Changeset 7a37fcb1 for doc/theses


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Timestamp:
Aug 25, 2024, 11:55:44 AM (4 months ago)
Author:
Peter A. Buhr <pabuhr@…>
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master
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7f2e87a
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first proofread of chapter 3

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  • doc/theses/fangren_yu_MMath/content1.tex

    r3f37f5b r7a37fcb1  
    22\label{c:content1}
    33
    4 This chapter discusses some recent additions to the \CFA language and their interactions with the type system.
     4This chapter discusses some recent additions to the \CFA language and their interactions with the type system.
     5
    56
    67\section{Reference Types}
    78
    8 Reference types are added to \CFA by Robert Schluntz in conjunction to his work on resource management. \CFA reference type is similar to \CC reference type but with its own added features.
    9 
    10 The main difference between \CFA and \CC references is that \CC references are immutable, while \CFA supports reference rebinding operations. In \CC, references are mostly used in function parameters for pass-by-reference semantics, and in class members, which must be initialized during construction. Merely declaring a variable of reference type has little use as it only creates an alias of an existing variable. In contrast, \CFA reference variables can be reassigned (rebinded) and reference to reference is also allowed.
    11 
    12 This example is taken from the feature demonstration page of \CFA: \footnote{Currently there are no plans of introducing \CC rvalue references to \CFA. Readers should not confuse the multi-reference declarations with \CC rvalue reference syntax.}
    13 
    14 \begin{cfa}
     9Reference types were added to \CFA by Robert Schluntz and Aaron Moss~\cite{Moss18}.
     10The \CFA reference type generalizes the \CC reference type (and its equivalent in other modern programming languages) by providing both mutable and immutable forms and cascading referencing and dereferencing.
     11Specifically, \CFA attempts to extend programmer intuition about pointers to references.
     12That is, use a pointer when its primary purpose is manipulating the address of storage, \eg a top/head/tail pointer or link field in a mutable data structure.
     13Here, manipulating the pointer address is the primary operation, while dereferencing the pointer to its value is the secondary operation.
     14For example, \emph{within} a data structure, \eg stack or queue, all operations involve pointer addresses and the pointer may never be dereferenced because the referenced object is opaque.
     15Alternatively, use a reference when its primary purpose is to alias a value, \eg a function parameter that does not copy the argument (performance reason).
     16Here, manipulating the value is the primary operation, while changing the pointer address is the secondary operation.
     17Succinctly, if the address often changes, use a pointer;
     18if the value often changes, use a reference.
     19Note, \CC made the reference address immutable starting a \emph{belief} that immutability is a fundamental aspect of a reference's pointer, resulting in a semantic asymmetry between the pointer and reference.
     20\CFA adopts a uniform policy between pointers and references where mutability is a settable property at the point of declaration.
     21
     22The following examples shows how pointers and references are treated uniformly in \CFA.
     23\begin{cfa}[numbers=left,numberblanklines=false]
    1524int x = 1, y = 2, z = 3;
    16 int * p1 = &x, ** p2 = &p1,  *** p3 = &p2, // pointers to x
    17         & r1 = x,  && r2 = r1,   &&& r3 = r2;  // references to x
     25int * p1 = &x, ** p2 = &p1,  *** p3 = &p2,      $\C{// pointers to x}$
     26        @&@ r1 = x,  @&&@ r2 = r1,   @&&&@ r3 = r2;     $\C{// references to x}$
    1827int * p4 = &z, & r4 = z;
    1928
    20 *p1 = 3; **p2 = 3; ***p3 = 3;                   // change x
    21  r1 =  3;       r2 = 3;         r3 = 3;                 // change x: implicit dereference *r1, **r2, ***r3
    22 **p3 = &y;      *p3 = &p4;                                      // change p1, p2
     29*p1 = 3; **p2 = 3; ***p3 = 3;                           $\C{// different ways to change x to 3}$
     30 r1 =  3;       r2 = 3;         r3 = 3;                         $\C{// change x: implicit dereference *r1, **r2, ***r3}$
     31**p3 = &y;      *p3 = &p4;                                              $\C{// change p1, p2}$
    2332// cancel implicit dereferences (&*)**r3, (&(&*)*)*r3, &(&*)r4
    24 &r3 = &y; &&r3 = &&r4;                                  // change r1, r2
    25 \end{cfa}
    26 
    27 A different syntax is required for reassigning to a reference variable itself, since auto-deferencing is always performed and the expression \texttt{r1} would mean the \texttt{int} variable that \texttt{r1} referenced to instead. Using \CFA's reference types (including multi-references) we can actually describe the "lvalue" rules in C by types only, and the concept of lvalue could have been completely dropped off. However, since the cfa-cc program is not a full compiler but a transpiler from \CFA to C, lvalueness is still used in some places for code generation purposes, while the type checker now works on just types without needing to consider lvalueness of an expression.
    28 
    29 The current typing rules used in \CFA can be summarized as follows:
    30 
     33@&@r3 = @&@y; @&&@r3 = @&&@r4;                          $\C{// change r1, r2}$
     34\end{cfa}
     35Like pointers, reference can be cascaded, \ie a reference to a reference, \eg @&& r2@.\footnote{
     36\CC uses \lstinline{&&} for rvalue reference a feature for move semantics and handling the \lstinline{const} Hell problem.}
     37Usage of a reference variable automatically performs the same number of dereferences as the number of references in its declaration, \eg @r3@ becomes @***r3@.
     38Finally, to reassign a reference's address needs a mechanism to stop the auto-referencing, which is accomplished by using a single reference to cancel all the auto-dereferencing, \eg @&r3 = &y@ resets @r3@'s address to point to @y@.
     39\CFA's reference type (including multi-de/references) is powerful enough to describe the lvalue rules in C by types only.
     40As a result, the \CFA type checker now works on just types without using the notion of lvalue in an expression.
     41(\CFA internals still use lvalue for code generation purposes.)
     42
     43The current reference typing rules in \CFA are summarized as follows:
    3144\begin{enumerate}
    32     \item For a variable x with declared type T, the variable-expression x has type reference to T, even if T itself is a reference type.
    33     \item For an expression e with type $T\&_1...\&_n$ i.e. T followed by n references, where T is not a reference type, the expression \&T (address of T) has type T* followed by n-1 references.
    34     \item For an expression e with type T* followed by n references, *T has type T followed by n+1 references. This is the reverse of previous rule, such that address-of and dereference operators are perfect inverses.
    35     \item When matching parameter and argument types in a function call context, the number of references on the argument type is always stripped off to match the number of references on the parameter type \footnote{\CFA allows rvalue expressions be converted to reference values by implicitly creating a temporary variable, with some restrictions.}. In an assignment context, the left-hand side operand type is always reduced to a single reference.
