System F

System F, also known as the (Girard–Reynolds) polymorphic lambda calculus or the second-order lambda calculus, is a typed lambda calculus that differs from the simply typed lambda calculus by the introduction of a mechanism of universal quantification over types. System F thus formalizes the notion of parametric polymorphism in programming languages, and forms a theoretical basis for languages such as Haskell and ML. System F was discovered independently by logician Jean-Yves Girard (1972) and computer scientist John C. Reynolds (1974).

Whereas simply typed lambda calculus has variables ranging over terms, and binders for them, System F additionally has variables ranging over types, and binders for them. As an example, the fact that the identity function can have any type of the form A→ A would be formalized in System F as the judgment

where is a type variable. The upper-case is traditionally used to denote type-level functions, as opposed to the lower-case which is used for value-level functions. (The superscripted means that the bound x is of type ; the expression after the colon is the type of the lambda expression preceding it.)

As a term rewriting system, System F is strongly normalizing. However, type inference in System F (without explicit type annotations) is undecidable. Under the Curry–Howard isomorphism, System F corresponds to the fragment of second-order intuitionistic logic that uses only universal quantification. System F can be seen as part of the lambda cube, together with even more expressive typed lambda calculi, including those with dependent types.

According to Girard, the "F" in System F was picked by chance.[1]

Typing rules

The typing rules of System F are those of simply typed lambda calculus with the addition of the following:

(1) (2)

where are types and is a type variable, and where in the latter rule the type may not be free in the type of any free variable of . The first rule is that of application, and the second is that of abstraction.[2]

Logic and predicates

The type is defined as: , where is a type variable. This means: is the type of all functions which take as input a type α and two expressions of type α, and produce as output an expression of type α (note that we consider to be right-associative.)

The following two definitions for the boolean values and are used, extending the definition of Church booleans:

(Note that the above two functions require three not two arguments. The latter two should be lambda expressions, but the first one should be a type. This fact is reflected in the fact that the type of these expressions is ; the universal quantifier binding the α corresponds to the Λ binding the alpha in the lambda expression itself. Also, note that is a convenient shorthand for , but it is not a symbol of System F itself, but rather a "meta-symbol". Likewise, and are also "meta-symbols", convenient shorthands, of System F "assemblies" (in the Bourbaki sense); otherwise, if such functions could be named (within System F), then there would be no need for the lambda-expressive apparatus capable of defining functions anonymously and for the fixed-point combinator, which works around that restriction.)

Then, with these two -terms, we can define some logic operators (which are of type ):

Note that in the definitions above, is a type argument to , specifying that the other two parameters that are given to are of type . As in Church encodings, there is no need for an IFTHENELSE function as one can just use raw -typed terms as decision functions. However, if one is requested:

will do. A predicate is a function which returns a -typed value. The most fundamental predicate is ISZERO which returns if and only if its argument is the Church numeral 0:

System F structures

System F allows recursive constructions to be embedded in a natural manner, related to that in Martin-Löf's type theory. Abstract structures (S) are created using constructors. These are functions typed as:

.

Recursivity is manifested when itself appears within one of the types . If you have of these constructors, you can define the type of as:

For instance, the natural numbers can be defined as an inductive datatype with constructors

The System F type corresponding to this structure is . The terms of this type comprise a typed version of the Church numerals, the first few of which are:

0 :=
1 :=
2 :=
3 :=

If we reverse the order of the curried arguments (i.e., ), then the Church numeral for is a function that takes a function f as argument and returns the th power of f. That is to say, a Church numeral is a higher-order function – it takes a single-argument function f, and returns another single-argument function.

Use in programming languages

The version of System F used in this article is as an explicitly typed, or Church-style, calculus. The typing information contained in λ-terms makes type-checking straightforward. Joe Wells (1994) settled an "embarrassing open problem" by proving that type checking is undecidable for a Curry-style variant of System F, that is, one that lacks explicit typing annotations.[3][4]

Wells's result implies that type inference for System F is impossible. A restriction of System F known as "Hindley–Milner", or simply "HM", does have an easy type inference algorithm and is used for many statically typed functional programming languages such as Haskell 98 and the ML family. Over time, as the restrictions of HM-style type systems have become apparent, languages have steadily moved to more expressive logics for their type systems. GHC a Haskell compiler, goes beyond HM (as of 2008) and uses System F extended with non-syntactic type equality;[5] non-HM features in OCaml's type system include GADT.[6][7]

