(* *********************************************************************) (* *) (* 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. *) (* *) (* *********************************************************************) (** Correctness of instruction selection for operators *) Require Import Coqlib. Require Import Maps. Require Import AST. Require Import Integers. Require Import Floats. Require Import Values. Require Import Memory. Require Import Events. Require Import Globalenvs. Require Import Smallstep. Require Import Cminor. Require Import Op. Require Import CminorSel. Require Import SelectOp. Open Local Scope cminorsel_scope. Section CMCONSTR. Variable ge: genv. Variable sp: val. Variable e: env. Variable m: mem. (** * Useful lemmas and tactics *) (** The following are trivial lemmas and custom tactics that help perform backward (inversion) and forward reasoning over the evaluation of operator applications. *) Ltac EvalOp := eapply eval_Eop; eauto with evalexpr. Ltac TrivialOp cstr := unfold cstr; intros; EvalOp. Ltac InvEval1 := match goal with | [ H: (eval_expr _ _ _ _ _ (Eop _ Enil) _) |- _ ] => inv H; InvEval1 | [ H: (eval_expr _ _ _ _ _ (Eop _ (_ ::: Enil)) _) |- _ ] => inv H; InvEval1 | [ H: (eval_expr _ _ _ _ _ (Eop _ (_ ::: _ ::: Enil)) _) |- _ ] => inv H; InvEval1 | [ H: (eval_exprlist _ _ _ _ _ Enil _) |- _ ] => inv H; InvEval1 | [ H: (eval_exprlist _ _ _ _ _ (_ ::: _) _) |- _ ] => inv H; InvEval1 | _ => idtac end. Ltac InvEval2 := match goal with | [ H: (eval_operation _ _ _ nil = Some _) |- _ ] => simpl in H; inv H | [ H: (eval_operation _ _ _ (_ :: nil) = Some _) |- _ ] => simpl in H; FuncInv | [ H: (eval_operation _ _ _ (_ :: _ :: nil) = Some _) |- _ ] => simpl in H; FuncInv | [ H: (eval_operation _ _ _ (_ :: _ :: _ :: nil) = Some _) |- _ ] => simpl in H; FuncInv | _ => idtac end. Ltac InvEval := InvEval1; InvEval2; InvEval2. (** * Correctness of the smart constructors *) (** We now show that the code generated by "smart constructor" functions such as [SelectOp.notint] behaves as expected. Continuing the [notint] example, we show that if the expression [e] evaluates to some integer value [Vint n], then [SelectOp.notint e] evaluates to a value [Vint (Int.not n)] which is indeed the integer negation of the value of [e]. All proofs follow a common pattern: - Reasoning by case over the result of the classification functions (such as [add_match] for integer addition), gathering additional information on the shape of the argument expressions in the non-default cases. - Inversion of the evaluations of the arguments, exploiting the additional information thus gathered. - Equational reasoning over the arithmetic operations performed, using the lemmas from the [Int] and [Float] modules. - Construction of an evaluation derivation for the expression returned by the smart constructor. *) Theorem eval_addrsymbol: forall le id ofs b, Genv.find_symbol ge id = Some b -> eval_expr ge sp e m le (addrsymbol id ofs) (Vptr b ofs). Proof. intros. unfold addrsymbol. econstructor. constructor. simpl. rewrite H. auto. Qed. Theorem eval_addrstack: forall le ofs b n, sp = Vptr b n -> eval_expr ge sp e m le (addrstack ofs) (Vptr b (Int.add n ofs)). Proof. intros. unfold addrstack. econstructor. constructor. simpl. unfold offset_sp. rewrite H. auto. Qed. Lemma eval_notbool_base: forall le a v b, eval_expr ge sp e m le a v -> Val.bool_of_val v b -> eval_expr ge sp e m le (notbool_base a) (Val.of_bool (negb b)). Proof. TrivialOp notbool_base. simpl. inv H0. rewrite Int.eq_false; auto. rewrite