+\startitemize
+ \item Arguments with a runtime representable type.
+
+ As we have seen with user-defined functions, these arguments can
+ always be reduced to a simple variable reference, by the
+ argument extraction transform. Performing this transform for
+ builtin functions as well, means that the translation of builtin
+ functions can be limited to signal references, instead of
+ needing to support all possible expressions.
+
+ \item Arguments with a function type.
+
+ These arguments are functions passed to higher order builtins,
+ like \lam{map} and \lam{foldl}. Since implementing these
+ functions for arbitrary function-typed expressions (\eg, lambda
+ expressions) is rather comlex, we reduce these arguments to
+ (partial applications of) global functions.
+
+ We can still support arbitrary expressions from the user code,
+ by creating a new global function containing that expression.
+ This way, we can simply replace the argument with a reference to
+ that new function. However, since the expression can contain any
+ number of free variables we also have to include partial
+ applications in our normal form.
+
+ This category of arguments is handled by the function extraction
+ transform.
+ \item Other unrepresentable arguments.
+
+ These arguments can take a few different forms:
+ \startdesc{Type arguments}
+ In the core language, type arguments can only take a single
+ form: A type wrapped in the Type constructor. Also, there is
+ nothing that can be done with type expressions, except for
+ applying functions to them, so we can simply leave type
+ arguments as they are.
+ \stopdesc
+ \startdesc{Dictionary arguments}
+ In the core language, dictionary arguments are used to find
+ operations operating on one of the type arguments (mostly for
+ finding class methods). Since we will not actually evaluatie
+ the function body for builtin functions and can generate
+ code for builtin functions by just looking at the type
+ arguments, these arguments can be ignored and left as they
+ are.
+ \stopdesc
+ \startdesc{Type level arguments}
+ Sometimes, we want to pass a value to a builtin function, but
+ we need to know the value at compile time. Additionally, the
+ value has an impact on the type of the function. This is
+ encoded using type-level values, where the actual value of the
+ argument is not important, but the type encodes some integer,
+ for example. Since the value is not important, the actual form
+ of the expression does not matter either and we can leave
+ these arguments as they are.
+ \stopdesc
+ \startdesc{Other arguments}
+ Technically, there is still a wide array of arguments that can
+ be passed, but does not fall into any of the above categories.
+ However, none of the supported builtin functions requires such
+ an argument. This leaves use with passing unsupported types to
+ a function, such as calling \lam{head} on a list of functions.
+
+ In these cases, it would be impossible to generate hardware
+ for such a function call anyway, so we can ignore these
+ arguments.
+
+ The only way to generate hardware for builtin functions with
+ arguments like these, is to expand the function call into an
+ equivalent core expression (\eg, expand map into a series of
+ function applications). But for now, we choose to simply not
+ support expressions like these.
+ \stopdesc
+
+ From the above, we can conclude that we can simply ignore these
+ other unrepresentable arguments and focus on the first two
+ categories instead.
+\stopitemize
+
+\subsubsection{Argument extraction}
+This transform deals with arguments to functions that
+are of a runtime representable type.
+
+TODO: It seems we can map an expression to a port, not only a signal.
+Perhaps this makes this transformation not needed?
+TODO: Say something about dataconstructors (without arguments, like True
+or False), which are variable references of a runtime representable
+type, but do not result in a signal.
+
+To reduce a complex expression to a simple variable reference, we create
+a new let expression around the application, which binds the complex
+expression to a new variable. The original function is then applied to
+this variable.
+
+\transform{Argument extract}
+{
+\lam{Y} is of a hardware representable type
+
+\lam{Y} is not a variable referene
+
+\conclusion
+
+\trans{X Y}{let z = Y in X z}
+}
+
+\subsubsection{Function extraction}
+This transform deals with function-typed arguments to builtin functions.
+Since these arguments cannot be propagated, we choose to extract them
+into a new global function instead.
+
+Any free variables occuring in the extracted arguments will become
+parameters to the new global function. The original argument is replaced
+with a reference to the new function, applied to any free variables from
+the original argument.
