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(* Copyright (c) 2012-2014, Robbert Krebbers. *)
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(* This file is distributed under the terms of the BSD license. *)
(** This file collects theorems, definitions, tactics, related to propositions
with a decidable equality. Such propositions are collected by the [Decision]
type class. *)
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Require Export proof_irrel.
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Hint Extern 200 (Decision _) => progress (lazy beta) : typeclass_instances.

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Lemma dec_stable `{Decision P} : ¬¬P  P.
Proof. firstorder. Qed.
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Lemma Is_true_reflect (b : bool) : reflect b b.
Proof. destruct b. by left. right. intros []. Qed.

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(** We introduce [decide_rel] to avoid inefficienct computation due to eager
evaluation of propositions by [vm_compute]. This inefficiency occurs if
[(x = y) := (f x = f y)] as [decide (x = y)] evaluates to [decide (f x = f y)]
which then might lead to evaluation of [f x] and [f y]. Using [decide_rel]
we hide [f] under a lambda abstraction to avoid this unnecessary evaluation. *)
Definition decide_rel {A B} (R : A  B  Prop) {dec :  x y, Decision (R x y)}
  (x : A) (y : B) : Decision (R x y) := dec x y.
Lemma decide_rel_correct {A B} (R : A  B  Prop) `{ x y, Decision (R x y)}
  (x : A) (y : B) : decide_rel R x y = decide (R x y).
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Proof. done. Qed.
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Lemma decide_True {A} `{Decision P} (x y : A) :
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  P  (if decide P then x else y) = x.
Proof. by destruct (decide P). Qed.
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Lemma decide_False {A} `{Decision P} (x y : A) :
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  ¬P  (if decide P then x else y) = y.
Proof. by destruct (decide P). Qed.
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Lemma decide_iff {A} P Q `{Decision P, Decision Q} (x y : A) :
  (P  Q)  (if decide P then x else y) = (if decide Q then x else y).
Proof. intros [??]. destruct (decide P), (decide Q); intuition. Qed.
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(** The tactic [destruct_decide] destructs a sumbool [dec]. If one of the
components is double negated, it will try to remove the double negation. *)
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Tactic Notation "destruct_decide" constr(dec) "as" ident(H) :=
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  destruct dec as [H|H];
  try match type of H with
  | ¬¬_ => apply dec_stable in H
  end.
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Tactic Notation "destruct_decide" constr(dec) :=
  let H := fresh in destruct_decide dec as H.
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(** The tactic [case_decide] performs case analysis on an arbitrary occurrence
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of [decide] or [decide_rel] in the conclusion or hypotheses. *)
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Tactic Notation "case_decide" "as" ident(Hd) :=
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  match goal with
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  | H : context [@decide ?P ?dec] |- _ =>
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    destruct_decide (@decide P dec) as Hd
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  | H : context [@decide_rel _ _ ?R ?x ?y ?dec] |- _ =>
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    destruct_decide (@decide_rel _ _ R x y dec) as Hd
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  | |- context [@decide ?P ?dec] =>
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    destruct_decide (@decide P dec) as Hd
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  | |- context [@decide_rel _ _ ?R ?x ?y ?dec] =>
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    destruct_decide (@decide_rel _ _ R x y dec) as Hd
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  end.
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Tactic Notation "case_decide" :=
  let H := fresh in case_decide as H.
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(** The tactic [solve_decision] uses Coq's [decide equality] tactic together
with instance resolution to automatically generate decision procedures. *)
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Ltac solve_trivial_decision :=
  match goal with
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  | |- Decision (?P) => apply _
  | |- sumbool ?P (¬?P) => change (Decision P); apply _
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  end.
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Ltac solve_decision := intros; first
  [ solve_trivial_decision
  | unfold Decision; decide equality; solve_trivial_decision ].
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(** The following combinators are useful to create Decision proofs in
combination with the [refine] tactic. *)
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Notation swap_if S := (match S with left H => right H | right H => left H end).
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Notation cast_if S := (if S then left _ else right _).
Notation cast_if_and S1 S2 := (if S1 then cast_if S2 else right _).
Notation cast_if_and3 S1 S2 S3 := (if S1 then cast_if_and S2 S3 else right _).
Notation cast_if_and4 S1 S2 S3 S4 :=
  (if S1 then cast_if_and3 S2 S3 S4 else right _).
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Notation cast_if_and5 S1 S2 S3 S4 S5 :=
  (if S1 then cast_if_and4 S2 S3 S4 S5 else right _).
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Notation cast_if_and6 S1 S2 S3 S4 S5 S6 :=
  (if S1 then cast_if_and5 S2 S3 S4 S5 S6 else right _).
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Notation cast_if_or S1 S2 := (if S1 then left _ else cast_if S2).
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Notation cast_if_or3 S1 S2 S3 := (if S1 then left _ else cast_if_or S2 S3).
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Notation cast_if_not_or S1 S2 := (if S1 then cast_if S2 else left _).
Notation cast_if_not S := (if S then right _ else left _).

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(** We can convert decidable propositions to booleans. *)
Definition bool_decide (P : Prop) {dec : Decision P} : bool :=
  if dec then true else false.
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Lemma bool_decide_reflect P `{dec : Decision P} : reflect P (bool_decide P).
Proof. unfold bool_decide. destruct dec. by left. by right. Qed.

