Chapter 17 Extended pattern-matching
- 17.1 Patterns
- 17.2 About patterns of parametric types
- 17.3 Matching objects of dependent types
- 17.4 Using pattern matching to write proofs
- 17.5 Pattern-matching on inductive objects involving local definitions
- 17.6 Pattern-matching and coercions
- 17.7 When does the expansion strategy fail ?
Cristina Cornes and Hugo Herbelin
This section describes the full form of pattern-matching in Coq terms.
17.1 Patterns
The full syntax of match is presented in Figures 1.1 and 1.2. Identifiers in patterns are either constructor names or variables. Any identifier that is not the constructor of an inductive or co-inductive type is considered to be a variable. A variable name cannot occur more than once in a given pattern. It is recommended to start variable names by a lowercase letter.
If a pattern has the form (c x) where c is a constructor symbol and x is a linear vector of (distinct) variables, it is called simple: it is the kind of pattern recognized by the basic version of match. On the opposite, if it is a variable x or has the form (c p) with p not only made of variables, the pattern is called nested.
A variable pattern matches any value, and the identifier is bound to that value. The pattern “_” (called “don’t care” or “wildcard” symbol) also matches any value, but does not bind anything. It may occur an arbitrary number of times in a pattern. Alias patterns written (pattern as identifier) are also accepted. This pattern matches the same values as pattern does and identifier is bound to the matched value. A pattern of the form pattern|pattern is called disjunctive. A list of patterns separated with commas is also considered as a pattern and is called multiple pattern. However multiple patterns can only occur at the root of pattern-matching equations. Disjunctions of multiple pattern are allowed though.
Since extended match expressions are compiled into the primitive ones, the expressiveness of the theory remains the same. Once the stage of parsing has finished only simple patterns remain. Re-nesting of pattern is performed at printing time. An easy way to see the result of the expansion is to toggle off the nesting performed at printing (use here Set Printing Matching), then by printing the term with Print if the term is a constant, or using the command Check.
The extended match still accepts an optional elimination predicate given after the keyword return. Given a pattern matching expression, if all the right-hand-sides of => (rhs in short) have the same type, then this type can be sometimes synthesized, and so we can omit the return part. Otherwise the predicate after return has to be provided, like for the basic match.
Let us illustrate through examples the different aspects of extended pattern matching. Consider for example the function that computes the maximum of two natural numbers. We can write it in primitive syntax by:
match n with
| O => m
| S n' => match m with
| O => S n'
| S m' => S (max n' m')
end
end.
max is defined
max is recursively defined (decreasing on 2nd argument)
Multiple patterns
Using multiple patterns in the definition of max lets us write:
match n, m with
| O, _ => m
| S n', O => S n'
| S n', S m' => S (max n' m')
end.
max is defined
max is recursively defined (decreasing on 2nd argument)
which will be compiled into the previous form.
The pattern-matching compilation strategy examines patterns from left to right. A match expression is generated only when there is at least one constructor in the column of patterns. E.g. the following example does not build a match expression.
| y => y
end).
fun x : nat => x
: nat -> nat
Aliasing subpatterns
We can also use “as ident” to associate a name to a sub-pattern:
match n, m with
| O, _ => m
| S n' as p, O => p
| S n', S m' => S (max n' m')
end.
max is defined
max is recursively defined (decreasing on 1st argument)
Nested patterns
Here is now an example of nested patterns:
match n with
| O => true
| S O => false
| S (S n') => even n'
end.
even is defined
even is recursively defined (decreasing on 1st argument)
This is compiled into:
Coq < Print even.
even =
fix even (n : nat) : bool :=
match n with
| 0 => true
| S n0 => match n0 with
| 0 => false
| S n' => even n'
end
end
: nat -> bool
Argument scope is [nat_scope]
In the previous examples patterns do not conflict with, but sometimes it is comfortable to write patterns that admit a non trivial superposition. Consider the boolean function lef that given two natural numbers yields true if the first one is less or equal than the second one and false otherwise. We can write it as follows:
match n, m with
| O, x => true
| x, O => false
| S n, S m => lef n m
end.
lef is defined
lef is recursively defined (decreasing on 2nd argument)
Note that the first and the second multiple pattern superpose because the couple of values O O matches both. Thus, what is the result of the function on those values? To eliminate ambiguity we use the textual priority rule: we consider patterns ordered from top to bottom, then a value is matched by the pattern at the ith row if and only if it is not matched by some pattern of a previous row. Thus in the example, O O is matched by the first pattern, and so (lef O O) yields true.
Another way to write this function is:
match n, m with
| O, x => true
| S n, S m => lef n m
| _, _ => false
end.
lef is defined
lef is recursively defined (decreasing on 2nd argument)
Here the last pattern superposes with the first two. Because of the priority rule, the last pattern will be used only for values that do not match neither the first nor the second one.
Terms with useless patterns are not accepted by the system. Here is an example:
match x with
| O => true
| S _ => false
| x => true
end).
The command has indeed failed with message:
This clause is redundant.
