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(* *********************************************************************)
(*                                                                     *)
(*              The Compcert verified compiler                         *)
(*                                                                     *)
(*          Xavier Leroy, INRIA Paris-Rocquencourt                     *)
(*                                                                     *)
(*  Copyright Institut National de Recherche en Informatique et en     *)
(*  Automatique.  All rights reserved.  This file is distributed       *)
(*  under the terms of the INRIA Non-Commercial License Agreement.     *)
(*                                                                     *)
(* *********************************************************************)

(** Abstract specification of RTL generation *)

(** In this module, we define inductive predicates that specify the 
  translations from Cminor to RTL performed by the functions in module
  [RTLgen].  We then show that these functions satisfy these relational
  specifications.  The relational specifications will then be used
  instead of the actual functions to show semantic equivalence between
  the source Cminor code and the the generated RTL code
  (see module [RTLgenproof]). *)

Require Import Coqlib.
Require Errors.
Require Import Maps.
Require Import AST.
Require Import Integers.
Require Import Values.
Require Import Events.
Require Import Mem.
Require Import Globalenvs.
Require Import Switch.
Require Import Op.
Require Import Registers.
Require Import CminorSel.
Require Import RTL.
Require Import RTLgen.

(** * Reasoning about monadic computations *)

(** The tactics below simplify hypotheses of the form [f ... = OK x s i]
  where [f] is a monadic computation.  For instance, the hypothesis
  [(do x <- a; b) s = OK y s' i] will generate the additional witnesses
  [x], [s1], [i1], [i'] and the additional hypotheses
  [a s = OK x s1 i1] and [b x s1 = OK y s' i'], reflecting the fact that
  both monadic computations [a] and [b] succeeded.
*)

Remark bind_inversion:
  forall (A B: Type) (f: mon A) (g: A -> mon B) 
         (y: B) (s1 s3: state) (i: state_incr s1 s3),
  bind f g s1 = OK y s3 i ->
  exists x, exists s2, exists i1, exists i2,
  f s1 = OK x s2 i1 /\ g x s2 = OK y s3 i2.
Proof.
  intros until i. unfold bind. destruct (f s1); intros.
  discriminate.
  exists a; exists s'; exists s.
  destruct (g a s'); inv H.
  exists s0; auto.
Qed.

Remark bind2_inversion:
  forall (A B C: Type) (f: mon (A*B)) (g: A -> B -> mon C)
         (z: C) (s1 s3: state) (i: state_incr s1 s3),
  bind2 f g s1 = OK z s3 i ->
  exists x, exists y, exists s2, exists i1, exists i2,
  f s1 = OK (x, y) s2 i1 /\ g x y s2 = OK z s3 i2.
Proof.
  unfold bind2; intros.
  exploit bind_inversion; eauto. 
  intros [[x y] [s2 [i1 [i2 [P Q]]]]]. simpl in Q.
  exists x; exists y; exists s2; exists i1; exists i2; auto.
Qed.

Ltac monadInv1 H :=
  match type of H with
  | (OK _ _ _ = OK _ _ _) =>
      inversion H; clear H; try subst
  | (Error _ _ = OK _ _ _) =>
      discriminate
  | (ret _ _ = OK _ _ _) =>
      inversion H; clear H; try subst
  | (error _ _ = OK _ _ _) =>
      discriminate
  | (bind ?F ?G ?S = OK ?X ?S' ?I) =>
      let x := fresh "x" in (
      let s := fresh "s" in (
      let i1 := fresh "INCR" in (
      let i2 := fresh "INCR" in (
      let EQ1 := fresh "EQ" in (
      let EQ2 := fresh "EQ" in (
      destruct (bind_inversion _ _ F G X S S' I H) as [x [s [i1 [i2 [EQ1 EQ2]]]]];
      clear H;
      try (monadInv1 EQ2)))))))
  | (bind2 ?F ?G ?S = OK ?X ?S' ?I) =>
      let x1 := fresh "x" in (
      let x2 := fresh "x" in (
      let s := fresh "s" in (
      let i1 := fresh "INCR" in (
      let i2 := fresh "INCR" in (
      let EQ1 := fresh "EQ" in (
      let EQ2 := fresh "EQ" in (
      destruct (bind2_inversion _ _ _ F G X S S' I H) as [x1 [x2 [s [i1 [i2 [EQ1 EQ2]]]]]];
      clear H;
      try (monadInv1 EQ2))))))))
  end.

Ltac monadInv H :=
  match type of H with
  | (ret _ _ = OK _ _ _) => monadInv1 H
  | (error _ _ = OK _ _ _) => monadInv1 H
  | (bind ?F ?G ?S = OK ?X ?S' ?I) => monadInv1 H
  | (bind2 ?F ?G ?S = OK ?X ?S' ?I) => monadInv1 H
  | (?F _ _ _ _ _ _ _ _ = OK _ _ _) => 
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ _ _ _ _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ _ _ _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ _ _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  | (?F _ = OK _ _ _) =>
      ((progress simpl in H) || unfold F in H); monadInv1 H
  end.

(** * Monotonicity properties of the state *)

Lemma instr_at_incr:
  forall s1 s2 n i,
  state_incr s1 s2 -> s1.(st_code)!n = Some i -> s2.(st_code)!n = Some i.
Proof.
  intros. inv H.
  destruct (H3 n); congruence.
Qed.
Hint Resolve instr_at_incr: rtlg.

Hint Resolve state_incr_refl state_incr_trans: rtlg.

(** * Validity and freshness of registers *)

(** An RTL pseudo-register is valid in a given state if it was created
  earlier, that is, it is less than the next fresh register of the state.
  Otherwise, the pseudo-register is said to be fresh. *)

Definition reg_valid (r: reg) (s: state) : Prop := 
  Plt r s.(st_nextreg).

Definition reg_fresh (r: reg) (s: state) : Prop :=
  ~(Plt r s.(st_nextreg)).

Lemma valid_fresh_absurd:
  forall r s, reg_valid r s -> reg_fresh r s -> False.
Proof.
  intros r s. unfold reg_valid, reg_fresh; case r; tauto.
Qed.
Hint Resolve valid_fresh_absurd: rtlg.

Lemma valid_fresh_different:
  forall r1 r2 s, reg_valid r1 s -> reg_fresh r2 s -> r1 <> r2.
Proof.
  unfold not; intros. subst r2. eauto with rtlg.
Qed.
Hint Resolve valid_fresh_different: rtlg.

