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##The simply-typed lambda calculus##
The untyped lambda calculus is pure. Pure in many ways: all variables
and lambdas, with no constants or other special symbols; also, all
functions without any types. As we'll see eventually, pure also in
the sense of having no side effects, no mutation, just pure
computation.
But we live in an impure world. It is much more common for practical
programming languages to be typed, either implicitly or explicitly.
Likewise, systems used to investigate philosophical or linguistic
issues are almost always typed. Types will help us reason about our
computations. They will also facilitate a connection between logic
and computation.
From a linguistic perspective, types are generalizations of (parts of)
programs. To make this comment more concrete: types are to (e.g.,
lambda) terms as syntactic categories are to expressions of natural
language. If so, if it makes sense to gather a class of expressions
together into a set of Nouns, or Verbs, it may also make sense to
gather classes of terms into a set labelled with some computational type.
Soon we will consider polymorphic type systems. First, however, we
will consider the simply-typed lambda calculus.
[Pedantic on. Why "simply typed"? Well, the type system is
particularly simple. As mentioned in class by Koji Mineshima, Church
tells us that "The simple theory of types was suggested as a
modification of Russell's ramified theory of types by Leon Chwistek in
1921 and 1922 and by F. P. Ramsey in 1926." This footnote appears in
Church's 1940 paper [A formulation of the simple theory of
types](church-simple-types.pdf). In this paper, as Will Starr
mentioned in class, Church does indeed write types by simple
apposition, without the ugly angle brackets and commas used by
Montague. Furthermore, he omits parentheses under the convention that
types associated to the *left*---the opposite of the modern
convention. This is ok, however, because he also reverses the order,
so that `te` is a function from objects of type `e` to objects of type
`t`. Cool paper! If you ever want to see Church numerals in their
native setting--but I'm getting ahead of my story. Pedantic off.]
There's good news and bad news: the good news is that the simply-type
lambda calculus is strongly normalizing: every term has a normal form.
We shall see that self-application is outlawed, so Ω can't even
be written, let alone undergo reduction. The bad news is that
fixed-point combinators are also forbidden, so recursion is neither
simple nor direct.
#Types#
We will have at least one ground type. For the sake of linguistic
familiarity, we'll use `e`, the type of individuals, and `t`, the type
of truth values.
In addition, there will be a recursively-defined class of complex
types `T`, the smallest set such that
* ground types, including `e` and `t`, are in `T`
* for any types σ and τ in `T`, the type σ -->
τ is in `T`.
For instance, here are some types in `T`:
e
e --> t
e --> e --> t
(e --> t) --> t
(e --> t) --> e --> t
and so on.
#Typed lambda terms#
Given a set of types `T`, we define the set of typed lambda terms Λ_T
,
which is the smallest set such that
* each type `t` has an infinite set of distinct variables, {x^t}_1,
{x^t}_2, {x^t}_3, ...
* If a term `M` has type σ --> τ, and a term `N` has type
σ, then the application `(M N)` has type τ.
* If a variable `a` has type σ, and term `M` has type τ,
then the abstract λ a M
has type σ --> τ.
The definitions of types and of typed terms should be highly familiar
to semanticists, except that instead of writing σ --> τ,
linguists write <σ, τ>. We will use the arrow notation,
since it is more iconic.
Some examples (assume that `x` has type `o`):
x o
\x.x o --> o
((\x.x) x) o
Excercise: write down terms that have the following types:
o --> o --> o
(o --> o) --> o --> o
(o --> o --> o) --> o
#Associativity of types versus terms#
As we have seen many times, in the lambda calculus, function
application is left associative, so that `f x y z == (((f x) y) z)`.
Types, *THEREFORE*, are right associative: if `x`, `y`, and `z`
have types `a`, `b`, and `c`, respectively, then `f` has type
`a --> b --> c --> d == (a --> (b --> (c --> d)))`, where `d` is the
type of the complete term.
It is a serious faux pas to associate to the left for types. You may
as well use your salad fork to stir your tea.
#The simply-typed lambda calculus is strongly normalizing#
If `M` is a term with type τ in Λ_T, then `M` has a
normal form. The proof is not particularly complex, but we will not
present it here; see Berendregt or Hankin.
Since Ω does not have a normal form, it follows that Ω
cannot have a type in Λ_T. We can easily see why:
Ω = (\x.xx)(\x.xx)
Assume Ω has type τ, and `\x.xx` has type σ. Then
because `\x.xx` takes an argument of type σ and returns
something of type τ, `\x.xx` must also have type σ -->
τ. By repeating this reasoning, `\x.xx` must also have type
(σ --> τ) --> τ; and so on. Since variables have
finite types, there is no way to choose a type for the variable `x`
that can satisfy all of the requirements imposed on it.
In general, there is no way for a function to have a type that can
take itself for an argument. It follows that there is no way to
define the identity function in such a way that it can take itself as
an argument. Instead, there must be many different identity
functions, one for each type.
#Typing numerals#
Version 1 type numerals are not a good choice for the simply-typed
lambda calculus. The reason is that each different numberal has a
different type! For instance, if zero has type σ, then since
one is represented by the function `\x.x false 0`, it must have type
`b --> σ --> σ`, where `b` is the type of a boolean. But
this is a different type than zero! Because each number has a
different type, it becomes unbearable to write arithmetic operations
that can combine zero with one, since we would need as many different
addition operations as we had pairs of numbers that we wanted to add.
Fortunately, the Church numerals are well behaved with respect to
types. They can all be given the type (σ --> σ) -->
σ --> σ.