Disjunctive patterns
Multiple patterns that share the same right-hand-side can be factorized using the notation mult_pattern | … | mult_pattern. For instance, max can be rewritten as follows:
match n, m with
| S n', S m' => S (max n' m')
| 0, p | p, 0 => p
end.
max is defined
max is recursively defined (decreasing on 2nd argument)
Similarly, factorization of (non necessary multiple) patterns that share the same variables is possible by using the notation pattern | … | pattern. Here is an example:
match n with
| 2 as m | 4 as m => m
| _ => 0
end.
filter_2_4 is defined
Here is another example using disjunctive subpatterns.
match p with
| ((2 as m | 4 as m), (3 as n | 5 as n)) => (m,n)
| _ => (0,0)
end.
filter_some_square_corners is defined
17.2 About patterns of parametric types
Parameters in patterns
When matching objects of a parametric type, parameters do not bind in patterns. They must be substituted by “_”. Consider for example the type of polymorphic lists:
| nil : List A
| cons : A -> List A -> List A.
List is defined
List_rect is defined
List_ind is defined
List_rec is defined
We can check the function tail:
(fun l:List nat =>
match l with
| nil _ => nil nat
| cons _ _ l' => l'
end).
fun l : List nat =>
match l with
| nil _ => nil nat
| cons _ _ l' => l'
end
: List nat -> List nat
When we use parameters in patterns there is an error message:
(fun l:List nat =>
match l with
| nil A => nil nat
| cons A _ l' => l'
end).
The command has indeed failed with message:
Error: The parameters do not bind in patterns;
they must be replaced by '_'.
Implicit arguments in patterns
By default, implicit arguments are omitted in patterns. So we write:
Coq < Arguments cons [A] _ _.
Coq < Check
(fun l:List nat =>
match l with
| nil => nil
| cons _ l' => l'
end).
fun l : List nat => match l with
| nil => nil
| cons _ l' => l'
end
: List nat -> List nat
But the possibility to use all the arguments is given by “@” implicit explicitations (as for terms 2.7.11).
(fun l:List nat =>
match l with
| @nil _ => @nil nat
| @cons _ _ l' => l'
end).
fun l : List nat => match l with
| nil => nil
| cons _ l' => l'
end
: List nat -> List nat
17.3 Matching objects of dependent types
The previous examples illustrate pattern matching on objects of non-dependent types, but we can also use the expansion strategy to destructure objects of dependent type. Consider the type listn of lists of a certain length:
| niln : listn 0
| consn : forall n:nat, nat -> listn n -> listn (S n).
listn is defined
listn_rect is defined
listn_ind is defined
listn_rec is defined
17.3.1 Understanding dependencies in patterns
We can define the function length over listn by:
length is defined
Just for illustrating pattern matching, we can define it by case analysis:
match l with
| niln => 0
| consn n _ _ => S n
end.
length is defined
We can understand the meaning of this definition using the same notions of usual pattern matching.
17.3.2 When the elimination predicate must be provided
Dependent pattern matching
The examples given so far do not need an explicit elimination predicate because all the rhs have the same type and the strategy succeeds to synthesize it. Unfortunately when dealing with dependent patterns it often happens that we need to write cases where the type of the rhs are different instances of the elimination predicate. The function concat for listn is an example where the branches have different type and we need to provide the elimination predicate:
listn (n + m) :=
match l in listn n return listn (n + m) with
| niln => l'
| consn n' a y => consn (n' + m) a (concat n' y m l')
end.
concat is defined
concat is recursively defined (decreasing on 2nd argument)
The elimination predicate is fun (n:nat) (l:listn n) => listn (n+m). In general if m has type (I q1 … qr t1 … ts) where q1, …, qr are parameters, the elimination predicate should be of the form : fun y1 … ys x:(I q1 … qr y1 … ys) => Q.
In the concrete syntax, it should be written :
match m as x in (I _ … _ y1 … ys) return Q with … end |
The variables which appear in the in and as clause are new and bounded in the property Q in the return clause. The parameters of the inductive definitions should not be mentioned and are replaced by _.
Multiple dependent pattern matching
Recall that a list of patterns is also a pattern. So, when we destructure several terms at the same time and the branches have different types we need to provide the elimination predicate for this multiple pattern. It is done using the same scheme, each term may be associated to an as and in clause in order to introduce a dependent product.
For example, an equivalent definition for concat (even though the matching on the second term is trivial) would have been:
listn (n + m) :=
match l in listn n, l' return listn (n + m) with
| niln, x => x
| consn n' a y, x => consn (n' + m) a (concat n' y m x)
end.
concat is defined
concat is recursively defined (decreasing on 2nd argument)
Even without real matching over the second term, this construction can be used to keep types linked. If a and b are two listn of the same length, by writing
|niln,b0 => tt
|consn n' a y, bS => tt
end).
fun (n : nat) (a _ : listn n) =>
match a with
| niln => tt
| consn n' _ _ => tt
end
: forall n : nat, listn n -> listn n -> unit
I have a copy of b in type listn 0 resp listn (S n’).