Lemma reg_valid_incr: 
  forall r s1 s2, state_incr s1 s2 -> reg_valid r s1 -> reg_valid r s2.
Proof.
  intros r s1 s2 INCR.
  inversion INCR.
  unfold reg_valid. intros; apply Plt_Ple_trans with (st_nextreg s1); auto.
Qed.
Hint Resolve reg_valid_incr: rtlg.

Lemma reg_fresh_decr:
  forall r s1 s2, state_incr s1 s2 -> reg_fresh r s2 -> reg_fresh r s1.
Proof.
  intros r s1 s2 INCR. inversion INCR.
  unfold reg_fresh; unfold not; intros.
  apply H4. apply Plt_Ple_trans with (st_nextreg s1); auto.
Qed. 
Hint Resolve reg_fresh_decr: rtlg.

(** Validity of a list of registers. *)

Definition regs_valid (rl: list reg) (s: state) : Prop :=
  forall r, In r rl -> reg_valid r s.

Lemma regs_valid_nil: 
  forall s, regs_valid nil s.
Proof.
  intros; red; intros. elim H.
Qed.
Hint Resolve regs_valid_nil: rtlg.

Lemma regs_valid_cons:
  forall r1 rl s,
  reg_valid r1 s -> regs_valid rl s -> regs_valid (r1 :: rl) s.
Proof.
  intros; red; intros. elim H1; intro. subst r1; auto. auto.
Qed.

Lemma regs_valid_incr:
  forall s1 s2 rl, state_incr s1 s2 -> regs_valid rl s1 -> regs_valid rl s2.
Proof.
  unfold regs_valid; intros; eauto with rtlg.
Qed.
Hint Resolve regs_valid_incr: rtlg.

(** A register is ``in'' a mapping if it is associated with a Cminor
  local or let-bound variable. *)

Definition reg_in_map (m: mapping) (r: reg) : Prop :=
  (exists id, m.(map_vars)!id = Some r) \/ In r m.(map_letvars).

(** A compilation environment (mapping) is valid in a given state if
  the registers associated with Cminor local variables and let-bound variables
  are valid in the state. *)

Definition map_valid (m: mapping) (s: state) : Prop :=
  forall r, reg_in_map m r -> reg_valid r s.

Lemma map_valid_incr:
  forall s1 s2 m,
  state_incr s1 s2 -> map_valid m s1 -> map_valid m s2.
Proof.
  unfold map_valid; intros; eauto with rtlg.
Qed.
Hint Resolve map_valid_incr: rtlg.

(** * Properties of basic operations over the state *)

(** Properties of [add_instr]. *)

Lemma add_instr_at:
  forall s1 s2 incr i n,
  add_instr i s1 = OK n s2 incr -> s2.(st_code)!n = Some i.
Proof.
  intros. monadInv H. simpl. apply PTree.gss.
Qed.
Hint Resolve add_instr_at: rtlg.

(** Properties of [update_instr]. *)

Lemma update_instr_at:
  forall n i s1 s2 incr u,
  update_instr n i s1 = OK u s2 incr -> s2.(st_code)!n = Some i.
Proof.
  intros. unfold update_instr in H. 
  destruct (plt n (st_nextnode s1)); try discriminate.
  destruct (check_empty_node s1 n); try discriminate.
  inv H. simpl. apply PTree.gss.
Qed.
Hint Resolve update_instr_at: rtlg.

(** Properties of [new_reg]. *)

Lemma new_reg_valid:
  forall s1 s2 r i,
  new_reg s1 = OK r s2 i -> reg_valid r s2.
Proof.
  intros. monadInv H.
  unfold reg_valid; simpl. apply Plt_succ.
Qed.
Hint Resolve new_reg_valid: rtlg.

Lemma new_reg_fresh:
  forall s1 s2 r i,
  new_reg s1 = OK r s2 i -> reg_fresh r s1.
Proof.
  intros. monadInv H.
  unfold reg_fresh; simpl.
  exact (Plt_strict _).
Qed.
Hint Resolve new_reg_fresh: rtlg.

Lemma new_reg_not_in_map:
  forall s1 s2 m r i,
  new_reg s1 = OK r s2 i -> map_valid m s1 -> ~(reg_in_map m r).
Proof.
  unfold not; intros; eauto with rtlg.
Qed. 
Hint Resolve new_reg_not_in_map: rtlg.

(** * Properties of operations over compilation environments *)

Lemma init_mapping_valid:
  forall s, map_valid init_mapping s.
Proof.
  unfold map_valid, init_mapping.
  intros s r [[id A] | B].  
  simpl in A. rewrite PTree.gempty in A; discriminate.
  simpl in B. tauto.
Qed.  

(** Properties of [find_var]. *)

Lemma find_var_in_map:
  forall s1 s2 map name r i,
  find_var map name s1 = OK r s2 i -> reg_in_map map r.
Proof.
  intros until r. unfold find_var; caseEq (map.(map_vars)!name).
  intros. inv H0. left; exists name; auto.
  intros. inv H0.
Qed.
Hint Resolve find_var_in_map: rtlg.

Lemma find_var_valid:
  forall s1 s2 map name r i,
  find_var map name s1 = OK r s2 i -> map_valid map s1 -> reg_valid r s1.
Proof.
  eauto with rtlg.
Qed.
Hint Resolve find_var_valid: rtlg.

(** Properties of [find_letvar]. *)

Lemma find_letvar_in_map:
  forall s1 s2 map idx r i,
  find_letvar map idx s1 = OK r s2 i -> reg_in_map map r.
Proof.
  intros until r. unfold find_letvar.
  caseEq (nth_error (map_letvars map) idx); intros; monadInv H0.
  right; apply nth_error_in with idx; auto.
Qed.
Hint Resolve find_letvar_in_map: rtlg.

Lemma find_letvar_valid:
  forall s1 s2 map idx r i,
  find_letvar map idx s1 = OK r s2 i -> map_valid map s1 -> reg_valid r s1.
Proof.
  eauto with rtlg.
Qed.
Hint Resolve find_letvar_valid: rtlg.