     45    \item For a variable $x$ with declared type $T$, the variable-expression $x$ has type reference to $T$, even if $T$ itself is a reference type.
     46    \item For an expression $e$ with type $T\ \&_1...\&_n$, \ie $T$ followed by $n$ references, where $T$ is not a reference type, the expression $\&T$ (address of $T$) has type $T *$ followed by $n - 1$ references.
     47    \item For an expression $e$ with type $T *\&_1...\&_n$, \ie $T *$  followed by $n$ references, the expression $* T$ (dereference $T$) has type $T$ followed by $n + 1$ references.
     48        This is the reverse of the previous rule, such that address-of and dereference operators are perfect inverses.
     49    \item When matching parameter and argument types in a function call context, the number of references on the argument type is stripped off to match the number of references on the parameter type.\footnote{
     50        \CFA handles the \lstinline{const} Hell problem by allowing rvalue expressions to be converted to reference values by implicitly creating a temporary variable, with some restrictions.}
     51        In an assignment context, the left-hand-side operand-type is always reduced to a single reference.
    3652\end{enumerate}
    37 
    38 Under this ruleset, in a function call context, a type parameter will never be bound to a reference type. For example given the declarations
    39 
    40 \begin{cfa}
    41     forall (T) void f (T&);
    42 
    43     int &x;
    44 \end{cfa}
    45 
    46 The call f(x); will apply implicit dereference once to x so the call is typed f(int\&) with T=int, rather than with T=int\&.
    47 
    48 While initially the design of reference types in \CFA seeks to make it more like a "real" data type than reference in \CC, which mostly only serves the purpose of choosing argument-passing methods (by-value or by-reference) in function calls, the inherent ambiguity of auto-dereferencing still limits the behavior of reference types in \CFA polymorphic functions. Moreover, there is also some discrepancy of how the reference types are treated in initialization and assignment expressions. In the former case no implicit dereference is applied at all (see line 3 of example code) and in the latter case there is actually no assignment operators defined for reference types; the reassignment of reference variables uses the assignment operators for pointer types instead. There is also an annoying issue (although purely syntactic) that to pass in a null value for reference initialization one has to write \texttt{int \& r1 = *0p;} which looks like dereferencing a null pointer, but the dereferencing operation does not actually happen and the expression is eventually translated into initializing the underlying pointer value to null.
    49 
    50 This second point of difference would prevent the type system to treat reference types the same way as other types in many cases even if we allow type variables to be bound to reference types. This is because \CFA uses the common "object" trait (constructor, destructor and assignment operators) to handle passing dynamic concrete type arguments into polymorphic functions, and the reference types are handled differently in these contexts so they do not satisfy this common interface.
    51 
    52 When generic types are introduced to \CFA, some thoughts had been put into allowing reference types as type arguments. While it is possible to write a declaration such as \texttt{vector(int\&)} for a container of reference variables, it will be disallowed in assertion checking if the generic type in question requires the object trait for the type argument (a fairly common use case) and even if the object trait can be made as non-required, the current type system often misbehaves by adding undesirable auto-dereference and operate on the referenced-to value rather than the reference variable itself as intended. Some tweaks would have to be made to accommodate reference types in polymorphic contexts and we are still not sure of what can or cannot be achieved. Currently we have to reside on using pointer types and giving up the benefits of auto-dereference operations on reference types.
    53 
     53Under this ruleset, a type parameter is never bound to a reference type in a function-call context.
     54\begin{cfa}
     55forall( T ) void f( T & );
     56int & x;
     57f( x );  // implicit dereference
     58\end{cfa}
     59The call applies an implicit dereference once to @x@ so the call is typed @f( int & )@ with @T = int@, rather than with @T = int &@.
     60
     61As for a pointer type, a reference type may have qualifiers, where @const@ is most interesting.
     62\begin{cfa}
     63int x = 3; $\C{// mutable}$
     64const int cx = 5; $\C{// immutable}$
     65int * const cp = &x, $\C{// immutable pointer}$
     66        & const cr = cx;
     67const int * const ccp = &cx, $\C{// immutable value and pointer}$
     68                        & const ccr = cx;
     69// pointer
     70*cp = 7;
     71cp = &x; $\C{// error, assignment of read-only variable}$
     72*ccp = 7; $\C{// error, assignment of read-only location}$
     73ccp = &cx; $\C{// error, assignment of read-only variable}$
     74// reference
     75cr = 7;
     76cr = &x; $\C{// error, assignment of read-only variable}$
     77*ccr = 7; $\C{// error, assignment of read-only location}$
     78ccr = &cx; $\C{// error, assignment of read-only variable}$
     79\end{cfa}
     80Interestingly, C does not give a warning/error if a @const@ pointer is not initialized, while \CC does.
     81Hence, type @& const@ is similar to \CC reference, but \CFA does not preclude initialization with a non-variable address.
     82For example, in system's programming, there are cases where an immutable address is initialized to a specific memory location.
     83\begin{cfa}
     84int & const mem_map = *0xe45bbc67@p@; $\C{// hardware mapped registers ('p' for pointer)}$
     85\end{cfa}
     86Finally, qualification is generalized across all pointer/reference declarations.
     87\begin{cfa}
     88const * const * const * const ccccp = ...
     89const & const & const & const ccccr = ...
     90\end{cfa}
     91
     92In the initial \CFA reference design, the goal was to make the reference type a \emph{real} data type \vs a restricted \CC reference, which is mostly used for choosing the argument-passing method, by-value or by-reference.
     93However, there is an inherent ambiguity for auto-dereferencing: every argument expression involving a reference variable can potentially mean passing the reference's value or address.
     94Without any restrictions, this ambiguity limits the behaviour of reference types in \CFA polymorphic functions, where a type @T@ can bind to a reference or non-reference type.
     95This ambiguity prevents the type system treating reference types the same way as other types in many cases even if type variables could be bound to reference types.
     96The reason is that \CFA uses a common \emph{object} trait (constructor, destructor and assignment operators) to handle passing dynamic concrete type arguments into polymorphic functions, and the reference types are handled differently in these contexts so they do not satisfy this common interface.
     97
     98Moreover, there is also some discrepancy in how the reference types are treated in initialization and assignment expressions.
     99For example, in line 3 of the previous example code:
     100\begin{cfa}
     101int @&@ r1 = x,  @&&@ r2 = r1,   @&&&@ r3 = r2; $\C{// references to x}$
     102\end{cfa}
     103each initialization expression is implicitly dereferenced to match the types, \eg @&x@, because an address is always required and a variable normally returns its value;
     104\CC does the same implicit dereference when initializing its reference variables.
