I have the following Inductive type defined in Coq.
Inductive natlist : Type := | nil : natlist | cons : nat -> natlist -> natlist. Notation "x :: l" := (cons x l) (at level 60, right associativity). Notation "[ ]" := nil. Notation "[ x , .. , y ]" := (cons x .. (cons y nil) ..).
The natlist is basically a list of natural numbers (similar to lists in Python). I am trying to find the union of two natlist using the definition below.
Definition union_of_lists : natlist -> natlist -> natlist
Eval simpl in (union_of_lists [1,2,3] [1,4,1])
should return [1,2,3,1,4,1]
I have the following doubts.
- Since there are no arguments to this definition, how do I actually get the inputs and handle them?
- What does the definition union_of_lists return exactly? Is it just a natlist?
Any help or hints are highly appreciated.