(** Properties of [add_var]. *)

Lemma add_var_valid:
  forall s1 s2 map1 map2 name r i, 
  add_var map1 name s1 = OK (r, map2) s2 i ->
  map_valid map1 s1 ->
  reg_valid r s2 /\ map_valid map2 s2.
Proof.
  intros. monadInv H. 
  split. eauto with rtlg.
  inversion EQ. subst. red. intros r' [[id A] | B].
  simpl in A. rewrite PTree.gsspec in A. destruct (peq id name).
  inv A. eauto with rtlg.
  apply reg_valid_incr with s1. eauto with rtlg. 
  apply H0. left; exists id; auto.
  simpl in B. apply reg_valid_incr with s1. eauto with rtlg.
  apply H0. right; auto.
Qed.

Lemma add_var_find:
  forall s1 s2 map name r map' i,
  add_var map name s1 = OK (r,map') s2 i -> map'.(map_vars)!name = Some r.
Proof.
  intros. monadInv H. simpl. apply PTree.gss. 
Qed.

Lemma add_vars_valid:
  forall namel s1 s2 map1 map2 rl i, 
  add_vars map1 namel s1 = OK (rl, map2) s2 i ->
  map_valid map1 s1 ->
  regs_valid rl s2 /\ map_valid map2 s2.
Proof.
  induction namel; simpl; intros; monadInv H.
  split. red; simpl; intros; tauto. auto.
  exploit IHnamel; eauto. intros [A B].
  exploit add_var_valid; eauto. intros [C D].
  split. apply regs_valid_cons; eauto with rtlg.
  auto.
Qed.

Lemma add_var_letenv:
  forall map1 id s1 r map2 s2 i,
  add_var map1 id s1 = OK (r, map2) s2 i ->
  map2.(map_letvars) = map1.(map_letvars).
Proof.
  intros; monadInv H. reflexivity.
Qed.

Lemma add_vars_letenv:
  forall il map1 s1 rl map2 s2 i,
  add_vars map1 il s1 = OK (rl, map2) s2 i ->
  map2.(map_letvars) = map1.(map_letvars).
Proof.
  induction il; simpl; intros; monadInv H.
  reflexivity.
  transitivity (map_letvars x0).
  eapply add_var_letenv; eauto.
  eauto.
Qed.

(** Properties of [add_letvar]. *)

Lemma add_letvar_valid:
  forall map s r,
  map_valid map s ->
  reg_valid r s ->
  map_valid (add_letvar map r) s.
Proof.
  intros; red; intros. 
  destruct H1 as [[id A]|B]. 
  simpl in A. apply H. left; exists id; auto.
  simpl in B. elim B; intro. 
  subst r0; auto. apply H. right; auto.
Qed.

(** * Properties of [alloc_reg] and [alloc_regs] *)

Lemma alloc_reg_valid:
  forall a s1 s2 map r i,
  map_valid map s1 ->
  alloc_reg map a s1 = OK r s2 i -> reg_valid r s2.
Proof.
  intros until r.  unfold alloc_reg.
  case a; eauto with rtlg.
Qed.
Hint Resolve alloc_reg_valid: rtlg.

Lemma alloc_reg_fresh_or_in_map:
  forall map a s r s' i,
  map_valid map s ->
  alloc_reg map a s = OK r s' i ->
  reg_in_map map r \/ reg_fresh r s.
Proof.
  intros until s'. unfold alloc_reg.
  destruct a; intros; try (right; eauto with rtlg; fail).
  left; eauto with rtlg.
  left; eauto with rtlg.
Qed.

Lemma alloc_regs_valid:
  forall al s1 s2 map rl i,
  map_valid map s1 ->
  alloc_regs map al s1 = OK rl s2 i ->
  regs_valid rl s2.
Proof.
  induction al; simpl; intros; monadInv H0.
  apply regs_valid_nil.
  apply regs_valid_cons. eauto with rtlg. eauto with rtlg. 
Qed.
Hint Resolve alloc_regs_valid: rtlg.

Lemma alloc_regs_fresh_or_in_map:
  forall map al s rl s' i,
  map_valid map s ->
  alloc_regs map al s = OK rl s' i ->
  forall r, In r rl -> reg_in_map map r \/ reg_fresh r s.
Proof.
  induction al; simpl; intros; monadInv H0.
  elim H1.
  elim H1; intro. 
  subst r.
  eapply alloc_reg_fresh_or_in_map; eauto.
  exploit IHal. 2: eauto. apply map_valid_incr with s; eauto with rtlg. eauto.
  intros [A|B]. auto. right; eauto with rtlg.
Qed.

(** A register is an adequate target for holding the value of an
  expression if
- either the register is associated with a Cminor let-bound variable
  or a Cminor local variable;
- or the register is not associated with any Cminor variable
  and does not belong to the preserved set [pr]. *)

Inductive target_reg_ok (map: mapping) (pr: list reg): expr -> reg -> Prop :=
  | target_reg_var:
      forall id r,
      map.(map_vars)!id = Some r ->
      target_reg_ok map pr (Evar id) r
  | target_reg_letvar:
      forall idx r,
      nth_error map.(map_letvars) idx = Some r ->
      target_reg_ok map pr (Eletvar idx) r
  | target_reg_other:
      forall a r,
      ~(reg_in_map map r) -> ~In r pr ->
      target_reg_ok map pr a r.

Inductive target_regs_ok (map: mapping) (pr: list reg): exprlist -> list reg -> Prop :=
  | target_regs_nil:
      target_regs_ok map pr Enil nil
  | target_regs_cons: forall a1 al r1 rl,
      target_reg_ok map pr a1 r1 ->
      target_regs_ok map (r1 :: pr) al rl ->
      target_regs_ok map pr (Econs a1 al) (r1 :: rl).

Lemma target_reg_ok_append:
  forall map pr a r,
  target_reg_ok map pr a r ->
  forall pr',
  (forall r', In r' pr' -> reg_in_map map r' \/ r' <> r) ->
  target_reg_ok map (pr' ++ pr) a r.
Proof.
  induction 1; intros.
  constructor; auto.
  constructor; auto.
  constructor; auto. red; intros. 
  elim (in_app_or _ _ _ H2); intro. 
  generalize (H1 _ H3). tauto. tauto.
Qed.

