{\lambda} \metavariable{x} \exprterminal{:} \metavariable{\tau} \exprterminal{\mapsto_{morph}} \metavariable{e}) : \metavariable{\tau}\typeterminal{\rightarrow_{morph}}\metavariable{\tau'}
|
||||
}\and
|
||||
|
||||
\inferrule[T-MorphFun]{
|
||||
\Gamma \vdash \metavariable{f} : \metavariable{\sigma}\typeterminal{\rightarrow_{morph}}\metavariable{\tau}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{f} : \metavariable{\sigma}\typeterminal{\rightarrow}\metavariable{\tau}
|
||||
}\and
|
||||
|
||||
\inferrule[T-Ascension]{
|
||||
|
|
@ -441,16 +610,98 @@ As usual, each rule is composed of premises (above the horizontal line) and a co
|
|||
\metavariable{\tau} \leq \metavariable{\tau'}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{e} : \metavariable{\tau'}
|
||||
}\and
|
||||
}
|
||||
|
||||
\end{mathpar}
|
||||
\end{definition}
|
||||
|
||||
\begin{definition}[Semantic Typing Relation]
|
||||
\label{def:semtyperules}
|
||||
\begin{mathpar}
|
||||
\inferrule[T-NativeRepr]{
|
||||
\Gamma\vdash \metavariable{e} : \metavariable{\tau}
|
||||
}{
|
||||
\Gamma\vdash \metavariable{e} :\approx \metavariable{\tau}
|
||||
}
|
||||
|
||||
\inferrule[T-CoercedRepr]{
|
||||
\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau}\\
|
||||
% \metavariable{\tau} \precsim \metavariable{\tau'}\\
|
||||
%\exists \metavariable{h} \text{ s.t. }
|
||||
\Gamma \vdash \metavariable{h}: \typeterminal{\metavariable{\tau}\rightarrow_\text{morph}\metavariable{\tau'}}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau'}
|
||||
}
|
||||
|
||||
|
||||
\inferrule[T-CompatibleApp]{
|
||||
\Gamma \vdash \metavariable{f} : \metavariable{\sigma} \rightarrow \metavariable{\tau}\\
|
||||
\Gamma \vdash \metavariable{a} :\approx \metavariable{\sigma}
|
||||
}{
|
||||
\Gamma \vdash \exprterminal{(\metavariable{f} \text{ } \metavariable{a})} : \metavariable{\tau}
|
||||
}
|
||||
\end{mathpar}
|
||||
\end{definition}
|
||||
|
||||
\subsection{Coercion Semantics}
|
||||
|
||||
We define the translation function \(\llbracket . \rrbracket\) which completes a \emph{semantically well-typed} expression
|
||||
by inserting all required coercions based on the typing derivation of the expression.
|
||||
The result shall be a \emph{syntactically well-typed} expression.
|
||||
|
||||
We write \(C :: \sigma \precsim \tau\) to mean "C is a subtyping derivation tree whose conclusion is \(\sigma \precsim \tau\)".
