4.1 The terms

In most type theories, one usually makes a syntactic distinction between types and terms. This is not the case for Cic which defines both types and terms in the same syntactical structure. This is because the type-theory itself forces terms and types to be defined in a mutual recursive way and also because similar constructions can be applied to both terms and types and consequently can share the same syntactic structure.

Consider for instance the ® constructor and assume nat is the type of natural numbers. Then ® is used both to denote nat®nat which is the type of functions from nat to nat, and to denote nat ® Prop which is the type of unary predicates over the natural numbers. Consider abstraction which builds functions. It serves to build ``ordinary'' functions as [x:nat](mult  x x) (assuming mult is already defined) but may build also predicates over the natural numbers. For instance [x:nat](x=x) will represent a predicate P, informally written in mathematics P(x)º x=x. If P has type nat ® Prop, (P x) is a proposition, furthermore (x:nat)(P x) will represent the type of functions which associate to each natural number n an object of type (P n) and consequently represent proofs of the formula ``" x.P(x)''.

4.1.1 Sorts

Types are seen as terms of the language and then should belong to another type. The type of a type is a always a constant of the language called a sort.

The two basic sorts in the language of Cic are Set and Prop.

The sort Prop intends to be the type of logical propositions. If M is a logical proposition then it denotes a class, namely the class of terms representing proofs of M. An object m belonging to M witnesses the fact that M is true. An object of type Prop is called a proposition.

The sort Set intends to be the type of specifications. This includes programs and the usual sets such as booleans, naturals, lists etc.

These sorts themselves can be manipulated as ordinary terms. Consequently sorts also should be given a type. Because assuming simply that Set has type Set leads to an inconsistent theory, we have infinitely many sorts in the language of Cic . These are, in addition to Set and Prop  a hierarchy of universes Type(i) for any integer i. We call S the set of sorts which is defined by:
S º {Prop,Set,Type(i)| i Î IN}
The sorts enjoy the following properties: Prop:Type(0) and Type(i):Type(i+1).

The user will never mention explicitly the index i when referring to the universe Type(i). One only writes Type. The system itself generates for each instance of Type a new index for the universe and checks that the constraints between these indexes can be solved. From the user point of view we consequently have Type :Type.

We shall make precise in the typing rules the constraints between the indexes.

4.1.2 Constants

Besides the sorts, the language also contains constants denoting objects in the environment. These constants may denote previously defined objects but also objects related to inductive definitions (either the type itself or one of its constructors or destructors).
Remark. In other presentations of Cic, the inductive objects are not seen as external declarations but as first-class terms. Usually the definitions are also completely ignored. This is a nice theoretical point of view but not so practical. An inductive definition is specified by a possibly huge set of declarations, clearly we want to share this specification among the various inductive objects and not to duplicate it. So the specification should exist somewhere and the various objects should refer to it. We choose one more level of indirection where the objects are just represented as constants and the environment gives the information on the kind of object the constant refers to.
Our inductive objects will be manipulated as constants declared in the environment. This roughly corresponds to the way they are actually implemented in the Coq system. It is simple to map this presentation in a theory where inductive objects are represented by terms.

4.1.3 Terms

Terms are built from variables, global names, constructors, abstraction, application, local declarations bindings (``let-in'' expressions) and product.

From a syntactic point of view, types cannot be distingued from terms, except that they cannot start by an abstraction, and that if a term is a sort or a product, it should be a type.

More precisely the language of the Calculus of Inductive Constructions is built from the following rules:

  1. the sorts Set, Prop, Type are terms.
  2. names for global constant of the environment are terms.
  3. variables are terms.
  4. if x is a variable and T, U are terms then (x:T)U is a term. If x occurs in U, (x:T)U reads as ``for all x of type T, U''. As U depends on x, one says that (x:T)U is a dependent product. If x doesn't occurs in U then (x:T)U reads as ``if T then U''. A non dependent product can be written: T ® U.
  5. if x is a variable and T, U are terms then [x:T]U is a term. This is a notation for the l-abstraction of l-calculus [Bar81]. The term [x:T]U is a function which maps elements of T to U.
  6. if T and U are terms then (T U) is a term. The term (T U) reads as ``T applied to U''.
  7. if x is a variable, and T, U are terms then [x:=T]U is a term which denotes the term U where the variable x is locally bound to T. This stands for the common ``let-in'' construction of functional programs such as ML or Scheme.
Notations.
Application associates to the left such that (t t1... tn) represents (... (t t1)... tn). The products and arrows associate to the right such that (x:A)B® C® D represents (x:A)(B® (C® D)). One uses sometimes (x,y:A)B or [x,y:A]B to denote the abstraction or product of several variables of the same type. The equivalent formulation is (x:A)(y:A)B or [x:A][y:A]B

Free variables.
The notion of free variables is defined as usual. In the expressions [x:T]U and (x:T)U the occurrences of x in U are bound. They are represented by de Bruijn indexes in the internal structure of terms.

Substitution.
The notion of substituting a term t to free occurrences of a variable x in a term u is defined as usual. The resulting term is written u{x/t}.