Lemma target_reg_ok_cons:
  forall map pr a r,
  target_reg_ok map pr a r ->
  forall r',
  reg_in_map map r' \/ r' <> r ->
  target_reg_ok map (r' :: pr) a r.
Proof.
  intros. change (r' :: pr) with ((r' :: nil) ++ pr).
  apply target_reg_ok_append; auto. 
  intros r'' [A|B]. subst r''; auto. contradiction.
Qed.

Lemma new_reg_target_ok:
  forall map pr s1 a r s2 i,
  map_valid map s1 ->
  regs_valid pr s1 ->
  new_reg s1 = OK r s2 i ->
  target_reg_ok map pr a r.
Proof.
  intros. constructor. 
  red; intro. apply valid_fresh_absurd with r s1.
  eauto with rtlg. eauto with rtlg.
  red; intro. apply valid_fresh_absurd with r s1.
  auto. eauto with rtlg.
Qed.

Lemma alloc_reg_target_ok:
  forall map pr s1 a r s2 i,
  map_valid map s1 ->
  regs_valid pr s1 ->
  alloc_reg map a s1 = OK r s2 i ->
  target_reg_ok map pr a r.
Proof.
  intros. unfold alloc_reg in H1. destruct a;
  try (eapply new_reg_target_ok; eauto; fail).
  (* Evar *)
  generalize H1; unfold find_var. caseEq (map_vars map)!i0; intros.
  inv H3. constructor. auto. inv H3.
  (* Elet *)
  generalize H1; unfold find_letvar. caseEq (nth_error (map_letvars map) n); intros.
  inv H3. constructor. auto. inv H3.
Qed.

Lemma alloc_regs_target_ok:
  forall map al pr s1 rl s2 i,
  map_valid map s1 ->
  regs_valid pr s1 ->
  alloc_regs map al s1 = OK rl s2 i ->
  target_regs_ok map pr al rl.
Proof.
  induction al; intros; monadInv H1.
  constructor.
  constructor.
  eapply alloc_reg_target_ok; eauto. 
  apply IHal with s s2 INCR1; eauto with rtlg. 
  apply regs_valid_cons; eauto with rtlg.
Qed.

Hint Resolve new_reg_target_ok alloc_reg_target_ok alloc_regs_target_ok: rtlg.  

(** The following predicate is a variant of [target_reg_ok] used
  to characterize registers that are adequate for holding the return
  value of a function. *)

Inductive return_reg_ok: state -> mapping -> option reg -> Prop :=
  | return_reg_ok_none:
      forall s map,
      return_reg_ok s map None
  | return_reg_ok_some:
      forall s map r,
      ~(reg_in_map map r) -> reg_valid r s ->
      return_reg_ok s map (Some r).

Lemma return_reg_ok_incr:
  forall s map rret, return_reg_ok s map rret ->
  forall s', state_incr s s' -> return_reg_ok s' map rret.
Proof.
  induction 1; intros; econstructor; eauto with rtlg.
Qed.
Hint Resolve return_reg_ok_incr: rtlg.

Lemma new_reg_return_ok:
  forall s1 r s2 map sig i,
  new_reg s1 = OK r s2 i ->
  map_valid map s1 ->
  return_reg_ok s2 map (ret_reg sig r).
Proof.
  intros. unfold ret_reg. destruct (sig_res sig); constructor.
  eauto with rtlg. eauto with rtlg.  
Qed.

(** * Relational specification of the translation *)

(** We now define inductive predicates that characterize the fact that
  the control-flow graph produced by compilation of a Cminor function
  contains sub-graphs that correspond to the translation of each
  Cminor expression or statement in the original code. *)

(** [tr_move c ns rs nd rd] holds if the graph [c], between nodes [ns]
  and [nd], contains instructions that move the value of register [rs]
  to register [rd]. *)

Inductive tr_move (c: code):
       node -> reg -> node -> reg -> Prop :=
  | tr_move_0: forall n r,
      tr_move c n r n r
  | tr_move_1: forall ns rs nd rd,
      c!ns = Some (Iop Omove (rs :: nil) rd nd) ->
      tr_move c ns rs nd rd.

(** [tr_expr c map pr expr ns nd rd] holds if the graph [c],
  between nodes [ns] and [nd], contains instructions that compute the
  value of the Cminor expression [expr] and deposit this value in
  register [rd].  [map] is a mapping from Cminor variables to the
  corresponding RTL registers.  [pr] is a list of RTL registers whose
  values must be preserved during this computation.  All registers
  mentioned in [map] must also be preserved during this computation.
  To ensure this, we demand that the result registers of the instructions
  appearing on the path from [ns] to [nd] are neither in [pr] nor in [map].
*)

Inductive tr_expr (c: code): 
       mapping -> list reg -> expr -> node -> node -> reg -> Prop :=
  | tr_Evar: forall map pr id ns nd r rd,
      map.(map_vars)!id = Some r ->
      (rd = r \/ ~reg_in_map map rd /\ ~In rd pr) ->
      tr_move c ns r nd rd ->
      tr_expr c map pr (Evar id) ns nd rd
  | tr_Eop: forall map pr op al ns nd rd n1 rl,
      tr_exprlist c map pr al ns n1 rl ->
      c!n1 = Some (Iop op rl rd nd) ->
      ~reg_in_map map rd -> ~In rd pr ->
      tr_expr c map pr (Eop op al) ns nd rd
  | tr_Eload: forall map pr chunk addr al ns nd rd n1 rl,
      tr_exprlist c map pr al ns n1 rl ->
      c!n1 = Some (Iload chunk addr rl rd nd) ->
      ~reg_in_map map rd -> ~In rd pr ->
      tr_expr c map pr (Eload chunk addr al) ns nd rd
  | tr_Econdition: forall map pr b ifso ifnot ns nd rd ntrue nfalse,
      tr_condition c map pr b ns ntrue nfalse ->
      tr_expr c map pr ifso ntrue nd rd ->
      tr_expr c map pr ifnot nfalse nd rd ->
      tr_expr c map pr (Econdition b ifso ifnot) ns nd rd
  | tr_Elet: forall map pr b1 b2 ns nd rd n1 r,
      ~reg_in_map map r ->
      tr_expr c map pr b1 ns n1 r ->
      tr_expr c (add_letvar map r) pr b2 n1 nd rd ->
      tr_expr c map pr (Elet b1 b2) ns nd rd
  | tr_Eletvar: forall map pr n ns nd rd r,
      List.nth_error map.(map_letvars) n = Some r ->
      (rd = r \/ ~reg_in_map map rd /\ ~In rd pr) ->
      tr_move c ns r nd rd ->
      tr_expr c map pr (Eletvar n) ns nd rd