     105For lines 6 and 9 of the previous example code:
     106\begin{cfa}
     107 r1 =  3;       r2 = 3;         r3 = 3;                         $\C{// change x: implicit dereference *r1, **r2, ***r3}$
     108@&@r3 = @&@y; @&&@r3 = @&&@r4;                          $\C{// change r1, r2}$
     109\end{cfa}
     110there are no actual assignment operators defined for reference types that can be overloaded;
     111instead, all reference assignments are handled by semantic actions in the type system.
     112In fact, the reassignment of reference variables is setup internally to use the assignment operators for pointer types.
     113Finally, there is an annoying issue (although purely syntactic) for setting a mutable reference to a specific address like null, @int & r1 = *0p@, which looks like dereferencing a null pointer.
     114Here, the expression is rewritten as @int & r1 = &(*0p)@, like the variable dereference of @x@ above.
     115However, the implicit @&@ needs to be cancelled for an address, which is done with the @*@, i.e., @&*@ cancel each other, giving @0p@.
     116Therefore, the dereferencing operation does not actually happen and the expression is translated into directly initializing the reference variable with the address.
     117Note, the same explicit reference is used in \CC to set a reference variable to null.
     118\begin{c++}
     119int & ip = @*@(int *)nullptr;
     120\end{c++}
     121which is used in certain systems-programming situations.
     122
     123When generic types were introduced to \CFA~\cite{Moss19}, some thought was given to allow reference types as type arguments.
     124\begin{cfa}
     125forall( T )
     126struct vector { T t; };
     127vector( int @&@ ) vec; $\C{// vector of references to ints}$
     128\end{cfa}
     129While it is possible to write a reference type as the argument to a generic type, it is disallowed in assertion checking, if the generic type requires the object trait for the type argument (a fairly common use case).
     130Even if the object trait can be made optional, the current type system often misbehaves by adding undesirable auto-dereference on the referenced-to value rather than the reference variable itself, as intended.
     131Some tweaks are necessary to accommodate reference types in polymorphic contexts and it is unclear what can or cannot be achieved.
     132Currently, there are contexts where \CFA programmer must use pointer types, giving up the benefits of auto-dereference operations and better syntax from reference types.
    54133
    55134
    56135\section{Tuple Types}
    57136
    58 The addition of tuple types to \CFA can be traced back to the original design by David Till in K-W C, a predecessor project of \CFA. The introduction of tuples was aiming to eliminate the need of having output parameters or defining an aggregate type in order to return multiple values from a function. In the K-W C design, tuples can be thought of as merely a syntactic sugar as it is not allowed to define a variable with tuple type. The usage of tuples are restricted to argument passing and assignments, and the translator implementation converts tuple assignments by expanding the tuple assignment expressions to assignments of each component, creating temporary variables to avoid unexpected side effects when necessary. As in the case of a function returning multiple values (thereafter called MVR functions), a struct type is created for the returning tuple and the values are extracted by field access operations.
    59 
    60 In an early implementation of tuples in \CFA made by Rodolfo Gabriel Esteves, a different strategy is taken to handle MVR functions. The return values are converted to output parameters passed in by pointers. When the return values of a MVR function are directly used in an assignment expression, the addresses of the left-hand operands can be directly passed in to the function; composition of MVR functions is handled by creating temporaries for the returns.
    61 
    62 Suppose we have a function returning two values as follows:
    63 
    64 \begin{cfa}
    65     [int, int] gives_two();
    66 
    67     int x,y;
    68     [x,y] = gives_two();
    69 \end{cfa}
    70 
    71 The K-W C implementation translates the program to
    72 
    73 \begin{cfa}
    74     struct _tuple2 { int _0; int _1; }
    75     struct _tuple2 gives_two();
    76     int x,y;
    77     struct _tuple2 _tmp = gives_two();
    78     x = _tmp._0; y = _tmp._1;
    79 \end{cfa}
    80 
    81 While the Rodolfo implementation translates it to
    82 
    83 \begin{cfa}
    84     void gives_two(int *, int *);
    85     int x,y;
    86     gives_two(&x, &y);
    87 \end{cfa}
    88 
    89 and inside the body of the function \text{gives\_two}, the return statement is rewritten to assignments into the passed-in addresses.
    90 
    91 The latter implementation looks much more concise, and in the case of returning values having nontrivial types (e.g. structs), this implementation can also save some unnecessary copying.
    92 
    93 Interestingly, in Robert Schluntz's rework of the tuple type, the implementation got reverted back to struct-based, and it remained in the current version of cfa-cc translator. During the same time of his work, generic types were being added into \CFA independently as another feature, and the tuple type was changed to use the same implementation techniques of generic types. Consequently, it made tuples become first-class values in \CFA.
    94 
    95 However, upon further investigation, making tuple types first-class has very little benefits in \CFA, mainly because that function call semantics with tuples are designed to be unstructured, and that since operator overloading in \CFA are implemented by treating every overloadable operator as functions, tuple types are very rarely used in a structured way. When a tuple-type expression appears in a function call (except assignment expressions, which are handled differently by mass- or multiple-assignment expansions), it is always flattened, and the tuple structure of function parameter is not considered a part of the function signature, for example
    96 
    97 \begin{cfa}
    98     void f(int, int);
    99     void f([int, int]);
    100 \end{cfa}
    101 
    102 are considered to have the same signature (a function taking two ints and returning nothing), and therefore not valid overloads. Furthermore, ordinary polymorphic type parameters are not allowed to have tuple types in order to restrict the expression resolution algorithm to not create too many argument-parameter matching options, such that the type-checking problem remains tractable and does not take too long to compute. Therefore tuple types are never present in any fixed-argument function calls.
    103 
    104 A type-safe variadic argument signature was proposed using \CFA's \texttt{forall} clause and a new tuple parameter type, denoted previously by the \texttt{ttype} keyword and now by the ellipsis syntax similar to \CC's template parameter pack.
    105 
    106 The C \texttt{printf} function, for example, can be rewritten using the new variadic argument, in favor of the C untyped \texttt{va\_list} interface as
    107 
    108 \begin{cfa}
    109     forall (TT...) int printf(char *fmt, TT args);
    110 \end{cfa}
    111 
    112 Note that this is just for illustration purposes, as type assertions are needed to actually achieve type safety, and \CFA's I/O library does not use a format string since argument types are inferred by the type system.
    113 
    114 There are two common patterns for using the variadic function in \CFA: one is to forward the arguments to another function
    115 
    116 \begin{cfa}
    117     forall(T*, TT... | {void ?{}(T &, TT);})
    118     T* new (T, TT) { return ((T*)malloc()){TT}; }
    119 \end{cfa}
    120 
    121 and the other is structural recursion which extracts arguments one at a time
    122 
    123 \begin{cfa}
    124     forall( ostype &, T, Params... | { ostype & ?|?( ostype &, T); ostype & ?|?( ostype &, Params ); } )
    125         ostype & ?|?( ostype & os, T arg, Params rest );
    126 \end{cfa}
    127 
    128 The above is the actual implementation of variadic print function in \CFA. \texttt{ostype} represents the output stream, similar to \CC's \texttt{ostream} interface. Note that recursion must be used in order to extract type information of the first argument in the list, as opposed to C \texttt{va\_list} variadics which uses a loop to extract each argument, and generally requires some companion data that provides type information, such as the format string in \texttt{printf}.