|
||||
Similarly, we write \(D :: \Gamma \vdash e : \tau\) to mean "D is a typing derivation whose conclusion is \(\Gamma \vdash e : \tau\)"
|
||||
|
||||
\begin{definition}[Translation]
|
||||
\begin{mathpar}
|
||||
|
||||
\Big{\llbracket} \inferrule[T-SemanticSubtype]{
|
||||
D_1 :: \Gamma \vdash \metavariable{h}:\metavariable{\tau} \typeterminal{\rightarrow_\text{morph}} \metavariable{\tau'}\\
|
||||
D_2 :: \Gamma \vdash \metavariable{e}:\metavariable{\tau}\\
|
||||
% C :: \metavariable{\tau} \precsim \metavariable{\tau'}
|
||||
}{
|
||||
\Gamma \vdash \metavariable{e} :\approx \metavariable{\tau'}
|
||||
}\Big{\rrbracket} = \exprterminal{(}
|
||||
\llbracket D_1 \rrbracket \llbracket D_2 \rrbracket
|
||||
%\metavariable{h} \llbracket D_2 \rrbracket
|
||||
\exprterminal{)}
|
||||
|
||||
\Big{\llbracket} \inferrule[T-CoercedApp]{
|
||||
D_1 :: \Gamma \vdash \metavariable{f}:\metavariable{\sigma} \typeterminal{\rightarrow} \metavariable{\tau}\\
|
||||
D_2 :: \Gamma \vdash \metavariable{a}:\approx\metavariable{\sigma}
|
||||
}{
|
||||
\Gamma \vdash \exprterminal{(\metavariable{f} \text{ } \metavariable{a})} : \metavariable{\tau}
|
||||
}\Big{\rrbracket} = \exprterminal{(}
|
||||
%\exprterminal{(}\metavariable{f} \llbracket D_2 \rrbracket \exprterminal{)}
|
||||
\llbracket D_1 \rrbracket \llbracket D_2 \rrbracket
|
||||
\exprterminal{)}
|
||||
|
||||
\Big{\llbracket}
|
||||
\inferrule[\emph{Otherwise}]{}{
|
||||
D :: \Gamma \vdash \metavariable{e} : \metavariable{\tau}
|
||||
}
|
||||
\Big{\rrbracket} = \metavariable{e}
|
||||
|
||||
\end{mathpar}
|
||||
\end{definition}
|
||||
|
||||
\begin{lemma}[Elimination of \(:\approx\)]
|
||||
\label{lemma:translation}
|
||||
|
||||
For all \emph{semantically well-typed} expressions \metavariable{e} with the typing derivation \(D :: \emptyset \vdash \metavariable{e} :\approx \metavariable{\tau}\),
|
||||
the translation \(\llbracket D \rrbracket = \metavariable{e'}\), yields a \emph{syntactically well-typed} expression \metavariable{e'} with
|
||||
\(\emptyset \vdash \metavariable{e'} : \metavariable{\tau} \)
|
||||
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
\end{proof}
|
||||
|
||||
\end{lemma}
|
||||
|
||||
|
||||
\subsection{Evaluation}
|
||||
|
||||
Evaluation of an expression \(\metavariable{e} \in \exprnonterm{\emptyset}{\emptyset}\) is defined by exhaustive application of the rewrite rules \(\rightarrow_\beta\) and \(\rightarrow_\delta\),
|
||||
which are given in \ref{def:evalrules}.
|
||||
Evaluation of an expression \(\metavariable{e} \in \nonterm{E}\) is defined by exhaustive application of the rewrite rule \(\rightarrow_\beta\) as in \ref{def:evalrules}.
|
||||
|
||||
\begin{definition}[Inference Rules for Evaluation]
|
||||
\label{def:evalrules}
|
||||
|
|
@ -468,13 +719,13 @@ which are given in \ref{def:evalrules}.
|
|||
\inferrule[E-App2]{
|
||||
\metavariable{e_2} \rightarrow_\beta \metavariable{e_2'}
|
||||
}{
|
||||
\metavariable{e_1} \metavariable{e_2}
|
||||
\metavariable{v_1} \metavariable{e_2}
|
||||
\rightarrow_\beta
|
||||
\metavariable{e_1} \metavariable{e_2'}
|
||||
}
|
||||
\metavariable{v_1} \metavariable{e_2'}
|
||||
}\and
|
||||
|
||||
\inferrule[E-TypApp]{
|
||||
\metavariable{\tau} \in \typenonterm{\emptyset}\\
|
||||
% \metavariable{\tau} \in \typenonterm{\emptyset}\\
|
||||
\metavariable{e} \rightarrow_\beta \metavariable{e'}
|
||||
}{
|
||||
\metavariable{e}
|
||||
|
|
@ -495,7 +746,6 @@ which are given in \ref{def:evalrules}.