(** [tr_condition c map pr cond ns ntrue nfalse rd] holds if the graph [c],
  starting at node [ns], contains instructions that compute the truth
  value of the Cminor conditional expression [cond] and terminate
  on node [ntrue] if the condition holds and on node [nfalse] otherwise. *)

with tr_condition (c: code): 
       mapping -> list reg -> condexpr -> node -> node -> node -> Prop :=
  | tr_CEtrue: forall map pr ntrue nfalse,
      tr_condition c map pr CEtrue ntrue ntrue nfalse
  | tr_CEfalse: forall map pr ntrue nfalse,
      tr_condition c map pr CEfalse nfalse ntrue nfalse
  | tr_CEcond: forall map pr cond bl ns ntrue nfalse n1 rl,
      tr_exprlist c map pr bl ns n1 rl ->
      c!n1 = Some (Icond cond rl ntrue nfalse) ->
      tr_condition c map pr (CEcond cond bl) ns ntrue nfalse
  | tr_CEcondition: forall map pr b ifso ifnot ns ntrue nfalse ntrue' nfalse',
      tr_condition c map pr b ns ntrue' nfalse' ->
      tr_condition c map pr ifso ntrue' ntrue nfalse ->
      tr_condition c map pr ifnot nfalse' ntrue nfalse ->
      tr_condition c map pr (CEcondition b ifso ifnot) ns ntrue nfalse

(** [tr_exprlist c map pr exprs ns nd rds] holds if the graph [c],
  between nodes [ns] and [nd], contains instructions that compute the values
  of the list of Cminor expression [exprlist] and deposit these values
  in registers [rds]. *)

with tr_exprlist (c: code): 
       mapping -> list reg -> exprlist -> node -> node -> list reg -> Prop :=
  | tr_Enil: forall map pr n,
      tr_exprlist c map pr Enil n n nil
  | tr_Econs: forall map pr a1 al ns nd r1 rl n1,
      tr_expr c map pr a1 ns n1 r1 ->
      tr_exprlist c map (r1 :: pr) al n1 nd rl ->
      tr_exprlist c map pr (Econs a1 al) ns nd (r1 :: rl).

(** Auxiliary for the compilation of variable assignments. *)

Definition tr_store_var (c: code) (map: mapping)
                        (rs: reg) (id: ident) (ns nd: node): Prop :=
  exists rv, map.(map_vars)!id = Some rv /\ tr_move c ns rs nd rv.

Definition tr_store_optvar (c: code) (map: mapping)
                 (rs: reg) (optid: option ident) (ns nd: node): Prop :=
  match optid with
  | None => ns = nd
  | Some id => tr_store_var c map rs id ns nd
  end.

(** Auxiliary for the compilation of [switch] statements. *)

Inductive tr_switch
     (c: code) (r: reg) (nexits: list node):
     comptree -> node -> Prop :=
  | tr_switch_action: forall act n,
      nth_error nexits act = Some n ->
      tr_switch c r nexits (CTaction act) n
  | tr_switch_ifeq: forall key act t' n ncont nfound,
      tr_switch c r nexits t' ncont ->
      nth_error nexits act = Some nfound ->
      c!n = Some(Icond (Ccompimm Ceq key) (r :: nil) nfound ncont) ->
      tr_switch c r nexits (CTifeq key act t') n
  | tr_switch_iflt: forall key t1 t2 n n1 n2,
      tr_switch c r nexits t1 n1 ->
      tr_switch c r nexits t2 n2 ->
      c!n = Some(Icond (Ccompuimm Clt key) (r :: nil) n1 n2) ->
      tr_switch c r nexits (CTiflt key t1 t2) n.

(** [tr_stmt c map stmt ns ncont nexits nret rret] holds if the graph [c],
  starting at node [ns], contains instructions that perform the Cminor
  statement [stmt].   These instructions branch to node [ncont] if
  the statement terminates normally, to the [n]-th node in [nexits]
  if the statement terminates prematurely on a [exit n] statement,
  and to [nret] if the statement terminates prematurely on a [return]
  statement.  Moreover, if the [return] statement has an argument,
  its value is deposited in register [rret]. *)