    129 
    130 Variadic polymorphic functions are somehow currently the only place tuple types are used in functions. And just like the case for user-defined generic types, many wrapper functions need to be generated to implement polymorphism with variadics. However, note that the only permitted operations on polymorphic function parameters are given by the assertion (trait) functions, and those eventually need to be supplied flattened tuple arguments, packing the variadic arguments into a rigid struct type and generating all the required wrapper functions become mostly wasted work. Interested readers can refer to pages 77-80 of Robert Schluntz's thesis to see how verbose the translator output needs to be to implement a simple variadic call with 3 arguments, and it will quickly become even worse if the number of arguments is increased: for a call with 5 arguments the translator would have to generate concrete struct types for a 4-tuple and a 3-tuple along with all the polymorphic type data for them! Instead, a much simpler approach of putting all variadic arguments into a data array and providing an offset array to retrieve each individual argument can be utilized. This method is very similar to how the C \texttt{va\_list} object is used, with \CFA type resolver validating and generating the required type information to guarantee type safety.
    131 
    132 The print function example
    133 
    134 \begin{cfa}
    135     forall(T, Params... | { void print(T); void print(Params ); })
    136     void print(T arg , Params rest) {
    137         print(arg);
    138         print(rest);
     137The addition of tuple types to \CFA can be traced back to the original design by David Till in \mbox{K-W C}~\cite{Till89,Buhr94a}, a predecessor project of \CFA.
     138The primary purpose of tuples is to eliminate output parameters or creating an aggregate type to return multiple values from a function, called a multiple-value-returning (MVR) function.
     139The following examples shows the two techniques for a function returning three values.
     140\begin{cquote}
     141\begin{tabular}{@{}l@{\hspace{20pt}}l@{}}
     142\begin{cfa}
     143
     144int foo( int &p2, int &p3 );  // in/out parameters
     145int x, y = 3, z = 4;
     146x = foo( y, z );  // return 3 values
     147\end{cfa}
     148&
     149\begin{cfa}
     150struct Ret { int x, y, z; };
     151Ret foo( int p2, int p3 );  // multiple return values
     152Ret ret = { .y = 3, .z = 4 };
     153ret = foo( ret.y, ret.z );  // return 3 values
     154\end{cfa}
     155\end{tabular}
     156\end{cquote}
     157where K-W C allows direct return of multiple values.
     158\begin{cfa}
     159@[int, int, int]@ foo( int p2, int p3 );
     160@[x, y, z]@ = foo( y, z );  // return 3 values into a tuple
     161\end{cfa}
     162Along with simplifying returning multiple values, tuples can be extended to simplify a number of other common context that normally require multiple statements and/or additional declarations, all of which reduces coding time and errors.
     163\begin{cfa}
     164[x, y, z] = 3; $\C[2in]{// x = 3; y = 3; z = 3, where types are different}$
     165[x, y] = [y, x]; $\C{// int tmp = x; x = y; y = tmp;}$
     166void bar( int, int, int );
     167@bar@( foo( 3, 4 ) ); $\C{// int t0, t1, t2; [t0, t1, t2] = foo( 3, 4 ); bar( t0, t1, t2 );}$
     168x = foo( 3, 4 )@.1@; $\C{//  int t0, t1, t2; [t0, t1, t2] = foo( 3, 4 ); x = t1;}\CRT$
     169\end{cfa}
     170For the call to @bar@, the three results from @foo@ are \newterm{flattened} into individual arguments.
     171Flattening is how tuples interact with parameter and subscript lists, and with other tuples, \eg:
     172\begin{cfa}
     173[ [ x, y ], z, [a, b, c] ] = [2, [3, 4], foo( 3, 4) ]  $\C{// structured}$
     174[ x, y, z, a, b, c] = [2, 3, 4, foo( 3, 4) ]  $\C{// flattened, where foo results are t0, t1, t2}$
     175\end{cfa}
     176
     177Note, the \CFA type-system supports complex composition of tuples and C type conversions using a costing scheme giving lower cost to widening conversions that do not truncate a value.
     178\begin{cfa}
     179[ int, int ] foo$\(_1\)$( int );                        $\C{// overloaded foo functions}$
     180[ double ] foo$\(_2\)$( int );
     181void bar( int, double, double );
     182bar( foo( 3 ), foo( 3 ) );
     183\end{cfa}
     184The type resolver only has the tuple return types to resolve the call to @bar@ as the @foo@ parameters are identical, which involves unifying the flattened @foo@ return values with @bar@'s parameter list.
     185However, no combination of @foo@s is an exact match with @bar@'s parameters;
     186thus, the resolver applies C conversions to obtain a best match.
     187The resulting minimal cost expression is @bar( foo@$_1$@( 3 ), foo@$_2$@( 3 ) )@, where the two possible coversions are (@int@, {\color{red}@int@}, @double@) to (@int@, {\color{red}@double@}, @double@) with a safe (widening) conversion from @int@ to @double@ versus ({\color{red}@double@}, {\color{red}@int@}, {\color{red}@int@}) to ({\color{red}@int@}, {\color{red}@double@}, {\color{red}@double@}) with one unsafe (narrowing) conversion from @double@ to @int@ and two safe conversions from @int@ to @double@.
     188The programming language Go provides a similar but simplier tuple mechanism, as it does not have overloaded functions.
     189
     190The K-W C tuples are merely syntactic sugar, as there is no mechanism to define a variable with tuple type.
     191For the tuple-returning implementation, an implicit @struct@ type is created for the returning tuple and the values are extracted by field access operations.
     192For the tuple-assignment implementation, the left-hand tuple expression is expanded into assignments of each component, creating temporary variables to avoid unexpected side effects.
     193For example, a structure is returned from @foo@ and its fields are individually assigned to the left-hand variables, @x@, @y@, @z@.
     194
     195In the second implementation of \CFA tuples by Rodolfo Gabriel Esteves~\cite{Esteves04}, a different strategy is taken to handle MVR functions.
     196The return values are converted to output parameters passed in by pointers.
     197When the return values of a MVR function are directly used in an assignment expression, the addresses of the left-hand operands can be directly passed into the function;
     198composition of MVR functions is handled by creating temporaries for the returns.
