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coq_exercises.v
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coq_exercises.v
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(** Exercise sheet for lecture 2: Fundamentals of Coq.
The goal is to replace all of the "..." by suitable Coq code
satisfying the specification below.
Written by Anders Mörtberg.
Minor modifications made by Marco Maggesi.
*)
Require Import UniMath.Foundations.Preamble.
Definition idfun : forall (A : UU), A -> A := fun (A : UU) (a : A) => a.
Definition const (A B : UU) (a : A) (b : B) : A := a.
(** * Booleans *)
Definition ifbool (A : UU) (x y : A) : bool -> A :=
bool_rect (fun _ : bool => A) x y.
Definition negbool : bool -> bool :=
ifbool bool false true.
Definition andbool (b : bool) : bool -> bool :=
ifbool (bool -> bool) (idfun bool) (const bool bool false) b.
(** Exercise: define boolean or: *)
(* Definition orbool (b : bool) : bool -> bool := ... *)
(* This should satisfy:
Eval compute in orbool true true. (* true *)
Eval compute in orbool true false. (* true *)
Eval compute in orbool false true. (* true *)
Eval compute in orbool false false. (* false *)
*)
(** * Natural numbers *)
Definition nat_rec (A : UU) (a : A) (f : nat -> A -> A) : nat -> A :=
nat_rect (fun _ : nat => A) a f.
Definition pred : nat -> nat := nat_rec nat 0 (const nat nat).
Definition even : nat -> bool := nat_rec bool true (fun _ b => negbool b).
(** Exercise: define a function odd that tests if a number is odd *)
(* Definition odd : nat -> bool := ... *)
(* This should satisfy
Eval compute in odd 24. (* false *)
Eval compute in odd 19. (* true *)
Beware of big numbers: [UniMath.Foundations.Preamble] only defines notation up to 24.
*)
(** Exercise: define a notation "myif b then x else y" for "ifbool _ x y b"
and rewrite negbool and andbool using this notation. *)
(* Notation "..." := (...) (at level 1). *)
(** Note that we cannot introduce the notation "if b then x else y" as
this is already used. *)
(* Definition negbool' (b : bool) : bool := ... *)
(* This should satisfy:
Eval compute in negbool' true. (* false *)
Eval compute in negbool' false. (* true *)
*)
(* Definition andbool' (b1 b2 : bool) : bool := ... *)
(* This should satisfy:
Eval compute in andbool true true. (* true *)
Eval compute in andbool true false. (* false *)
Eval compute in andbool false true. (* false *)
Eval compute in andbool false false. (* false *)
*)
Definition add (m : nat) : nat -> nat := nat_rec nat m (fun _ y => S y).
Definition iter (A : UU) (a : A) (f : A → A) : nat → A :=
nat_rec A a (λ _ y, f y).
(* Type space and then \hat to enter the symbol ̂. *)
Notation "f ̂ n" := (λ x, iter _ x f n) (at level 10).
Definition sub (m n : nat) : nat := pred ̂ n m.
(** Exercise: define addition using iter and S *)
(* Definition add' (m : nat) : nat → nat := ... *)
(* This should satisfy:
Eval compute in add' 4 9. (* 13 *)
*)
Definition is_zero : nat -> bool := nat_rec bool true (fun _ _ => false).
Definition eqnat (m n : nat) : bool :=
andbool (is_zero (sub m n)) (is_zero (sub n m)).
Notation "m == n" := (eqnat m n) (at level 50).
(** Exercises: define <, >, ≤, ≥ *)
(* Definition ltnat (m n : nat) : bool := ... *)
(* Notation "x < y" := (ltnat x y). *)
(* This should satisfy:
Eval compute in (2 < 3). (* true *)
Eval compute in (3 < 3). (* false *)
Eval compute in (4 < 3). (* false *)
*)
(* Definition gtnat (m n : nat) : bool := ... *)
(* Notation "x > y" := (gtnat x y). *)
(* This should satisfy:
Eval compute in (2 > 3). (* false *)
Eval compute in (3 > 3). (* false *)
Eval compute in (4 > 3). (* true *)
*)
(* Definition leqnat (m n : nat) : bool := ... *)
(* Notation "x ≤ y" := (leqnat x y) (at level 10). *)
(* This should satisfy:
Eval compute in (2 ≤ 3). (* true *)
Eval compute in (3 ≤ 3). (* true *)
Eval compute in (4 ≤ 3). (* false *)
*)
(* Definition geqnat (m n : nat) : bool := ... *)
(* Notation "x ≥ y" := (geqnat x y) (at level 10). *)
(* This should satisfy:
Eval compute in (2 ≥ 3). (* false *)
Eval compute in (3 ≥ 3). (* true *)
Eval compute in (4 ≥ 3). (* true *)
*)
(** * Coproduct and integers *)
Definition coprod_rec {A B C : UU} (f : A → C) (g : B → C) : A ⨿ B → C :=
@coprod_rect A B (λ _, C) f g.
Definition Z : UU := coprod nat nat.
Notation "⊹ x" := (inl x) (at level 20).
Notation "─ x" := (inr x) (at level 40).
Definition Z5 : Z := ⊹ 5.
Definition Z1 : Z := ⊹ 1.
Definition Z0 : Z := ⊹ 0.
Definition Zn1 : Z := ─ 0.
Definition Zn2 : Z := ─ 1.
Definition Zn3 : Z := ─ 2.
Definition Zcase (A : UU) (fpos : nat → A) (fneg : nat → A) : Z → A :=
coprod_rec fpos fneg.
Definition negate : Z → Z :=
Zcase Z (λ x, ifbool Z Z0 (─ pred x) (is_zero x)) (λ x, ⊹ S x).
(** Exercise (harder): define addition for Z *)
(* Definition Zadd : Z -> Z -> Z := ... *)
(* This should satisfy:
Eval compute in Zadd Z0 Z0. (* ⊹ 0 *)
Eval compute in Zadd Z1 Z1. (* ⊹ 2 *)
Eval compute in Zadd Z1 Zn3. (* ─ 1 *) (* recall that negative numbers are off-by-one *)
Eval compute in Zadd Zn3 Z1. (* ─ 1 *)
Eval compute in Zadd Zn3 Zn3. (* ─ 5 *)
Eval compute in Zadd (Zadd Zn3 Zn3) Zn3. (* ─ 8 *)
Eval compute in Zadd Z0 (negate (Zn3)). (* ⊹ 3 *)
Eval compute in Zadd Z0 Zn1. (* ─ 0 *)
Eval compute in Zadd Z1 Zn1. (* ⊹ 0 *)
Eval compute in Zadd Z5 Zn2. (* ⊹ 3 *)
*)