Inductive tr_stmt (c: code) (map: mapping):
     stmt -> node -> node -> list node -> labelmap -> node -> option reg -> Prop :=
  | tr_Sskip: forall ns nexits ngoto nret rret,
     tr_stmt c map Sskip ns ns nexits ngoto nret rret
  | tr_Sassign: forall id a ns nd nexits ngoto nret rret rt n,
     tr_expr c map nil a ns n rt ->
     tr_store_var c map rt id n nd ->
     tr_stmt c map (Sassign id a) ns nd nexits ngoto nret rret
  | tr_Sstore: forall chunk addr al b ns nd nexits ngoto nret rret rd n1 rl n2,
     tr_exprlist c map nil al ns n1 rl ->
     tr_expr c map rl b n1 n2 rd ->
     c!n2 = Some (Istore chunk addr rl rd nd) ->
     tr_stmt c map (Sstore chunk addr al b) ns nd nexits ngoto nret rret
  | tr_Scall: forall optid sig b cl ns nd nexits ngoto nret rret rd n1 rf n2 n3 rargs,
     tr_expr c map nil b ns n1 rf ->
     tr_exprlist c map (rf :: nil) cl n1 n2 rargs ->
     c!n2 = Some (Icall sig (inl _ rf) rargs rd n3) ->
     tr_store_optvar c map rd optid n3 nd ->
     ~reg_in_map map rd ->
     tr_stmt c map (Scall optid sig b cl) ns nd nexits ngoto nret rret
  | tr_Stailcall: forall sig b cl ns nd nexits ngoto nret rret n1 rf n2 rargs,
     tr_expr c map nil b ns n1 rf ->
     tr_exprlist c map (rf :: nil) cl n1 n2 rargs ->
     c!n2 = Some (Itailcall sig (inl _ rf) rargs) ->
     tr_stmt c map (Stailcall sig b cl) ns nd nexits ngoto nret rret
  | tr_Sseq: forall s1 s2 ns nd nexits ngoto nret rret n,
     tr_stmt c map s2 n nd nexits ngoto nret rret ->
     tr_stmt c map s1 ns n nexits ngoto nret rret ->
     tr_stmt c map (Sseq s1 s2) ns nd nexits ngoto nret rret
  | tr_Sifthenelse: forall a strue sfalse ns nd nexits ngoto nret rret ntrue nfalse,
     tr_stmt c map strue ntrue nd nexits ngoto nret rret ->
     tr_stmt c map sfalse nfalse nd nexits ngoto nret rret ->
     tr_condition c map nil a ns ntrue nfalse ->
     tr_stmt c map (Sifthenelse a strue sfalse) ns nd nexits ngoto nret rret
  | tr_Sloop: forall sbody ns nd nexits ngoto nret rret nloop,
     tr_stmt c map sbody nloop ns nexits ngoto nret rret ->
     c!ns = Some(Inop nloop) ->
     tr_stmt c map (Sloop sbody) ns nd nexits ngoto nret rret
  | tr_Sblock: forall sbody ns nd nexits ngoto nret rret,
     tr_stmt c map sbody ns nd (nd :: nexits) ngoto nret rret ->
     tr_stmt c map (Sblock sbody) ns nd nexits ngoto nret rret
  | tr_Sexit: forall n ns nd nexits ngoto nret rret,
     nth_error nexits n = Some ns ->
     tr_stmt c map (Sexit n) ns nd nexits ngoto nret rret
  | tr_Sswitch: forall a cases default ns nd nexits ngoto nret rret n r t,
     validate_switch default cases t = true ->
     tr_expr c map nil a ns n r ->
     tr_switch c r nexits t n ->
     tr_stmt c map (Sswitch a cases default) ns nd nexits ngoto nret rret
  | tr_Sreturn_none: forall nret nd nexits ngoto,
     tr_stmt c map (Sreturn None) nret nd nexits ngoto nret None
  | tr_Sreturn_some: forall a ns nd nexits ngoto nret rret,
     tr_expr c map nil a ns nret rret ->
     tr_stmt c map (Sreturn (Some a)) ns nd nexits ngoto nret (Some rret)
  | tr_Slabel: forall lbl s ns nd nexits ngoto nret rret n,
     ngoto!lbl = Some n ->
     c!n = Some (Inop ns) ->
     tr_stmt c map s ns nd nexits ngoto nret rret ->
     tr_stmt c map (Slabel lbl s) ns nd nexits ngoto nret rret
  | tr_Sgoto: forall lbl ns nd nexits ngoto nret rret,
     ngoto!lbl = Some ns ->
     tr_stmt c map (Sgoto lbl) ns nd nexits ngoto nret rret.

(** [tr_function f tf] specifies the RTL function [tf] that 
  [RTLgen.transl_function] returns.  *)

Inductive tr_function: CminorSel.function -> RTL.function -> Prop :=
  | tr_function_intro:
      forall f code rparams map1 s0 s1 i1 rvars map2 s2 i2 nentry ngoto nret rret orret,
      add_vars init_mapping f.(CminorSel.fn_params) s0 = OK (rparams, map1) s1 i1 ->
      add_vars map1 f.(CminorSel.fn_vars) s1 = OK (rvars, map2) s2 i2 ->
      orret = ret_reg f.(CminorSel.fn_sig) rret ->
      tr_stmt code map2 f.(CminorSel.fn_body) nentry nret nil ngoto nret orret ->
      code!nret = Some(Ireturn orret) -> 
      tr_function f (RTL.mkfunction
                       f.(CminorSel.fn_sig)
                       rparams
                       f.(CminorSel.fn_stackspace)
                       code
                       nentry).

(** * Correctness proof of the translation functions *)

(** We now show that the translation functions in module [RTLgen]
  satisfy the specifications given above as inductive predicates. *)

Lemma tr_move_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall ns rs nd rd,
  tr_move s1.(st_code) ns rs nd rd ->
  tr_move s2.(st_code) ns rs nd rd.
Proof.
  induction 2; econstructor; eauto with rtlg.
Qed.

Lemma tr_expr_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map pr a ns nd rd,
  tr_expr s1.(st_code) map pr a ns nd rd ->
  tr_expr s2.(st_code) map pr a ns nd rd
with tr_condition_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map pr a ns ntrue nfalse,
  tr_condition s1.(st_code) map pr a ns ntrue nfalse ->
  tr_condition s2.(st_code) map pr a ns ntrue nfalse
with tr_exprlist_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map pr al ns nd rl,
  tr_exprlist s1.(st_code) map pr al ns nd rl ->
  tr_exprlist s2.(st_code) map pr al ns nd rl.
Proof.
  intros s1 s2 EXT. 
  pose (AT := fun pc i => instr_at_incr s1 s2 pc i EXT).
  induction 1; econstructor; eauto.
  eapply tr_move_incr; eauto.
  eapply tr_move_incr; eauto.
  intros s1 s2 EXT. 
  pose (AT := fun pc i => instr_at_incr s1 s2 pc i EXT).
  induction 1; econstructor; eauto.
  intros s1 s2 EXT. 
  pose (AT := fun pc i => instr_at_incr s1 s2 pc i EXT).
  induction 1; econstructor; eauto.
Qed.

Lemma add_move_charact:
  forall s ns rs nd rd s' i,
  add_move rs rd nd s = OK ns s' i -> 
  tr_move s'.(st_code) ns rs nd rd.
Proof.
  intros. unfold add_move in H. destruct (Reg.eq rs rd).
  inv H. constructor.
  constructor. eauto with rtlg.
Qed.

Lemma transl_expr_charact:
  forall a map rd nd s ns s' pr INCR
     (TR: transl_expr map a rd nd s = OK ns s' INCR)
     (WF: map_valid map s)
     (OK: target_reg_ok map pr a rd)
     (VALID: regs_valid pr s)
     (VALID2: reg_valid rd s),
   tr_expr s'.(st_code) map pr a ns nd rd

with transl_condexpr_charact:
  forall a map ntrue nfalse s ns s' pr INCR
     (TR: transl_condition map a ntrue nfalse s = OK ns s' INCR)
     (VALID: regs_valid pr s)
     (WF: map_valid map s),
   tr_condition s'.(st_code) map pr a ns ntrue nfalse

with transl_exprlist_charact:
  forall al map rl nd s ns s' pr INCR
     (TR: transl_exprlist map al rl nd s = OK ns s' INCR)
     (WF: map_valid map s)
     (OK: target_regs_ok map pr al rl)
     (VALID1: regs_valid pr s)
     (VALID2: regs_valid rl s),
   tr_exprlist s'.(st_code) map pr al ns nd rl.