     199For example, given a function returning two values:
     200\begin{cfa}
     201[int, int] gives_two() { int r1, r2; ... return [ r1, r2 ]; }
     202int x, y;
     203[x, y] = gives_two();
     204\end{cfa}
     205The K-W C implementation translates the program to:
     206\begin{cfa}
     207struct _tuple2 { int _0; int _1; }
     208struct _tuple2 gives_two();
     209int x, y;
     210struct _tuple2 _tmp = gives_two();
     211x = _tmp._0; y = _tmp._1;
     212\end{cfa}
     213While the Rodolfo implementation translates it to:
     214\begin{cfa}
     215void gives_two( int * r1, int * r2 ) { ... *r1 = ...; *r2 = ...; return; }
     216int x, y;
     217gives_two( &x, &y );
     218\end{cfa}
     219and inside the body of the function @gives_two@, the return statement is rewritten as assignments into the passed-in argument addresses.
     220This implementation looks more concise, and in the case of returning values having nontrivial types (\eg aggregates), this implementation saves unnecessary copying.
     221For example,
     222\begin{cfa}
     223[ x, y ] gives_two();
     224int x, y;
     225[ x, y ] = gives_two();
     226\end{cfa}
     227becomes
     228\begin{cfa}
     229void gives_two( int &, int & );
     230int x, y;
     231gives_two( x, y );
     232\end{cfa}
     233eliminiating any copying in or out of the call.
     234The downside is indirection within @gives_two@ to access values, unless values get hoisted into registers for some period of time, which is common.
     235
     236Interestingly, in the third implementation of \CFA tuples by Robert Schluntz~\cite[\S~3]{Schluntz17}, the tuple type reverts back to structure based, where it remains in the current version of the cfa-cc translator.
     237The reason for the reversion was to make tuples become first-class types in \CFA, \ie allow tuple variables.
     238This extension was possible, because in parallel with Schluntz's work, generic types were being added independently by Moss~\cite{Moss19}, and the tuple variables leveraged the same implementation techniques as the generic variables.
     239
     240However, after experience gained building the \CFA runtime system, making tuple-types first-class seems to add little benefit.
     241The main reason is that tuples usages are largely unstructured,
     242\begin{cfa}
     243[int, int] foo( int, int ); $\C[2in]{// unstructured function}$
     244typedef [int, int] Pair; $\C{// tuple type}$
     245Pair bar( Pair ); $\C{// structured function}$
     246int x = 3, y = 4;
     247[x, y] = foo( x, y ); $\C{// unstructured call}$
     248Pair ret = [3, 4]; $\C{// tuple variable}$
     249ret = bar( ret ); $\C{// structured call}\CRT$
     250\end{cfa}
     251Basically, creating the tuple-type @Pair@ is largely equivalent to creating a @struct@ type, and creating more types and names defeats the simplicity that tuples are trying to achieve.
     252Furthermore, since operator overloading in \CFA is implemented by treating operators as overloadable functions, tuple types are very rarely used in a structured way.
     253When a tuple-type expression appears in a function call (except assignment expressions, which are handled differently by mass- or multiple-assignment expansions), it is always flattened, and the tuple structure of function parameter is not considered a part of the function signatures.
     254For example,
     255\begin{cfa}
     256void f( int, int );
     257void f( [int, int] );
     258f( 3, 4 );  // ambiguous call
     259\end{cfa}
     260the two prototypes for @foo@ have the same signature (a function taking two @int@s and returning nothing), and therefore invalid overloads.
     261Note, the ambiguity error occurs at the call rather than at the second declaration of @f@, because it is possible to have multiple equivalent prototype definitions of a function.
     262Furthermore, ordinary polymorphic type-parameters are not allowed to have tuple types.
     263\begin{cfa}
     264forall( T ) T foo( T );
     265int x, y, z;
     266[x, y, z] = foo( [x, y, z] );  // substitute tuple type for T
     267\end{cfa}
     268Without this restriction, the expression resolution algorithm can create too many argument-parameter matching options.
     269For example, with multiple type parameters,
     270\begin{cfa}
     271forall( T, U ) void f( T, U );
     272f( [1, 2, 3, 4] );
     273\end{cfa}
     274the call to @f@ can be interpreted as @T = [1]@ and @U = [2, 3, 4, 5]@, or @T = [1, 2]@ and @U = [3, 4, 5]@, and so on.
     275The restriction ensures type checking remains tractable and does not take too long to compute.
     276Therefore, tuple types are never present in any fixed-argument function calls.
     277
     278Finally, a type-safe variadic argument signature was added by Robert Schluntz~\cite[\S~4.1.2]{Schluntz17} using @forall@ and a new tuple parameter-type, denoted by the keyword @ttype @ in Schluntz's implementation, but changed to the ellipsis syntax similar to \CC's template parameter pack.
     279For C variadics, the number and types of the arguments must be conveyed in some way, \eg @printf@ uses a format string indicating the number and types of the arguments.
     280\VRef[Figure]{f:CVariadicMaxFunction} shows an $N$ argument @maxd@ function using the C untyped @va_list@ interface.
     281In the example, the first argument is the number of following arguments, and the following arguments are assumed to be @double@;
     282looping is used to traverse the argument pack from left to right.
     283The @va_list@ interface is walking up (by address) the stack looking at the arguments pushed by the caller.
     284(Magic knowledge is needed for arguments pushed using registers.)
     285
     286\begin{figure}
     287\begin{cfa}
     288double maxd( int @count@, ... ) {
     289    double max = 0;
     290    va_list args;
     291    va_start( args, count );
     292    for ( int i = 0; i < count; i += 1 ) {
     293        double num = va_arg( args, double );
     294        if ( num > max ) max = num;
    139295    }
    140 \end{cfa}
    141 
    142 using the offset array approach, can be converted to pseudo-\CFA code (ignoring type assertions for T) as
    143 
    144 \begin{cfa}
    145     void print(T arg, char* _data_rest, size_t* _offset_rest) {
    146         print(arg);
    147         print(*((typeof rest.0)*) _data_rest, // first element of rest
    148             _data_rest + _offset_rest[0],  // remainder of data
    149             _offset_rest + 1);  // remainder of offset array
    150     }
    151 \end{cfa}
    152 
    153 where the fixed-arg polymorphism for T can be handled by the standard \texttt{void*}-based \CFA polymorphic calling conventions, and the type information can all be deduced at the call site.
    154 
    155 Turning tuples into first-class values in \CFA does have a few benefits, namely allowing pointers to tuples and arrays of tuples to exist. However it seems very unlikely that these types can have realistic use cases that are hard to achieve without them. And indeed having the pointer-to-tuple type to exist at all will potentially forbid the simple offset-array implementation of variadic polymorphism (in case that a type assertion requests the pointer type \texttt{Params*} in the above example, forcing the tuple type to be materialized as a struct), and thus incurring a high cost. Perhaps it is of best interest to keep tuples as non-first-class, as Rodolfo originally describes them to "[does] not enforce a particular memory layout, and in particular, [does] not guarantee that the components of a tuple occupy a contiguous region of memory," and therefore to be able to use the simplified implementations for MVR and variadic functions.