Patterns in in
If the type of the matched term is more precise than an inductive applied to variables, arguments of the inductive in the in branch can be more complicated patterns than a variable.
Moreover, constructors whose type do not follow the same pattern will become impossible branches. In an impossible branch, you can answer anything but False_rect unit has the advantage to be subterm of anything.
To be concrete: the tail function can be written:
match v in listn (S m) return listn m with
| niln => False_rect unit
| consn n' a y => y
end.
tail is defined
and tail n v will be subterm of v.
17.4 Using pattern matching to write proofs
In all the previous examples the elimination predicate does not depend on the object(s) matched. But it may depend and the typical case is when we write a proof by induction or a function that yields an object of dependent type. An example of proof using match in given in Section 8.2.3.
For example, we can write the function buildlist that given a natural number n builds a list of length n containing zeros as follows:
match n return listn n with
| O => niln
| S n => consn n 0 (buildlist n)
end.
buildlist is defined
buildlist is recursively defined (decreasing on 1st argument)
We can also use multiple patterns. Consider the following definition of the predicate less-equal Le:
| LEO : forall n:nat, LE 0 n
| LES : forall n m:nat, LE n m -> LE (S n) (S m).
LE is defined
LE_ind is defined
We can use multiple patterns to write the proof of the lemma
forall (n m:nat), (LE n m)\/
(LE m n):
match n, m return LE n m \/ LE m n with
| O, x => or_introl (LE x 0) (LEO x)
| x, O => or_intror (LE x 0) (LEO x)
| S n as n', S m as m' =>
match dec n m with
| or_introl h => or_introl (LE m' n') (LES n m h)
| or_intror h => or_intror (LE n' m') (LES m n h)
end
end.
dec is defined
dec is recursively defined (decreasing on 1st argument)
In the example of dec, the first match is dependent while the second is not.
The user can also use match in combination with the tactic refine (see Section 8.2.3) to build incomplete proofs beginning with a match construction.
17.5 Pattern-matching on inductive objects involving local definitions
If local definitions occur in the type of a constructor, then there are two ways to match on this constructor. Either the local definitions are skipped and matching is done only on the true arguments of the constructors, or the bindings for local definitions can also be caught in the matching.
Example.
| nil : list 0
| cons : forall n:nat, let m := (2 * n) in list m -> list (S (S m)).
In the next example, the local definition is not caught.
match l with
| nil => 0
| cons n l0 => S (length (2 * n) l0)
end.
length is defined
length is recursively defined (decreasing on 2nd argument)
But in this example, it is.
match l with
| nil => 0
| @cons _ m l0 => S (length' m l0)
end.
length' is defined
length' is recursively defined (decreasing on 2nd argument)
Remark: for a given matching clause, either none of the local definitions or all of
them can be caught.
Remark: you can only catch let bindings in mode where you bind all variables and so you
have to use @ syntax.
Remark: this feature is incoherent with the fact that parameters cannot be caught and
consequently is somehow hidden. For example, there is no mention of it in error messages.
17.6 Pattern-matching and coercions
If a mismatch occurs between the expected type of a pattern and its actual type, a coercion made from constructors is sought. If such a coercion can be found, it is automatically inserted around the pattern.
Example:
| C1 : nat -> I
| C2 : I -> I.
I is defined
I_rect is defined
I_ind is defined
I_rec is defined
Coq < Coercion C1 : nat >-> I.
C1 is now a coercion
Coq < Check (fun x => match x with
| C2 O => 0
| _ => 0
end).
fun x : I =>
match x with
| C1 _ => 0
| C2 (C1 0) => 0
| C2 (C1 (S _)) => 0
| C2 (C2 _) => 0
end
: I -> nat
17.7 When does the expansion strategy fail ?
The strategy works very like in ML languages when treating patterns of non-dependent type. But there are new cases of failure that are due to the presence of dependencies.
The error messages of the current implementation may be sometimes confusing. When the tactic fails because patterns are somehow incorrect then error messages refer to the initial expression. But the strategy may succeed to build an expression whose sub-expressions are well typed when the whole expression is not. In this situation the message makes reference to the expanded expression. We encourage users, when they have patterns with the same outer constructor in different equations, to name the variable patterns in the same positions with the same name. E.g. to write (cons n O x) => e1 and (cons n _ x) => e2 instead of (cons n O x) => e1 and (cons n’ _ x’) => e2. This helps to maintain certain name correspondence between the generated expression and the original.
Here is a summary of the error messages corresponding to each situation:
Error messages:
-
The constructor ident expects num arguments
The variable ident is bound several times in pattern term
Found a constructor of inductive type term while a constructor of term is expected
Patterns are incorrect (because constructors are not applied to the correct number of the arguments, because they are not linear or they are wrongly typed).
- Non exhaustive pattern-matching
The pattern matching is not exhaustive.
- The elimination predicate term should be
of arity num (for non dependent case) or num (for dependent case)
The elimination predicate provided to match has not the expected arity.
- Unable to infer a match predicate
Either there is a type incompatibility or the problem involves
dependenciesThere is a type mismatch between the different branches. The user should provide an elimination predicate.