Proof.
  induction a; intros; try (monadInv TR).
  (* Evar *)
  generalize EQ; unfold find_var. caseEq (map_vars map)!i; intros; inv EQ1.
  econstructor; eauto.
  inv OK. left; congruence. right; eauto.
  eapply add_move_charact; eauto.
  (* Eop *)
  inv OK.
  econstructor; eauto with rtlg.
  eapply transl_exprlist_charact; eauto with rtlg.
  (* Eload *)
  inv OK.
  econstructor; eauto with rtlg.
  eapply transl_exprlist_charact; eauto with rtlg. 
  (* Econdition *)
  inv OK.
  econstructor; eauto with rtlg.
  eapply transl_condexpr_charact; eauto with rtlg.
  apply tr_expr_incr with s1; auto. 
  eapply transl_expr_charact; eauto with rtlg. constructor; auto.
  apply tr_expr_incr with s0; auto. 
  eapply transl_expr_charact; eauto with rtlg. constructor; auto.
  (* Elet *)
  inv OK.
  econstructor. eapply new_reg_not_in_map; eauto with rtlg.  
  eapply transl_expr_charact; eauto with rtlg.
  apply tr_expr_incr with s1; auto.
  eapply transl_expr_charact. eauto. 
  apply add_letvar_valid; eauto with rtlg. 
  constructor; auto. 
  red; unfold reg_in_map. simpl. intros [[id A] | [B | C]].
  elim H. left; exists id; auto.
  subst x. apply valid_fresh_absurd with rd s. auto. eauto with rtlg.
  elim H. right; auto.
  eauto with rtlg. eauto with rtlg.
  (* Eletvar *)
  generalize EQ; unfold find_letvar. caseEq (nth_error (map_letvars map) n); intros; inv EQ0.
  monadInv EQ1.
  econstructor; eauto with rtlg. 
  inv OK. left; congruence. right; eauto.
  eapply add_move_charact; eauto.
  monadInv EQ1.

(* Conditions *)
  induction a; intros; try (monadInv TR).

  (* CEtrue *)
  constructor.
  (* CEfalse *)
  constructor.
  (* CEcond *)
  econstructor; eauto with rtlg.
  eapply transl_exprlist_charact; eauto with rtlg.
  (* CEcondition *)
  econstructor.
  eapply transl_condexpr_charact; eauto with rtlg.
  apply tr_condition_incr with s1; auto.
  eapply transl_condexpr_charact; eauto with rtlg.
  apply tr_condition_incr with s0; auto.
  eapply transl_condexpr_charact; eauto with rtlg.

(* Lists *)

  induction al; intros; try (monadInv TR).

  (* Enil *)
  destruct rl; inv TR. constructor.
  (* Econs *)
  destruct rl; simpl in TR; monadInv TR. inv OK.
  econstructor.
  eapply transl_expr_charact; eauto with rtlg.
  generalize (VALID2 r (in_eq _ _)). eauto with rtlg.
  apply tr_exprlist_incr with s0; auto.
  eapply transl_exprlist_charact; eauto with rtlg.
  apply regs_valid_cons. apply VALID2. auto with coqlib. auto. 
  red; intros; apply VALID2; auto with coqlib.
Qed.

Lemma tr_store_var_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map rs id ns nd,
  tr_store_var s1.(st_code) map rs id ns nd ->
  tr_store_var s2.(st_code) map rs id ns nd.
Proof.
  intros. destruct H0 as [rv [A B]]. 
  econstructor; split. eauto. eapply tr_move_incr; eauto.
Qed.
 
Lemma tr_store_optvar_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map rs optid ns nd,
  tr_store_optvar s1.(st_code) map rs optid ns nd ->
  tr_store_optvar s2.(st_code) map rs optid ns nd.
Proof.
  intros until nd. destruct optid; simpl. 
  apply tr_store_var_incr; auto.
  auto.
Qed.

Lemma tr_switch_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall r nexits t ns,
  tr_switch s1.(st_code) r nexits t ns ->
  tr_switch s2.(st_code) r nexits t ns.
Proof.
  induction 2; econstructor; eauto with rtlg.
Qed.

Lemma tr_stmt_incr:
  forall s1 s2, state_incr s1 s2 ->
  forall map s ns nd nexits ngoto nret rret,
  tr_stmt s1.(st_code) map s ns nd nexits ngoto nret rret ->
  tr_stmt s2.(st_code) map s ns nd nexits ngoto nret rret.
Proof.
  intros s1 s2 EXT.
  generalize tr_expr_incr tr_condition_incr tr_exprlist_incr; intros I1 I2 I3.
  pose (AT := fun pc i => instr_at_incr s1 s2 pc i EXT).
  pose (STV := tr_store_var_incr s1 s2 EXT).
  pose (STOV := tr_store_optvar_incr s1 s2 EXT).
  induction 1; econstructor; eauto.
  eapply tr_switch_incr; eauto.
Qed.

Lemma store_var_charact:
  forall map rs id nd s ns s' incr,
  store_var map rs id nd s = OK ns s' incr ->
  tr_store_var s'.(st_code) map rs id ns nd.
Proof.
  intros. monadInv H. generalize EQ. unfold find_var.
  caseEq ((map_vars map)!id). 2: intros; discriminate. intros. monadInv EQ1.
  exists x; split. auto. eapply add_move_charact; eauto.
Qed.

Lemma store_optvar_charact:
  forall map rs optid nd s ns s' incr,
  store_optvar map rs optid nd s = OK ns s' incr ->
  tr_store_optvar s'.(st_code) map rs optid ns nd.
Proof.
  intros. destruct optid; simpl in H; simpl.
  eapply store_var_charact; eauto.
  monadInv H. auto. 
Qed. 

Lemma transl_exit_charact:
  forall nexits n s ne s' incr,
  transl_exit nexits n s = OK ne s' incr ->
  nth_error nexits n = Some ne /\ s' = s.
Proof.
  intros until incr. unfold transl_exit. 
  destruct (nth_error nexits n); intro; monadInv H. auto.
Qed.