    156 
    157 One final topic worth discussing is that the strategy of converting return values to output parameters can be utilized to implement copy elision, which is relevant for \CFA since constructors are introduced to the language. However, the first example given in this section
    158 
    159 \begin{cfa}
    160     int x,y;
    161     [x,y] = gives_two();
    162 \end{cfa}
    163 
    164 actually \textit{cannot} have copy elision applied, since the call to \texttt{gives\_two} appears in an \textit{assignment} context rather than an initialization context, as the variables x and y may be already initialized. Unfortunately \CFA currently does not support declaring variables in tuple form:
    165 
    166 \begin{cfa}
    167     [int x, int y] = gives_two(); // NOT ALLOWED
    168 \end{cfa}
    169 
    170 It is possible to declare a tuple-typed variable and call MVR functions in initialization context
    171 
    172 \begin{cfa}
    173     [int, int] ret = gives_two(); // OK
    174 \end{cfa}
    175 
    176 but using the values is more awkward as we cannot give them separate names and have to use \texttt{ret.0} or \texttt{ret.1} to extract the values. If copy elision semantics were to be added to \CFA it would be preferable to allow declaring variables in tuple form to have the benefit of eliding copy construction while giving each variable a unique name.
    177 
    178 \section{Plan-9 Struct Inheritance}
    179 
    180 Plan-9 Inheritance is a non-standard C feature originally introduced by the C dialect used in Bell Labs' Plan-9 research operating system, and is supported by mainstream C compilers such as GCC and Clang. This feature allows an aggregate type (struct or union) to be embedded into another one with implicit access semantics similar to anonymous substructures.
    181 
    182 In standard C, it is possible to define a field with an anonymous struct or union type within another. This is often utilized to implement a tagged union:
    183 
    184 \begin{cfa}
    185 
     296    va_end(args);
     297    return max;
     298}
     299printf( "%g\n", maxd( @4@, 25.0, 27.3, 26.9, 25.7 ) );
     300\end{cfa}
     301\caption{C Variadic Maximum Function}
     302\label{f:CVariadicMaxFunction}
     303\end{figure}
     304
     305There are two common patterns for using the variadic functions in \CFA.
     306\begin{enumerate}[leftmargin=*]
     307\item
     308Argument forwarding to another function, \eg:
     309\begin{cfa}
     310forall( T *, TT ... | { @void ?{}( T &, TT );@ } ) // constructor assertion
     311T * new( TT tp ) { return ((T *)malloc())@{@ tp @}@; }  // call constructor on storage
     312\end{cfa}
     313Note, the assertion on @T@ requires it to have a constructor @?{}@.
     314The function @new@ calls @malloc@ to obtain storage and then invokes @T@'s constructor passing the tuple pack by flattening it over the constructor's arguments, \eg:
     315\begin{cfa}
     316struct S { int i, j; };
     317void ?{}( S & s, int i, int j ) { s.[ i, j ] = [ i, j ]; }  // constructor
     318S * sp = new( 3, 4 );  // flatten [3, 4] into call ?{}( 3, 4 );
     319\end{cfa}
     320\item
     321Structural recursion for processing the argument-pack values one at a time, \eg:
     322\begin{cfa}
     323forall( T | { int ?>?( T, T ); } )
     324T max( T v1, T v2 ) { return v1 > v2 ? v1 : v2; }
     325$\vspace{-10pt}$
     326forall( T, TT ... | { T max( T, T ); T max( TT ); } )
     327T max( T arg, TT args ) { return max( arg, max( args ) ); }
     328\end{cfa}
     329The first non-recursive @max@ function is the polymorphic base-case for the recursion, \ie, find the maximum of two identically typed values with a greater-than (@>@) operator.
     330The second recursive @max@ function takes two parameters, a @T@ and a @TT@ tuple pack, handling all argument lengths greater than two.
     331The recursive function computes the maximum for the first argument and the maximum value of the rest of the tuple pack.
     332The call of @max@ with one argument is the recursive call, where the tuple pack is converted into two arguments by taking the first value (lisp @car@) from the tuple pack as the first argument (flattening) and the remaining pack becomes the second argument (lisp @cdr@).
     333The recursion stops when the argument pack is empty.
     334For example, @max( 2, 3, 4 )@ matches with the recursive function, which performs @return max( 2, max( [3, 4] ) )@ and one more step yields @return max( 2, max( 3, 4 ) )@, so the tuple pack is empty.
     335\end{enumerate}
     336
     337As an aside, polymorphic functions are precise with respect to their parameter types, \eg @max@ states all argument values must be the same type, which logically makes sense.
     338However, this precision precludes normal C conversions among the base types, \eg, this mix-mode call @max( 2h, 2l, 3.0f, 3.0ld )@ fails because the types are not the same.
     339Unfortunately, this failure violates programmer intuition because there are specialized two-argument non-polymorphic versions of @max@ that work, \eg @max( 3, 3.5 )@.
     340Allowing C conversions for polymorphic types will require a significant change to the type resolver.
     341
     342Currently in \CFA, variadic polymorphic functions are the only place tuple types are used.
     343And because \CFA compiles polymorphic functions versus template expansion, many wrapper functions are generated to implement both user-defined generic-types and polymorphism with variadics.
     344Fortunately, the only permitted operations on polymorphic function parameters are given by the list of assertion (trait) functions.
     345Nevertheless, this small set of functions eventually need to be called with flattened tuple arguments.
     346Unfortunately, packing the variadic arguments into a rigid @struct@ type and generating all the required wrapper functions is significant work and largely wasted because most are never called.
     347Interested readers can refer to pages 77-80 of Robert Schluntz's thesis to see how verbose the translator output is to implement a simple variadic call with 3 arguments.
     348As the number of arguments increases, \eg a call with 5 arguments, the translator generates a concrete @struct@ types for a 4-tuple and a 3-tuple along with all the polymorphic type data for them.
     349An alternative approach is to put the variadic arguments into an array, along with an offset array to retrieve each individual argument.
     350This method is similar to how the C @va_list@ object is used (and how \CFA accesses polymorphic fields in a generic type), but the \CFA variadics generate the required type information to guarantee type safety.
     351For example, given the following heterogeneous, variadic, typed @print@ and usage.
     352\begin{cquote}
     353\begin{tabular}{@{}ll@{}}
     354\begin{cfa}
     355forall( T, TT ... | { void print( T ); void print( TT ); } )
     356void print( T arg , TT rest ) {
     357        print( arg );
     358        print( rest );
     359}
     360\end{cfa}
     361&
     362\begin{cfa}
     363void print( int i ) { printf( "%d ", i ); }
     364void print( double d ) { printf( "%g ", d ); }
     365... // other types
     366int i = 3 ; double d = 3.5;
     367print( i, d );
     368\end{cfa}
     369\end{tabular}
     370\end{cquote}
     371it would look like the following using the offset-array implementation approach.