|
|||
\rightarrow_\beta
|
||||
\{ \metavariable{\alpha} \mapsto \metavariable{\tau} \} \metavariable{e}
|
||||
}\and
|
||||
|
||||
\inferrule[E-AppLam]{
|
||||
}{
|
||||
\exprterminal{(\lambda} \metavariable{x}
|
||||
|
|
@ -514,64 +764,27 @@ which are given in \ref{def:evalrules}.
|
|||
\exprterminal{\text{ in }}\metavariable{e}
|
||||
\rightarrow_\beta
|
||||
\{ \metavariable{x} \mapsto \metavariable{a} \} \metavariable{e}
|
||||
}
|
||||
|
||||
|
||||
\inferrule[E-ImplicitCast]{
|
||||
\Gamma \vdash \metavariable{f} : \metavariable{\sigma} \typeterminal{\rightarrow} \metavariable{\tau} \\
|
||||
\Gamma \vdash \metavariable{h} : \metavariable{\sigma'} \typeterminal{\rightarrow_{morph}} \metavariable{\sigma} \\
|
||||
\Gamma \vdash \metavariable{a} : \metavariable{\sigma'}
|
||||
}\and
|
||||
\inferrule[E-Ascribe]{
|
||||
}{
|
||||
\exprterminal{(} \metavariable{f} \quad \metavariable{a} \exprterminal{)}
|
||||
\rightarrow_\delta
|
||||
\exprterminal{(} \metavariable{f} \quad \exprterminal{(} \metavariable{h} \quad \metavariable{a} \exprterminal{))}
|
||||
\metavariable{e}
|
||||
\exprterminal{\text{ as }}
|
||||
\metavariable{\tau}
|
||||
\rightarrow_\beta
|
||||
\metavariable{e}
|
||||
}
|
||||
|
||||
\end{mathpar}
|
||||
\end{definition}
|
||||
|
||||
|
||||
\begin{lemma}[\(\beta\)-reduction preserves \(\delta\)-normalform]
|
||||
\label{lemma:preserve-delta-normalform}
|
||||
Assume \metavariable{e} is in \(\delta\)-normalform and \(\metavariable{e} \rightarrow_\beta \metavariable{e'}\). Then \(\metavariable{e'}\) is in \(\delta\)-normalform as well.
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
\end{proof}
|
||||
\end{lemma}
|
||||
|
||||
\begin{lemma}[\(\delta\)-normalform eliminates compatibility]
|
||||
\label{lemma:eliminate-compat}
|
||||
Assume \(\emptyset \vdash \metavariable{e} :\approx \metavariable{\tau}\) and \(\metavariable{e} \rightarrow_{\delta}^* \metavariable{e'}\) such that \(\metavariable{e'}\) is in \(\delta\)-normalform.
|
||||
Then \(\emptyset \vdash \metavariable{e'} : \metavariable{\tau}\)
|
||||
|
||||
\begin{proof}
|
||||
\end{proof}
|
||||
|
||||
\end{lemma}
|
||||
|
||||
\subsection{Soundness}
|
||||
|
||||
\begin{lemma}[\(\beta\)-Preservation]
|
||||
\label{lemma:beta-preservation}
|
||||
Assume the expression \(\metavariable{e}\) is \textbf{syntactically well-typed}, i.e. \(\emptyset \vdash \metavariable{e} : \metavariable{\tau}\) for some type \(\metavariable{\tau}\). Then forall \(\metavariable{e'}\) with \(\metavariable{e} \rightarrow_{\beta} \metavariable{e'}\) it holds that \(\emptyset \vdash \metavariable{e'} : \metavariable{\tau}\) as well.
|
||||
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
\end{proof}
|
||||
|
||||
\end{lemma}
|
||||
|
||||
\begin{lemma}[\(\delta\)-Preservation]
|
||||
\label{lemma:delta-preservation}
|
||||
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
\end{proof}
|
||||
\end{lemma}
|
||||
|
||||
\begin{lemma}[Preservation]
|
||||
\label{lemma:preservation}
|
||||
Assume the expression \(\metavariable{e}\) is well typed, i.e. \(\emptyset \vdash \metavariable{e} : \metavariable{\tau}\) for some type \(\metavariable{\tau}\). Then forall \(\metavariable{e'}\) with \(\metavariable{e} \rightarrow_{eval} \metavariable{e'}\) it holds that \(\emptyset \vdash \metavariable{e'} : \metavariable{\tau}\) as well.