Lemma transl_switch_charact:
  forall r nexits t s ns s' incr,
  transl_switch r nexits t s = OK ns s' incr ->
  tr_switch s'.(st_code) r nexits t ns.
Proof.
  induction t; simpl; intros.
  exploit transl_exit_charact; eauto. intros [A B].
  econstructor; eauto.

  monadInv H.
  exploit transl_exit_charact; eauto. intros [A B]. subst s1.
  econstructor; eauto with rtlg. 
  apply tr_switch_incr with s0; eauto with rtlg.

  monadInv H.
  econstructor; eauto with rtlg. 
  apply tr_switch_incr with s1; eauto with rtlg.
  apply tr_switch_incr with s0; eauto with rtlg.
Qed.
 
Lemma transl_stmt_charact:
  forall map stmt nd nexits ngoto nret rret s ns s' INCR
    (TR: transl_stmt map stmt nd nexits ngoto nret rret s = OK ns s' INCR)
    (WF: map_valid map s)
    (OK: return_reg_ok s map rret),
  tr_stmt s'.(st_code) map stmt ns nd nexits ngoto nret rret.
Proof.
  induction stmt; intros; simpl in TR; try (monadInv TR).
  (* Sskip *)
  constructor.
  (* Sassign *)
  econstructor. eapply transl_expr_charact; eauto with rtlg.
  apply tr_store_var_incr with s1; auto with rtlg.
  eapply store_var_charact; eauto.
  (* Sstore *)
  econstructor; eauto with rtlg.
  eapply transl_exprlist_charact; eauto with rtlg.
  apply tr_expr_incr with s3; eauto with rtlg.
  eapply transl_expr_charact; eauto with rtlg. 
  (* Scall *)
  assert (state_incr s0 s3) by eauto with rtlg.
  assert (state_incr s3 s6) by eauto with rtlg.
  econstructor; eauto with rtlg.
  eapply transl_expr_charact; eauto with rtlg.
  apply tr_exprlist_incr with s6. auto. 
  eapply transl_exprlist_charact; eauto with rtlg.
  eapply alloc_regs_target_ok with (s1 := s1); eauto with rtlg.
  apply regs_valid_cons; eauto with rtlg.
  apply regs_valid_incr with s1; eauto with rtlg.
  apply regs_valid_cons; eauto with rtlg.
  apply regs_valid_incr with s2; eauto with rtlg.
  apply tr_store_optvar_incr with s4; eauto with rtlg.
  eapply store_optvar_charact; eauto with rtlg.
  (* Stailcall *)
  assert (RV: regs_valid (x :: nil) s1).
    apply regs_valid_cons; eauto with rtlg. 
  econstructor; eauto with rtlg.
  eapply transl_expr_charact; eauto with rtlg.
  apply tr_exprlist_incr with s4; auto.
  eapply transl_exprlist_charact; eauto with rtlg.
  (* Sseq *)
  econstructor. 
  apply tr_stmt_incr with s0; auto. 
  eapply IHstmt2; eauto with rtlg.
  eapply IHstmt1; eauto with rtlg.
  (* Sifthenelse *)
  destruct (more_likely c stmt1 stmt2); monadInv TR.
  econstructor.
  apply tr_stmt_incr with s1; auto. 
  eapply IHstmt1; eauto with rtlg.
  apply tr_stmt_incr with s0; auto.
  eapply IHstmt2; eauto with rtlg.
  eapply transl_condexpr_charact; eauto with rtlg.
  econstructor.
  apply tr_stmt_incr with s0; auto. 
  eapply IHstmt1; eauto with rtlg.
  apply tr_stmt_incr with s1; auto.
  eapply IHstmt2; eauto with rtlg.
  eapply transl_condexpr_charact; eauto with rtlg.
  (* Sloop *)
  econstructor. 
  apply tr_stmt_incr with s1; auto. 
  eapply IHstmt; eauto with rtlg.
  eauto with rtlg.
  (* Sblock *)
  econstructor. 
  eapply IHstmt; eauto with rtlg.
  (* Sexit *)
  exploit transl_exit_charact; eauto. intros [A B].
  econstructor. eauto.
  (* Sswitch *)
  generalize TR; clear TR.
  set (t := compile_switch n l).
  caseEq (validate_switch n l t); intro VALID; intros.
  monadInv TR.
  econstructor; eauto with rtlg.
  eapply transl_expr_charact; eauto with rtlg.
  apply tr_switch_incr with s1; auto with rtlg.
  eapply transl_switch_charact; eauto with rtlg.
  monadInv TR. 
  (* Sreturn *)
  destruct o; destruct rret; inv TR.
  inv OK.
  econstructor; eauto with rtlg.   
  eapply transl_expr_charact; eauto with rtlg.
  constructor. auto. simpl; tauto. 
  constructor.
  (* Slabel *)
  generalize EQ0; clear EQ0. case_eq (ngoto!l); intros; monadInv EQ0.
  generalize EQ1; clear EQ1. unfold handle_error. 
  case_eq (update_instr n (Inop ns) s0); intros; inv EQ1.
  econstructor. eauto. eauto with rtlg.
  eapply tr_stmt_incr with s0; eauto with rtlg.
  (* Sgoto *)
  generalize TR; clear TR. case_eq (ngoto!l); intros; monadInv TR.
  econstructor. auto.
Qed.

Lemma transl_function_charact:
  forall f tf,
  transl_function f = Errors.OK tf ->
  tr_function f tf.
Proof.
  intros until tf. unfold transl_function.
  caseEq (reserve_labels (fn_body f) (PTree.empty node, init_state)). 
  intros ngoto s0 RESERVE.
  caseEq (transl_fun f ngoto s0). congruence. 
  intros [nentry rparams] sfinal INCR TR E. inv E. 
  monadInv TR.
  exploit add_vars_valid. eexact EQ. apply init_mapping_valid.
  intros [A B]. 
  exploit add_vars_valid. eexact EQ1. auto. 
  intros [C D].
  eapply tr_function_intro; eauto with rtlg.
  eapply transl_stmt_charact; eauto with rtlg. 
  unfold ret_reg. destruct (sig_res (CminorSel.fn_sig f)).
  constructor. eauto with rtlg. eauto with rtlg.
  constructor.
Qed.