Type compatibility the hard way
When writing in assembly language it is possible to operate on a sequence of bits as if it were an unsigned integer one moment and a floating-point number the next; it is the developer’s responsibility to ensure that a given sequence of bits is operated on in a consistent manner. The concept of type was initially introduced into computer languages to provide information to compilers, enabling them to generate the appropriate instructions for values having the specified type and where necessary to convert values from the representation used by one type to the representation used by a different type. At this early stage language designers tended to keep things simple and to think in terms of what made sense at the machine representation level when deciding which type conversions to permit (PL/1 was a notable exception and the convolutions that occurred to perform some type conversions are legendary).
It took around 10 years for high level languages to evolve to the point where developers had the ability to create their own named types; Pascal being an early, very well known and stand out example. Once developers could create their own types it became necessary to come up with general rules specifying when a compiler must treat two different types as compatible (i.e., be required to generate code to support some set of operations between variables having these two different types).
Most language designers chose the simple option; a type is compatible with another type if it has the same name (scoping/namespace/lookup rules effectively meant that “same name” was effectively the same as “same definition”). This simple option generally included various exceptions for the arithmetic types; developers did not like having to insert explicit casts for what they considered to be obvious conversions (languages such as Ada/CHILL provided a mechanism for developers to specify that a newly defined arithmetic type really was a completely new type that was not compatible with any other arithmetic type, an explicit cast could change this).
One of the few languages which took a non-simple approach to type compatibility was CHILL, a language for which I once spent over a year writing the semantics phase of a compiler. CHILL uses what is known as structural compatibility, i.e., essentially two types are compatible if they have the same layout in memory (the language definition actually uses the terms similar and equivalent rather than compatible and uses mode rather than type, here I will follow modern general terminology). This has obvious advantages when there is a need to overlay types used in different parts of a program onto the same location in storage (note, no requirements on the fields being the same). CHILL definitions look like a mixture of C and Pascal, unless you know PL/1 they can look odd to the uninitiated (I think I’ve got them right, my CHILL is very rusty), T_1
and T_2
are compatible:
T_1 = struct ( T_2 = struct ( f1 :int; f3 :int; f2 :int; f4 :int; ); ); |
T_1 = struct ( T_2 = struct ( f1 :int; f3 :int; f2 :int; f4 :int; ); );
Structural compatibility enables the creation some rather unusual compatible types, such as the following three types all being pair-wise compatible (the keyword ref
is use to specify pointer types):
T_3 = struct ( T_4 = struct ( T_5 = struct ( f1 :int; f4 :int; f7 :int; f2 :ref T_3; f5 :ref T_4; f8 :ref T_5; f3 :ref T_4; f6 :ref T_3; f9 :ref T_5; ); ); ); |
T_3 = struct ( T_4 = struct ( T_5 = struct ( f1 :int; f4 :int; f7 :int; f2 :ref T_3; f5 :ref T_4; f8 :ref T_5; f3 :ref T_4; f6 :ref T_3; f9 :ref T_5; ); ); );
Because types can be recursive it is possible for the compatibility checking code in the compiler to end up having to type check the type it is currently checking. The solution adopted by many CHILL compilers (not that there were ever many) was to associate an is_currently_being_checked
flag with every type’s symbol table entry, if during compatibility checking this flag has value TRUE for both types then they are both compatible otherwise the flag is set to TRUE for both types and checking continues (all flags are set to FALSE at the end of compatibility checking).
To check T_3
and T_4
In the above code set the is_currently_being_checked
flag to TRUE and iterate over the fields in each record. The first field pair have the same type, the second field pair are pointers to types we are already checking and therefore compatible, as are the third field pair, so the types are compatible. Checking T_3
and T_5
requires a second iteration through T_5
because of the pointer to T_4
which does not yet have its is_currently_being_checked
flag set.