The Girard-Reynolds Isomorphism

In second-order intuitionistic logic, the second-order polymorphic lambda calculus (F2) was discovered by Girard (1972) and independently by Reynolds (1974).[8] Girard proved the Representation Theorem: that in second-order intuitionistic predicate logic (P2), functions from the natural numbers to the natural numbers that can be proved total, form a projection from P2 into F2.[8] Reynolds proved the Abstraction Theorem: that every term in F2 satisfies a logical relation, which can be embedded into the logical relations P2.[8] Reynolds proved that a Girard projection followed by a Reynolds embedding form the identity, i.e., the Girard-Reynolds Isomorphism.[8]

System Fω

While System F corresponds to the first axis of Barendregt's lambda cube, System Fω or the higher-order polymorphic lambda calculus combines the first axis (polymorphism) with the second axis (type operators); it is a different, more complex system.

System Fω can be defined inductively on a family of systems, where induction is based on the kinds permitted in each system:

  • permits kinds:
    • (the kind of types) and
    • where and (the kind of functions from types to types, where the argument type is of a lower order)

In the limit, we can define system to be

That is, Fω is the system which allows functions from types to types where the argument (and result) may be of any order.

Note that although Fω places no restrictions on the order of the arguments in these mappings, it does restrict the universe of the arguments for these mappings: they must be types rather than values. System Fω does not permit mappings from values to types (Dependent types), though it does permit mappings from values to values ( abstraction), mappings from types to values ( abstraction, sometimes written ) and mappings from types to types ( abstraction at the level of types)

gollark: I see.
gollark: I mean, in general, what languages/stack would the esolangs esopeople are (EDIT: oops, I meant to write say) suited for such tasks?
gollark: I see.
gollark: Swap to Google Drive WHEN?
gollark: Not a webserver like nginx/apache/caddy.

See also

  • Existential types — the existentially quantified counterparts of universal types
  • System F<: — extends system F with subtyping
  • System U

Notes

  1. Girard, Jean-Yves (1986). "The system F of variable types, fifteen years later". Theoretical Computer Science. 45: 160. doi:10.1016/0304-3975(86)90044-7. However, in [3] it was shown that the obvious rules of conversion for this system, called F by chance, were converging.
  2. Geuvers H, Nordström B, Dowek G. "Proofs of Programs and Formalisation of Mathematics" (PDF).
  3. Wells, J.B. (2005-01-20). "Joe Wells's Research Interests". Heriot-Watt University.
  4. Wells, J.B. (1999). "Typability and type checking in System F are equivalent and undecidable". Ann. Pure Appl. Logic. 98 (1–3): 111–156. doi:10.1016/S0168-0072(98)00047-5."The Church Project: Typability and type checking in {S}ystem {F} are equivalent and undecidable". 29 September 2007. Archived from the original on 29 September 2007.
  5. "System FC: equality constraints and coercions". gitlab.haskell.org. Retrieved 2019-07-08.
  6. "OCaml 4.00.1 release notes". ocaml.org. 2012-10-05. Retrieved 2019-09-23.
  7. "OCaml 4.09 reference manual". 2012-09-11. Retrieved 2019-09-23.
  8. Philip Wadler (2005) The Girard-Reynolds Isomorphism (second edition) University of Edinburgh, Programming Languages and Foundations at Edinburgh

References

  • Girard, Jean-Yves (1971). "Une Extension de l'Interpretation de Gödel à l'Analyse, et son Application à l'Élimination des Coupures dans l'Analyse et la Théorie des Types". Proceedings of the Second Scandinavian Logic Symposium. Amsterdam. pp. 63–92. doi:10.1016/S0049-237X(08)70843-7.
  • Girard, Jean-Yves (1972), Interprétation fonctionnelle et élimination des coupures de l'arithmétique d'ordre supérieur (Ph.D. thesis) (in French), Université Paris 7CS1 maint: ref=harv (link).
  • Reynolds, John (1974). Towards a Theory of Type Structure.
  • Girard, Jean-Yves; Lafont, Yves; Taylor, Paul (1989). Proofs and Types. Cambridge University Press. ISBN 978-0-521-37181-0.
  • Wells, J. B. (1994). "Typability and type checking in the second-order lambda-calculus are equivalent and undecidable". Proceedings of the 9th Annual IEEE Symposium on Logic in Computer Science (LICS). pp. 176–185. doi:10.1109/LICS.1994.316068. ISBN 0-8186-6310-3. Postscript version

Further reading

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