121 lines
5.2 KiB
TeX
121 lines
5.2 KiB
TeX
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%We could do a translation from Java to \wildFJ explaining implicit capture conversion
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\section{Soundness of Typing}
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We show soundness with the type rules statet in \cite{WildcardsNeedWitnessProtection}.
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A correct \FGJGT{} program can be converted to a correct \wildFJ{} program.
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\begin{figure}
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$\begin{array}{rcl}
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| \texttt{x} |
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& = & \texttt{x} \\
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| \texttt{let} \ \texttt{x} : \type{T} = \texttt{e},\, \ol{x} : \ol{T} = \ol{e} \ \texttt{in}\ \texttt{x}.\texttt{m}(\ol{x}) |
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& = & |\texttt{e}|.\texttt{m}(\ol{|e|}) \\
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| \texttt{let} \ \texttt{x} : \type{T} = \texttt{e}\ \texttt{in}\ \texttt{x}.\texttt{f} |
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& = & |\texttt{e}|.\texttt{f} \\
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| \texttt{e} \elvis{} \texttt{e} |
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& = & |\texttt{e}| \elvis{} |\texttt{e}| \\
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\end{array}$
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\caption{Erasure} \label{fig:erasure}
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\end{figure}
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% A constraint Pair<A,B> <. a, then a has infinite possibilities:
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% a =. X.Pair<X,X>
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% a =. X,Y.Pair<X,Y>
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% a =. X.Pair<Pair<X,X>,X>
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% a =. X,Y.Pair<Pair<X,Y>,X>
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% a =. X,Y.Pair<Pair<X,Y>,Y>
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% There is no way to try out every single one of them.
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Starting with the parameters of the method we gradually add every expression which only contains already captured expressions.
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We have a typed expression
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$|\texttt{x}, \texttt{r}| = \texttt{let}\ \texttt{r} : \type{T} = \texttt{x in}$
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$|\texttt{e.f}, \texttt{r}| = |\texttt{e}, x| \texttt{let} r = x.\texttt{f} \ \texttt{in}$
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$|\texttt{x}, \texttt{r}| = \texttt{let}\ \texttt{r} = \texttt{x in}$
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%TODO: write the transform rules:
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% |e.f, ret| = |e, r| let ret = r.f in
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% |x, ret| = let ret = x in
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% |e.m(e_), ret| = |e, r| |e_, a_| let ret = r.m(a_) in
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Erasure functions:
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$|\texttt{x}| = \texttt{let r} : \wcNtype{\Delta}{N} = \texttt{x in r}$
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$\texttt{x} \longmapsto \texttt{let}\ \texttt{xx} : \type{T} = \texttt{x in xx}$
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$\texttt{x}.f \longmapsto \texttt{let}\ \texttt{xf} : \type{T} = \texttt{x}.f \ \texttt{in xf}$
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$\begin{array}{l}
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\texttt{e} \longmapsto \texttt{let}\ \texttt{xe} : \type{T} = \texttt{e}' \ \texttt{in xe} \\
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\hline
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\vspace*{-0.4cm}\\
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\texttt{e}.f \longmapsto \texttt{let}\ \texttt{xf} : \type{T} = \texttt{x}.f \ \texttt{in x}.f
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\end{array}$
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Example:
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m(a, b) = a.m(b.f);
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let xa = a in let xb = b in let xf = xb.f in let xm = xa.m(xf) in xm
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% TODO: Now we have to proof that there is a LetFJ program for every TIFJ program!
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% |let xr : T = x1.m(x2) in e| = [x1.m(x2)/xr]|e|
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% |let xf : T = x1.f in e| = [x1.f/xf]|e|
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% |let xr : T = x in e| = [xr/x]|e|
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% |new C(x)| = new C(x)
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% | let xr : T' = x in let xf : T = xr.f | = x.f
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% let x : T' = e' in x = |e|
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% ---------------------------------
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% | let xr : T' = x in let xf : T = xr.f | = x.f
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% let x : T' = e' in x = |e|
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% -----------
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% =
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We need a language which only has let statemnts and expressions on capture converted variables
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The idea is to use wildcard placeholders inside the method. Also in the bounds of wildcards.
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This makes it possible to replace wildcards with free variables by setting upper and lower bound to that free variable.
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Free variables then can flow freely inside the method body.
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We have to show that a type solution implies that there is a possible transformation to a correct typed letFJ program.
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If there is a possible method type then there must exist a let configuration.
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% By starting with the parameter types and capturing them. Afterwards every capture creates free variables which are used inside
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% TODO: Proof!
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The normal type placeholders represent denotable types.
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%TODO: the type rules stay the same. We generate let statements in a fashion which removes all wildcard types.
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% what about wildcards getting returned by untyped methods? they can also be captured
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% TODO: try soundness proof on the original type rules!
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Removing of extensive wildcards:
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$
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\wctype{\wildcard{X}{\wtv{u}}{\wtv{l}}, \wildcard{Y}{\wtv{p}}{\wtv{m}}}{Pair}{\rwildcard{X}, \rwildcard{Y}}
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\lessdot \wctype{\rwildcard{X}}{Pair}{\rwildcard{X}, \rwildcard{X}} \\
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\wildcard{X}{\wtv{u}}{\wtv{l}}, \wildcard{Y}{\wtv{p}}{\wtv{m}} \vdash \rwildcard{X} \doteq \wtv{x}, \rwildcard{Y} \doteq \wtv{x} \\
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\wildcard{X}{\wtv{u}}{\wtv{l}}, \wildcard{Y}{\wtv{p}}{\wtv{m}} \vdash \rwildcard{X} \doteq \rwildcard{Y} \\
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\wildcard{X}{\wtv{u}}{\wtv{l}}, \wildcard{Y}{\wtv{p}}{\wtv{m}} \vdash \wtv{u} \doteq \rwildcard{Y}, \wtv{l} \doteq \rwildcard{Y} \\
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\implies \wctype{\wildcard{Y}{\wtv{p}}{\wtv{m}}}{Pair}{\rwildcard{Y}, \rwildcard{Y}}, \wtv{u} \doteq \rwildcard{Y}, \wtv{l} \doteq \rwildcard{Y} \\
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$
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%e.f leads to constraints: r <c C<x> with return type equals the field type T.
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% T can contain free variables from r. but also it can be used in another constraint and get free variables from inner let statements
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% X.C<X> <c C<x> -> then T contains X variables
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% let x1 = p1, x2 = p2 in
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% let r1 = x1 in let r2 = p2 in let f1 = r2.f in let r3 = x1 in let m2 = r3.m2() let ret = r1.m(f1,m2)
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% in ret
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What about method invocation with no type yet. m2 :: a -> a
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they are also encased in let expression so the return type can be capture converted.
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Those methods and the parameter types of the current method are the only things not typed.
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All the other types cannot change their type. The captured wildcards can only flow from top to bottom.
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The return type of untyped methods has to be well-formed and cannot contain free variables.
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Therefore no free variables will flow into those types.
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