Yours truely discovered that one flag was not sufficient to do fully correct compatibility checking. It is necessary to maintain a stack of locations (e.g., the structure field or procedure parameter where compatibility checking has to recurse to check a user defined type) in the two types being compared in order to detect that some types were not compatible. In the following example (involving pointer to procedure types; which is longer than I remember the actual instance I first discovered being, but I had to create it again from vague memories and my CHILL expertise has faded; suggestions welcome) types A
and B
would be considered compatible using the is_currently_being_checked
flag approach because by the time the last parameter is checked both symbol table flags have been set. You can see by inspection that types X
and Y
are not compatible (they have a different number of parameters to start with). Looking at the stack of previous compatibility checks for A
/B
would show that no X
/Y
compatibility check had yet been made and one would be needed for the third parameter (which would fail):
A = proc(X, Y, X); B = proc(C, proc(A, int), Y); C = proc(E); D = proc(A); E = proc(proc(X, proc(A, int), X)); X = proc(D); Y = proc(A, int); |
A = proc(X, Y, X); B = proc(C, proc(A, int), Y); C = proc(E); D = proc(A); E = proc(proc(X, proc(A, int), X)); X = proc(D); Y = proc(A, int);
The potential for complexity created by the use of structural compatibility is one reason why its use is rare. While it is possible to rationalize that CHILL was targeted at embedded telecommunication systems containing lots of code where memory costs can be significant, I suspect that those involved had a hardware mentality and a poor grasp of practical software engineering issues.
Incidentally, the design of the llvm type checking system relies on using an equality test to check for type equality. While this decision will increase the difficulty of integrating languages that use structural type compatibility into llvm, these languages are probably sufficiently rare that it is much more cost effective to make it simple to implement the more common languages.
Where did type compatibility go next? Well, over the last 20 years the juggernaut of object oriented design has pretty much excluded sophisticated non-OO type systems from mainstream languages (e.g., C++ and Java), but that is a topic for another article.
Recent Posts
Tags
Archives
- November 2024
- October 2024
- September 2024
- August 2024
- July 2024
- June 2024
- May 2024
- April 2024
- March 2024
- February 2024
- January 2024
- December 2023
- November 2023
- October 2023
- September 2023
- August 2023
- July 2023
- June 2023
- May 2023
- April 2023
- March 2023
- February 2023
- January 2023
- December 2022
- November 2022
- October 2022
- September 2022
- August 2022
- July 2022
- June 2022
- May 2022
- April 2022
- March 2022
- February 2022
- January 2022
- December 2021
- November 2021
- October 2021
- September 2021
- August 2021
- July 2021
- June 2021
- May 2021
- April 2021
- March 2021
- February 2021
- January 2021
- December 2020
- November 2020
- October 2020
- September 2020
- August 2020
- July 2020
- June 2020
- May 2020
- April 2020
- March 2020
- February 2020
- January 2020
- December 2019
- November 2019
- October 2019
- September 2019
- August 2019
- July 2019
- June 2019
- May 2019
- April 2019
- March 2019
- February 2019
- January 2019
- December 2018
- November 2018
- October 2018
- September 2018
- August 2018
- July 2018
- June 2018
- May 2018
- April 2018
- March 2018
- February 2018
- January 2018
- December 2017
- November 2017
- October 2017
- September 2017
- August 2017
- July 2017
- June 2017
- May 2017
- April 2017
- March 2017
- February 2017
- January 2017
- December 2016
- November 2016
- October 2016
- September 2016
- August 2016
- July 2016
- June 2016
- May 2016
- April 2016
- March 2016
- February 2016
- January 2016
- December 2015
- November 2015
- October 2015
- September 2015
- August 2015
- July 2015
- June 2015
- May 2015
- April 2015
- March 2015
- February 2015
- January 2015
- December 2014
- November 2014
- October 2014
- September 2014
- August 2014
- July 2014
- June 2014
- May 2014
- April 2014
- March 2014
- February 2014
- January 2014
- December 2013
- November 2013
- October 2013
- September 2013
- August 2013
- July 2013
- June 2013
- May 2013
- April 2013
- March 2013
- February 2013
- January 2013
- December 2012
- November 2012
- October 2012
- September 2012
- August 2012
- July 2012
- June 2012
- May 2012
- April 2012
- March 2012
- February 2012
- January 2012
- December 2011
- November 2011
- October 2011
- September 2011
- August 2011
- July 2011
- June 2011
- May 2011
- April 2011
- March 2011
- February 2011
- January 2011
- December 2010
- November 2010
- October 2010
- September 2010
- August 2010
- July 2010
- June 2010
- May 2010
- April 2010
- March 2010
- February 2010
- January 2010
- December 2009
- November 2009
- October 2009
- September 2009
- August 2009
- July 2009
- June 2009
- May 2009
- April 2009
- March 2009
- February 2009
- January 2009
- December 2008
Recent Comments