     372\begin{cfa}
     373void print( T arg, char * _data_rest, size_t * _offset_rest ) {
     374        print( arg );
     375        print( *((typeof rest.0)*) _data_rest,  $\C{// first element of rest}$
     376                  _data_rest + _offset_rest[0],  $\C{// remainder of data}$
     377                  _offset_rest + 1);  $\C{// remainder of offset array}$
     378}
     379\end{cfa}
     380where the fixed-arg polymorphism for @T@ can be handled by the standard @void *@-based \CFA polymorphic calling conventions, and the type information can all be deduced at the call site.
     381Note, the variadic @print@ supports heterogeneous types because the polymorphic @T@ is not returned (unlike variadic @max@), so there is no cascade of type relationships.
     382
     383Turning tuples into first-class values in \CFA does have a few benefits, namely allowing pointers to tuples and arrays of tuples to exist.
     384However, it seems unlikely that these types have realistic use cases that cannot be achieved without them.
     385And having a pointer-to-tuple type potentially forbids the simple offset-array implementation of variadic polymorphism.
     386For example, in the case where a type assertion requests the pointer type @TT *@ in the above example, it forces the tuple type to be a @struct@, and thus incurring a high cost.
     387My conclusion is that tuples should not be structured (first-class), rather they should be unstructured.
     388This agrees with Rodolfo's original describes
     389\begin{quote}
     390As such, their [tuples] use does not enforce a particular memory layout, and in particular, does not guarantee that the components of a tuple occupy a contiguous region of memory.~\cite[pp.~74--75]{Esteves04}
     391\end{quote}
     392allowing the simplified implementations for MVR and variadic functions.
     393
     394Finally, a missing feature for tuples is using an MVR in an initialization context.
     395Currently, this feature is \emph{only} possible when declaring a tuple variable.
     396\begin{cfa}
     397[int, int] ret = gives_two();  $\C{// no constructor call (unstructured)}$
     398Pair ret = gives_two();  $\C{// constructor call (structured)}$
     399\end{cfa}
     400However, this forces the programer to use a tuple variable and possibly a tuple type to support a constructor, when they actually want separate variables with separate constructors.
     401And as stated previously, type variables (structured tuples) are rare in general \CFA programming so far.
     402To address this issue, while retaining the ability to leverage constructors, the following new tuple-like declaration syntax is proposed.
     403\begin{cfa}
     404[ int x, int y ] = gives_two();
     405\end{cfa}
     406where the semantics is:
     407\begin{cfa}
     408T t0, t1;
     409[ t0, t1 ] = gives_two();
     410T x = t0;  // constructor call
     411T y = t1;  // constructor call
     412\end{cfa}
     413and the implementation performs as much copy elision as possible.
     414
     415
     416\section{\lstinline{inline} Substructure}
     417
     418C allows an anonymous aggregate type (@struct@ or @union@) to be embedded (nested) within another one, \eg a tagged union.
     419\begin{cfa}
     420struct S {
     421        unsigned int tag;
     422        union { $\C{// anonymous nested aggregate}$
     423                int x;  double y;  char z;
     424        };
     425} s;
     426\end{cfa}
     427The @union@ field-names are hoisted into the @struct@, so there is direct access, \eg @s.x@;
     428hence, field names must be unique.
     429For a nested anonymous @struct@, both field names and values are hoisted.
     430\begin{cquote}
     431\begin{tabular}{@{}l@{\hspace{35pt}}l@{}}
     432original & rewritten \\
     433\begin{cfa}
     434struct S {
     435        struct { int i, j; };
     436        struct { int k, l; };
     437};
     438\end{cfa}
     439&
     440\begin{cfa}
     441struct S {
     442        int i, j;
     443        int k, l;
     444};
     445\end{cfa}
     446\end{tabular}
     447\end{cquote}
     448
     449As an aside, C nested \emph{named} aggregates behave in a (mysterious) way because the nesting is allowed but there is no ability to use qualification to access an inner type, like the \CC type operator `@::@'.
     450In fact, all named nested aggregates are hoisted to global scope, regardless of the nesting depth.
     451\begin{cquote}
     452\begin{tabular}{@{}l@{\hspace{35pt}}l@{}}
     453original & rewritten \\
     454\begin{cfa}
     455struct S {
     456        struct T {
     457                int i, j;
     458        };
     459        struct U {
     460                int k, l;
     461        };
     462};
     463\end{cfa}
     464&
     465\begin{cfa}
    186466struct T {
    187   unsigned int tag;
    188   union {
    189     int x;
    190     double y;
    191     char z;
    192   };
    193 } t;
    194 \end{cfa}
    195 
    196 The union fields can be directly accessed using their names, such as \texttt{T.x}. With Plan-9 extensions enabled, the same can be applied to a struct or union type defined elsewhere. \CFA uses the inline specifier to denote the anonymously embedded field.
    197 
    198 In GCC it is possible to simply use\texttt{struct B \{struct A;\}}
    199 for the Plan-9 feature; since \CFA no longer requires the struct and union keywords in variable declarations, having a keyword to denote Plan-9 inheritance is preferable.
    200 
    201 \begin{cfa}
    202   struct A {int x;};
    203 
    204   struct B {
    205     inline A;
    206     int y;
    207   };
    208 
    209   B b;
    210   b.x; // accesses the embedded struct A's field
    211 \end{cfa}
    212 
    213 As the \CFA translator simply just reduce the source code to C, usually the non-standard C features do not need any special treatment, and are directly passed down to the C compiler. However, the Plan-9 semantics allow implicit conversions from the outer type to the inner type, which means the type checking algorithm must take that information into account. Therefore, the \CFA translator must implement the Plan-9 features and insert the type conversions into the translated code output. In the current version of \CFA, this is the only kind of implicit type conversion other than the standard C conversions.
    214 
    215 Since variable overloading is possible, \CFA's implementation of Plan-9 inheritance allows duplicate field names. When an outer field and an embedded field have the same name and type, the inner field is shadowed and cannot be accessed directly by name. While such definitions are allowed, using duplicate names is not good practice in general and should be avoided if possible.
    216 
    217 Plan-9 fields can be nested, and a struct definition can contain multiple Plan-9 embedded fields. In particular, the "diamond pattern" can occur and result in a nested field to be embedded twice.
