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diff --git a/theories/Init/Tauto.v b/theories/Init/Tauto.v
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+++ b/theories/Init/Tauto.v
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+Require Import Notations.
+Require Import Datatypes.
+Require Import Logic.
+
+Local Declare ML Module "tauto".
+
+Local Ltac not_dep_intros :=
+  repeat match goal with
+  | |- (forall (_: ?X1), ?X2) => intro
+  | |- (Coq.Init.Logic.not _) => unfold Coq.Init.Logic.not at 1; intro
+  end.
+
+Local Ltac axioms flags :=
+  match reverse goal with
+    | |- ?X1 => is_unit_or_eq flags X1; constructor 1
+    | _:?X1 |- _ => is_empty flags X1; elimtype X1; assumption
+    | _:?X1 |- ?X1 => assumption
+  end.
+
+Local Ltac simplif flags :=
+  not_dep_intros;
+  repeat
+     (match reverse goal with
+      | id: ?X1 |- _ => is_conj flags X1; elim id; do 2 intro; clear id
+      | id: (Coq.Init.Logic.iff _ _) |- _ => elim id; do 2 intro; clear id
+      | id: (Coq.Init.Logic.not _) |- _ => red in id
+      | id: ?X1 |- _ => is_disj flags X1; elim id; intro; clear id
+      | id0: (forall (_: ?X1), ?X2), id1: ?X1|- _ =>
+    (* generalize (id0 id1); intro; clear id0 does not work
+       (see Marco Maggiesi's bug PR#301)
+    so we instead use Assert and exact. *)
+    assert X2; [exact (id0 id1) | clear id0]
+      | id: forall (_ : ?X1), ?X2|- _ =>
+        is_unit_or_eq flags X1; cut X2;
+    [ intro; clear id
+    | (* id : forall (_: ?X1), ?X2 |- ?X2 *)
+      cut X1; [exact id| constructor 1; fail]
+    ]
+      | id: forall (_ : ?X1), ?X2|- _ =>
+        flatten_contravariant_conj flags X1 X2 id
+  (* moved from "id:(?A/\?B)->?X2|-" to "?A->?B->?X2|-" *)
+      | id: forall (_: Coq.Init.Logic.iff ?X1 ?X2), ?X3|- _ =>
+        assert (forall (_: forall _:X1, X2), forall (_: forall _: X2, X1), X3)
+    by (do 2 intro; apply id; split; assumption);
+          clear id
+      | id: forall (_:?X1), ?X2|- _ =>
+        flatten_contravariant_disj flags X1 X2 id
+  (* moved from "id:(?A\/?B)->?X2|-" to "?A->?X2,?B->?X2|-" *)
+      | |- ?X1 => is_conj flags X1; split
+      | |- (Coq.Init.Logic.iff _ _) => split
+      | |- (Coq.Init.Logic.not _) => red
+      end;
+      not_dep_intros).
+
+Local Ltac tauto_intuit flags t_reduce t_solver :=
+ let rec t_tauto_intuit :=
+ (simplif flags; axioms flags
+ || match reverse goal with
+    | id:forall(_: forall (_: ?X1), ?X2), ?X3|- _ =>
+  cut X3;
+    [ intro; clear id; t_tauto_intuit
+    | cut (forall (_: X1), X2);
+	[ exact id
+	| generalize (fun y:X2 => id (fun x:X1 => y)); intro; clear id;
+	  solve [ t_tauto_intuit ]]]
+    | id:forall (_:not ?X1), ?X3|- _ =>
+  cut X3;
+    [ intro; clear id; t_tauto_intuit
+    | cut (not X1); [ exact id | clear id; intro; solve [t_tauto_intuit ]]]
+    | |- ?X1 =>
+        is_disj flags X1; solve [left;t_tauto_intuit | right;t_tauto_intuit]
+    end
+  ||
+  (* NB: [|- _ -> _] matches any product *)
+  match goal with | |- forall (_ : _),  _ => intro; t_tauto_intuit
+  |  |- _  => t_reduce;t_solver
+  end
+  ||
+  t_solver
+ ) in t_tauto_intuit.
+
+Local Ltac intuition_gen flags solver := tauto_intuit flags reduction_not_iff solver.
+Local Ltac tauto_intuitionistic flags := intuition_gen flags fail || fail "tauto failed".
+Local Ltac tauto_classical flags :=
+  (apply_nnpp || fail "tauto failed"); (tauto_intuitionistic flags || fail "Classical tauto failed").
+Local Ltac tauto_gen flags := tauto_intuitionistic flags || tauto_classical flags.
+
+Ltac tauto := with_uniform_flags ltac:(fun flags => tauto_gen flags).
+Ltac dtauto := with_power_flags ltac:(fun flags => tauto_gen flags).
+
+Ltac intuition := with_uniform_flags ltac:(fun flags => intuition_gen flags ltac:(auto with *)).
+Local Ltac intuition_then tac := with_uniform_flags ltac:(fun flags => intuition_gen flags tac).
+
+Ltac dintuition := with_power_flags ltac:(fun flags => intuition_gen flags ltac:(auto with *)).
+Local Ltac dintuition_then tac := with_power_flags ltac:(fun flags => intuition_gen flags tac).
+
+Tactic Notation "intuition" := intuition.
+Tactic Notation "intuition" tactic(t) := intuition_then t.
+
+Tactic Notation "dintuition" := dintuition.
+Tactic Notation "dintuition" tactic(t) := dintuition_then t.