|
||||
Assume the expression \(\metavariable{e}\) is well typed, i.e. \(\emptyset \vdash \metavariable{e} : \metavariable{\tau}\)
|
||||
for some type \(\metavariable{\tau}\).
|
||||
Then forall \(\metavariable{e'}\) with \(\metavariable{e} \rightarrow_{\beta} \metavariable{e'}\)
|
||||
it holds that \(\emptyset \vdash \metavariable{e'} : \metavariable{\tau}\) as well.
|
||||
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
|
|
@ -580,23 +793,44 @@ Assume the expression \(\metavariable{e}\) is well typed, i.e. \(\emptyset \vdas
|
|||
|
||||
\begin{lemma}[Progress]
|
||||
\label{lemma:progress}
|
||||
If \(\emptyset \vdash \metavariable{e} : \metavariable{\tau}\), then either \(\metavariable{e}\) is a value or there exists some \(\metavariable{e'}\) such that \(\metavariable{e} \rightarrow_{eval} \metavariable{e'}\)
|
||||
If \(\emptyset \vdash \metavariable{e} : \metavariable{\tau}\),
|
||||
then either \(\metavariable{e}\) is a value
|
||||
or there exists some \(\metavariable{e'}\) such that \(\metavariable{e} \rightarrow_{\beta} \metavariable{e'}\)
|
||||
|
||||
\begin{proof}
|
||||
\todo{}
|
||||
\end{proof}
|
||||
\end{lemma}
|
||||
|
||||
\begin{theorem}[Soundness]
|
||||
If \(\emptyset \vdash \metavariable{e}:\approx\metavariable{\tau}\), then it never occurs that \(\metavariable{e} \rightarrow_{eval}^{*} \metavariable{e'}\) where \metavariable{e'} is in normal form but not a value.
|
||||
\begin{theorem}[Syntactic Type Soundness]
|
||||
\label{theorem:syntactic-soundness}
|
||||
No syntactically well-typed expression is stuck.
|
||||
|
||||
Assume the typing derivation \(D :: \emptyset \vdash \metavariable{e}:\metavariable{\tau}\).
|
||||
Then it never occurs that \(\metavariable{e} \rightarrow_{\beta}^{*} \metavariable{e'}\) where \metavariable{e'} is in normal form but not a value.
|
||||
|
||||
\begin{proof}
|
||||
By \ref{lemma:}
|
||||
Follows from \ref{lemma:progress} and \ref{lemma:preservation}.
|
||||
\end{proof}
|
||||
\end{theorem}
|
||||
|
||||
\begin{theorem}[Semantic Type Soundness]
|
||||
\label{theorem:semantic-soundness}
|
||||
No semantically well-typed expression is stuck.
|
||||
|
||||
Assume the typing derivation \(D :: \emptyset \vdash \metavariable{e}:\approx\metavariable{\tau}\).
|
||||
Then it never occurs that \(\llbracket D \rrbracket \rightarrow_{\beta}^{*} \metavariable{e'}\) where \metavariable{e'} is in normal form but not a value.
|
||||
|
||||
\begin{proof}
|
||||
Assume the typing derivation \(D :: \emptyset \vdash \metavariable{e}:\approx\metavariable{\tau}\).
|
||||
By \ref{lemma:translation}, \(\emptyset \vdash \llbracket D \rrbracket : \metavariable{\tau}\)
|
||||
and thus it follows by \ref{theorem:syntactic-soundness} that \metavariable{e} is not stuck.
|
||||
\end{proof}
|
||||
\end{theorem}
|
||||
|
||||
|
||||
|
||||
\newpage
|
||||
\section{Boehm-Berarducci Encoding}
|
||||
|
||||
|
||||
|
|
|
|||
Loading…
Reference in a new issue