    218 
    219 \begin{cfa}
    220   struct A {int x;};
    221   struct B {inline A;};
    222   struct C {inline A;};
    223 
    224   struct D {
    225     inline B;
    226     inline C;
    227   };
    228 
    229   D d;
    230 \end{cfa}
    231 
    232 In the above example, the expression \texttt{d.x} becomes ambiguous, since it can refer to the indirectly embedded field either from B or from C. It is still possible to disambiguate the expression by first casting the outer struct to one of the directly embedded type, such as \texttt{((B)d).x}
    233 
    234 
    235 
    236 
     467        int i, j;
     468};
     469struct U {
     470        int k, l;
     471};
     472struct S {
     473};
     474\end{cfa}
     475\end{tabular}
     476\end{cquote}
     477Hence, the possible accesses are:
     478\begin{cfa}
     479struct S s; // s cannot access any fields
     480struct T t;  t.i;  t.j;
     481struct U u;  u.k;  u.l;
     482\end{cfa}
     483and the hoisted type names can clash with global types names.
     484For good reasons, \CC chose to change this semantics~\cite[C.1.2.3.3]{C++}:
     485\begin{description}[leftmargin=*,topsep=3pt,itemsep=0pt,parsep=0pt]
     486\item[Change:] A struct is a scope in C++, not in C.
     487\item[Rationale:] Class scope is crucial to C++, and a struct is a class.
     488\item[Effect on original feature:] Change to semantics of well-defined feature.
     489\item[Difficulty of converting:] Semantic transformation.
     490\item[How widely used:] C programs use @struct@ extremely frequently, but the change is only noticeable when @struct@, enumeration, or enumerator names are referred to outside the @struct@.
     491The latter is probably rare.
     492\end{description}
     493However, there is no syntax to access from a variable through a type to a field.
     494\begin{cfa}
     495struct S s;  @s::T@.i;  @s::U@.k;
     496\end{cfa}
     497
     498As an aside, \CFA also provides a backwards compatible \CC nested-type.
     499\begin{cfa}
     500struct S {
     501        @auto@ struct T {
     502                int i, j;
     503        };
     504        @auto@ struct U {
     505                int k, l;
     506        };
     507};
     508\end{cfa}
     509The keyword @auto@ denotes a local (scoped) declaration, and here, it implies a local (scoped) type, using dot as the type qualifier, \eg @S.T t@.
     510
     511% https://gcc.gnu.org/onlinedocs/gcc/Unnamed-Fields.html
     512
     513A polymorphic extension to nested aggregates appears in the Plan-9 C dialect, used in the Bell Labs' Plan-9 research operating system.
     514The feature is called \newterm{unnamed substructures}~\cite[\S~3.3]{Thompson90new}, which continues to be supported by @gcc@ and @clang@ using the extension (@-fplan9-extensions@).
     515The goal is to provided the same effect of the nested aggregate with the aggregate type defined elsewhere, which requires it be named.
     516\begin{cfa}
     517union U {  $\C{// unnested named}$
     518        int x;  double y;  char z;
     519} u;
     520struct W {
     521        int i;  double j;  char k;
     522} w;
     523struct S {
     524        @struct W;@  $\C{// Plan-9 substructure}$
     525        unsigned int tag;
     526        @union U;@  $\C{// Plan-9 substructure}$
     527} s;
     528\end{cfa}
     529Note, the position of the substructure is normally unimportant.
     530Like the anonymous nested types, the aggregate field names are hoisted into @struct S@, so there is direct access, \eg @s.x@ and @s.i@.
     531However, like the implicit C hoisting of nested structures, the field names must be unique and the type names are now at a different scope level, unlike type nesting in \CC.
     532In addition, a pointer to a structure is automatically converted to a pointer to an anonymous field for assignments and function calls, providing containment inheritance with implicit subtyping, \ie @U@ $\subset$ @S@ and @W@ $\subset$ @S@.
     533For example:
     534\begin{cfa}
     535void f( union U * u );
     536void g( struct W * );
     537union U * up;
     538struct W * wp;
     539struct S * sp;
     540up = sp; $\C{// assign pointer to U in S}$
     541wp = sp; $\C{// assign pointer to W in S}$
     542f( &s ); $\C{// pass pointer to U in S}$
     543g( &s ); $\C{// pass pointer to W in S}$
     544\end{cfa}
     545
     546\CFA extends the Plan-9 substructure by allowing polymorphism for values and pointers.
     547The extended substructure is denoted using @inline@, allowing backwards compatibility to existing Plan-9 features.
     548\begin{cfa}
     549struct S {
     550        @inline@ W;  $\C{// extended Plan-9 substructure}$
     551        unsigned int tag;
     552        @inline@ U;  $\C{// extended Plan-9 substructure}$
     553} s;
     554\end{cfa}
     555Note, like \CC, \CFA allows optional prefixing of type names with their kind, \eg @struct@, @union@, and @enum@, unless there is ambiguity with variable names in the same scope.
     556The following shows both value and pointer polymorphism.
     557\begin{cfa}
     558void f( U, U * ); $\C{// value, pointer}$
     559void g( W, W * ); $\C{// value, pointer}$
     560U u, * up;
     561S s, * sp;
     562W w, * wp;
     563u = s;  up = sp; $\C{// value, pointer}$
     564w = s;  wp = sp; $\C{// value, pointer}$
     565f( s, &s ); $\C{// value, pointer}$
     566g( s, &s ); $\C{// value, pointer}$
     567\end{cfa}
     568
     569In general, non-standard C features (@gcc@) do not need any special treatment, as they are directly passed through to the C compiler.
     570However, the Plan-9 semantics allow implicit conversions from the outer type to the inner type, which means the \CFA type resolver must take this information into account.
     571Therefore, the \CFA translator must implement the Plan-9 features and insert necessary type conversions into the translated code output.
     572In the current version of \CFA, this is the only kind of implicit type conversion other than the standard C conversions.
     573
     574Since variable overloading is possible in \CFA, \CFA's implementation of Plan-9 polymorphism allows duplicate field names.
     575When an outer field and an embedded field have the same name and type, the inner field is shadowed and cannot be accessed directly by name.
     576While such definitions are allowed, duplicate field names is not good practice in general and should be avoided if possible.
     577Plan-9 fields can be nested, and a struct definition can contain multiple Plan-9 embedded fields.
     578In particular, the \newterm{diamond pattern}~\cite[\S~6.1]{Stroustrup89}\cite[\S~4]{Cargill91}  can occur and result in a nested field to be embedded twice.
     579\begin{cfa}
     580struct A { int x; };
     581struct B { inline A; };
     582struct C { inline A; };
     583struct D {
     584        inline B;
     585        inline C;
     586};
     587D d;
     588\end{cfa}
     589In the above example, the expression @d.x@ becomes ambiguous, since it can refer to the indirectly embedded field either from @B@ or from @C@.
     590It is still possible to disambiguate the expression by first casting the outer struct to one of the directly embedded type, such as @((B)d).x@.
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