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Tactic Notation "case_bool_decide" "as" ident (Hd) :=
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  match goal with
  | H : context [@bool_decide ?P ?dec] |- _ =>
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    destruct_decide (@bool_decide_reflect P dec) as Hd
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  | |- context [@bool_decide ?P ?dec] =>
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    destruct_decide (@bool_decide_reflect P dec) as Hd
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  end.
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Tactic Notation "case_bool_decide" :=
  let H := fresh in case_bool_decide as H.
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Lemma bool_decide_unpack (P : Prop) {dec : Decision P} : bool_decide P  P.
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Proof. unfold bool_decide. by destruct dec. Qed.
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Lemma bool_decide_pack (P : Prop) {dec : Decision P} : P  bool_decide P.
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Proof. unfold bool_decide. by destruct dec. Qed.
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(** * Decidable Sigma types *)
(** Leibniz equality on Sigma types requires the equipped proofs to be
equal as Coq does not support proof irrelevance. For decidable we
propositions we define the type [dsig P] whose Leibniz equality is proof
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irrelevant. That is [∀ x y : dsig P, x = y ↔ `x = `y]. Due to the absence of
universe polymorpic definitions we also define a variant [dsigS] for types
in [Set]. *)
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Definition dsig `(P : A  Prop) `{ x : A, Decision (P x)} :=
  { x | bool_decide (P x) }.
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Definition dsigS {A : Set} (P : A  Prop) `{ x : A, Decision (P x)} : Set :=
  { x | bool_decide (P x) }.

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Definition proj2_dsig `{ x : A, Decision (P x)} (x : dsig P) : P (`x) :=
  bool_decide_unpack _ (proj2_sig x).
Definition dexist `{ x : A, Decision (P x)} (x : A) (p : P x) : dsig P :=
  xbool_decide_pack _ p.
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Lemma dsig_eq `(P : A  Prop) `{ x, Decision (P x)}
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  (x y : dsig P) : x = y  `x = `y.
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Proof. apply (sig_eq_pi _). Qed.
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Lemma dexists_proj1 `(P : A  Prop) `{ x, Decision (P x)} (x : dsig P) p :
  dexist (`x) p = x.
Proof. by apply dsig_eq. Qed.
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(** * Instances of Decision *)
(** Instances of [Decision] for operators of propositional logic. *)
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Instance True_dec: Decision True := left I.
Instance False_dec: Decision False := right (False_rect False).
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Instance Is_true_dec b : Decision (Is_true b).
Proof. destruct b; apply _. Defined.
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Section prop_dec.
  Context `(P_dec : Decision P) `(Q_dec : Decision Q).

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  Global Instance not_dec: Decision (¬P).
  Proof. refine (cast_if_not P_dec); intuition. Defined.
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  Global Instance and_dec: Decision (P  Q).
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  Proof. refine (cast_if_and P_dec Q_dec); intuition. Defined.
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  Global Instance or_dec: Decision (P  Q).
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  Proof. refine (cast_if_or P_dec Q_dec); intuition. Defined.
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  Global Instance impl_dec: Decision (P  Q).
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  Proof. refine (if P_dec then cast_if Q_dec else left _); intuition. Defined.
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End prop_dec.
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Instance iff_dec `(P_dec : Decision P) `(Q_dec : Decision Q) :
  Decision (P  Q) := and_dec _ _.
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(** Instances of [Decision] for common data types. *)
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Instance bool_eq_dec (x y : bool) : Decision (x = y).
Proof. solve_decision. Defined.
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Instance unit_eq_dec (x y : unit) : Decision (x = y).
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Proof. solve_decision. Defined.
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Instance prod_eq_dec `(A_dec :  x y : A, Decision (x = y))
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  `(B_dec :  x y : B, Decision (x = y)) (x y : A * B) : Decision (x = y).
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Proof. solve_decision. Defined.
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Instance sum_eq_dec `(A_dec :  x y : A, Decision (x = y))
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  `(B_dec :  x y : B, Decision (x = y)) (x y : A + B) : Decision (x = y).
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Proof. solve_decision. Defined.
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Instance curry_dec `(P_dec :  (x : A) (y : B), Decision (P x y)) p :
    Decision (curry P p) :=
  match p as p return Decision (curry P p) with
  | (x,y) => P_dec x y
  end.
Instance uncurry_dec `(P_dec :  (p : A * B), Decision (P p)) x y :
  Decision (uncurry P x y) := P_dec (x,y).
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Instance sig_eq_dec `(P : A  Prop) `{ x, ProofIrrel (P x)}
  `{ x y : A, Decision (x = y)} (x y : sig P) : Decision (x = y).
Proof. refine (cast_if (decide (`x = `y))); by rewrite sig_eq_pi. Defined.
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(** Some laws for decidable propositions *)
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Lemma not_and_l {P Q : Prop} `{Decision P} : ¬(P  Q)  ¬P  ¬Q.
Proof. destruct (decide P); tauto. Qed.
Lemma not_and_r {P Q : Prop} `{Decision Q} : ¬(P  Q)  ¬P  ¬Q.
Proof. destruct (decide Q); tauto. Qed.
Lemma not_and_l_alt {P Q : Prop} `{Decision P} : ¬(P  Q)  ¬P  (¬Q  P).
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Proof. destruct (decide P); tauto. Qed.
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Lemma not_and_r_alt {P Q : Prop} `{Decision Q} : ¬(P  Q)  (¬P  Q)  ¬Q.
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Proof. destruct (decide Q); tauto. Qed.