+
+\transform{Function extraction}
+{
+\lam{X} is a (partial application of) a builtin function
+
+\lam{Y} is not an application
+
+\lam{Y} is not a variable reference
+
+\conclusion
+
+\lam{f0 ... fm} = free local vars of \lam{Y}
+
+\lam{y} is a new global variable
+
+\lam{y = λf0 ... fn.Y}
+
+\trans{X Y}{X (y f0 ... fn)}
+}
+
+\subsubsection{Argument propagation}
+This transform deals with arguments to user-defined functions that are
+not representable at runtime. This means these arguments cannot be
+preserved in the final form and most be {\em propagated}.
+
+Propagation means to create a specialized version of the called
+function, with the propagated argument already filled in. As a simple
+example, in the following program:
+
+\startlambda
+f = λa.λb.a + b
+inc = λa.f a 1
+\stoplambda
+
+we could {\em propagate} the constant argument 1, with the following
+result:
+
+\startlambda
+f' = λa.a + 1
+inc = λa.f' a
+\stoplambda
+
+Special care must be taken when the to-be-propagated expression has any
+free variables. If this is the case, the original argument should not be
+removed alltogether, but replaced by all the free variables of the
+expression. In this way, the original expression can still be evaluated
+inside the new function. Also, this brings us closer to our goal: All
+these free variables will be simple variable references.
+
+To prevent us from propagating the same argument over and over, a simple
+local variable reference is not propagated (since is has exactly one
+free variable, itself, we would only replace that argument with itself).
+
+This shows that any free local variables that are not runtime representable
+cannot be brought into normal form by this transform. We rely on an
+inlining transformation to replace such a variable with an expression we
+can propagate again.
+
+TODO: Move these definitions somewhere sensible.
+
+Definition: A global variable is any variable that is bound at the
+top level of a program. A local variable is any other variable.
+
+Definition: A hardware representable type is a type that we can generate
+a signal for in hardware. For example, a bit, a vector of bits, a 32 bit
+unsigned word, etc. Types that are not runtime representable notably
+include (but are not limited to): Types, dictionaries, functions.
+
+Definition: A builtin function is a function for which a builtin
+hardware translation is available, because its actual definition is not
+translatable. A user-defined function is any other function.
+
+\transform{Argument propagation}
+{
+\lam{x} is a global variable, bound to a user-defined function
+
+\lam{x = E}
+
+\lam{Y_i} is not of a runtime representable type
+
+\lam{Y_i} is not a local variable reference
+
+\conclusion
+
+\lam{f0 ... fm} = free local vars of \lam{Y_i}
+
+\lam{x'} is a new global variable
+
+\lam{x' = λy0 ... yi-1 f0 ... fm yi+1 ... yn . E y0 ... yi-1 Yi yi+1 ... yn}
+
+\trans{x Y0 ... Yi ... Yn}{x' y0 ... yi-1 f0 ... fm Yi+1 ... Yn}
+}
+
+TODO: The above definition looks too complicated... Can we find
+something more concise?
+
+\subsection{Cast propagation}
+This transform pushes casts down into the expression as far as possible.
+\subsection{Let recursification}
+This transform makes all lets recursive.
+\subsection{Let simplification}
+This transform makes the result value of all let expressions a simple
+variable reference.
+\subsection{Let flattening}
+This transform turns two nested lets (\lam{let x = (let ... in ...) in
+...}) into a single let.
+\subsection{Simple let binding removal}
+This transforms inlines simple let bindings (\eg a = b).
+\subsection{Function inlining}
+This transform inlines let bindings of a funtion type. TODO: This should
+be generelized to anything that is non representable at runtime, or
+something like that.
+\subsection{Scrutinee simplification}
+This transform ensures that the scrutinee of a case expression is always
+a simple variable reference.
+\subsection{Case binder wildening}
+This transform replaces all binders of a each case alternative with a
+wild binder (\ie, one that is never referred to). This will possibly
+introduce a number of new "selector" case statements, that only select
+one element from an algebraic datatype and bind it to a variable.
+\subsection{Case value simplification}
+This transform simplifies the result value of each case alternative by
+binding the value in a let expression and replacing the value by a
+simple variable reference.
+\subsection{Case removal}
+This transform removes any case statements with a single alternative and
+only wild binders.
+
+\subsection{Example sequence}
+
+This section lists an example expression, with a sequence of transforms
+applied to it. The exact transforms given here probably don't exactly
+match the transforms given above anymore, but perhaps this can clarify
+the big picture a bit.
+
+TODO: Update or remove this section.
+
+\startlambda
+ λx.