What does the with keyword without the match do inside a inductive type in Coq?, example:

Inductive Block : Type :=
  | EmptyBlk : Block
  | Blk : Statement -> Block
with Statement : Type :=
  | Assignment : string -> AExp -> Statement
  | Seq : Statement -> Statement -> Statement
  | IfElse : BExp -> Block -> Block -> Statement
  | While : BExp -> Block -> Statement.

I tried checking the type of Statement and it seems its not of type block or something...So what is the point of defining it inside another inductive type rather than by itself. At least checking the type of Statement gives Set the same as for Block...


It is used to specify mutually recursive definitions. For example, consider the following two functions:

Fixpoint even (n : nat) : bool :=
  match n with
  | O => true
  | S n => odd n
with odd (n : nat) : bool :=
  match n with
  | O => false
  | S n => even n

Here, you cannot define even first because it needs odd to be defined. You cannot define odd first either because it needs even. You need to be able to define both at the same time - and you do that by using the with keyword.

Your example is similar but defines inductive datatype rather than recursive function - Statement uses Block in its definition and Block uses Statement. Hence, with to define them both at the same time.

Note that this with is completely different keyword than with from the match expressions. In fact, they belong to two different languages: the former one is part of Vernacular whereas the latter is part of Gallina.

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