Int.eq_true; auto. reflexivity. Qed. Hint Resolve Val.bool_of_true_val Val.bool_of_false_val Val.bool_of_true_val_inv Val.bool_of_false_val_inv: valboolof. Theorem eval_notbool: forall le a v b, eval_expr ge sp e m le a v -> Val.bool_of_val v b -> eval_expr ge sp e m le (notbool a) (Val.of_bool (negb b)). Proof. induction a; simpl; intros; try (eapply eval_notbool_base; eauto). destruct o; try (eapply eval_notbool_base; eauto). destruct e0. InvEval. inv H0. rewrite Int.eq_false; auto. simpl; eauto with evalexpr. rewrite Int.eq_true; simpl; eauto with evalexpr. eapply eval_notbool_base; eauto. inv H. eapply eval_Eop; eauto. simpl. assert (eval_condition c vl = Some b). generalize H6. simpl. case (eval_condition c vl); intros. destruct b0; inv H1; inversion H0; auto; congruence. congruence. rewrite (Op.eval_negate_condition _ _ H). destruct b; reflexivity. inv H. eapply eval_Econdition; eauto. destruct v1; eauto. Qed. Lemma eval_offset_addressing: forall addr n args v, eval_addressing ge sp addr args = Some v -> eval_addressing ge sp (offset_addressing addr n) args = Some (Val.add v (Vint n)). Proof. intros. destruct addr; simpl in *; FuncInv; subst; simpl. rewrite Int.add_assoc. auto. rewrite Int.add_assoc. auto. rewrite <- Int.add_assoc. auto. rewrite <- Int.add_assoc. auto. rewrite <- Int.add_assoc. auto. rewrite <- Int.add_assoc. auto. rewrite <- Int.add_assoc. decEq. decEq. repeat rewrite Int.add_assoc. auto. decEq. decEq. repeat rewrite Int.add_assoc. auto. destruct (Genv.find_symbol ge i); inv H. auto. destruct (Genv.find_symbol ge i); inv H. simpl. repeat rewrite Int.add_assoc. decEq. decEq. decEq. apply Int.add_commut. destruct (Genv.find_symbol ge i0); inv H. simpl. repeat rewrite Int.add_assoc. decEq. decEq. decEq. apply Int.add_commut. unfold offset_sp in *. destruct sp; inv H. simpl. rewrite Int.add_assoc. auto. Qed. Theorem eval_addimm: forall le n a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (addimm n a) (Vint (Int.add x n)). Proof. unfold addimm; intros until x. generalize (Int.eq_spec n Int.zero). case (Int.eq n Int.zero); intro. subst n. rewrite Int.add_zero. auto. case (addimm_match a); intros; InvEval. EvalOp. simpl. rewrite Int.add_commut. auto. inv H0. EvalOp. simpl. rewrite (eval_offset_addressing _ _ _ _ H6). auto. EvalOp. Qed. Theorem eval_addimm_ptr: forall le n a b ofs, eval_expr ge sp e m le a (Vptr b ofs) -> eval_expr ge sp e m le (addimm n a) (Vptr b (Int.add ofs n)). Proof. unfold addimm; intros until ofs. generalize (Int.eq_spec n Int.zero). case (Int.eq n Int.zero); intro. subst n. rewrite Int.add_zero. auto. case (addimm_match a); intros; InvEval. inv H0. EvalOp. simpl. rewrite (eval_offset_addressing _ _ _ _ H6). auto. EvalOp. Qed. Theorem eval_add: forall le a b x y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (add a b) (Vint (Int.add x y)). Proof. intros until y. unfold add; case (add_match a b); intros; InvEval. rewrite Int.add_commut. apply eval_addimm. auto. apply eval_addimm. auto. subst. EvalOp. simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_permut. subst. EvalOp. simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_permut. subst. EvalOp. simpl. decEq. decEq. rewrite Int.add_permut. rewrite Int.add_assoc. decEq. apply Int.add_permut. destruct (Genv.find_symbol ge id); inv H0. destruct (Genv.find_symbol ge id); inv H0. destruct (Genv.find_symbol ge id); inv H0. destruct (Genv.find_symbol ge id); inv H0. subst. EvalOp. simpl. rewrite Int.add_commut. auto. subst. EvalOp. subst. EvalOp. simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_commut. subst. EvalOp. simpl. decEq. decEq. apply Int.add_assoc. EvalOp. simpl. rewrite Int.add_zero. auto. Qed. Theorem eval_add_ptr: forall le a b p x y, eval_expr ge sp e m le a (Vptr p x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (add a b) (Vptr p (Int.add x y)). Proof. intros until y. unfold add; case (add_match a b); intros; InvEval. apply eval_addimm_ptr; auto. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_permut. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_permut. destruct (Genv.find_symbol ge id); inv H0. subst. EvalOp; simpl. destruct (Genv.find_symbol ge id); inv H0. decEq. decEq. rewrite Int.add_assoc. decEq. apply Int.add_commut. subst. EvalOp; simpl. destruct (Genv.find_symbol ge id); inv H0. decEq. decEq. rewrite Int.add_assoc. decEq. apply Int.add_commut. subst. EvalOp. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_commut. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. auto. EvalOp; simpl. rewrite Int.add_zero. auto. Qed. Theorem eval_add_ptr_2: forall le a b x p y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vptr p y) -> eval_expr ge sp e m le (add a b) (Vptr p (Int.add y x)). Proof. intros until y. unfold add; case (add_match a b); intros; InvEval. apply eval_addimm_ptr; auto. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. rewrite (Int.add_commut n1 n2). apply Int.add_permut. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. rewrite (Int.add_commut n1 n2). apply Int.add_permut. subst. EvalOp; simpl. destruct (Genv.find_symbol ge id); inv H0. decEq. decEq. rewrite Int.add_assoc. decEq. apply Int.add_commut. destruct (Genv.find_symbol ge id); inv H0. subst. EvalOp; simpl. destruct (Genv.find_symbol ge id); inv H0. decEq. decEq. rewrite Int.add_assoc. decEq. apply Int.add_commut. subst. EvalOp. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. auto. subst. EvalOp; simpl. decEq. decEq. repeat rewrite Int.add_assoc. decEq. apply Int.add_commut. EvalOp; simpl. rewrite Int.add_zero. auto. Qed. Theorem eval_sub: forall le a b x y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (sub a b) (Vint (Int.sub x y)). Proof. intros until y. unfold sub; case (sub_match a b); intros; InvEval. rewrite Int.sub_add_opp. apply eval_addimm. assumption. replace (Int.sub x y) with (Int.add (Int.sub i0 i) (Int.sub n1 n2)). apply eval_addimm. EvalOp. subst x; subst y. repeat rewrite Int.sub_add_opp. repeat rewrite Int.add_assoc. decEq. rewrite Int.add_permut. decEq. symmetry. apply Int.neg_add_distr. replace (Int.sub x y) with (Int.add (Int.sub i y) n1). apply eval_addimm. EvalOp. subst x. rewrite Int.sub_add_l. auto. replace (Int.sub x y) with (Int.add (Int.sub x i) (Int.neg n2)). apply eval_addimm. EvalOp. subst y. rewrite (Int.add_commut i n2). symmetry. apply Int.sub_add_r. EvalOp. Qed. Theorem eval_sub_ptr_int: forall le a b p x y, eval_expr ge sp e m le a (Vptr p x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (sub a b) (Vptr p (Int.sub x y)). Proof. intros until y. unfold sub; case (sub_match a b); intros; InvEval. rewrite Int.sub_add_opp. apply eval_addimm_ptr. assumption. subst b0. replace (Int.sub x y) with (Int.add (Int.sub i0 i) (Int.sub n1 n2)). apply eval_addimm_ptr. EvalOp. subst x; subst y. repeat rewrite Int.sub_add_opp. repeat rewrite Int.add_assoc. decEq. rewrite Int.add_permut. decEq. symmetry. apply Int.neg_add_distr. subst b0. replace (Int.sub x y) with (Int.add (Int.sub i y) n1). apply eval_addimm_ptr. EvalOp. subst x. rewrite Int.sub_add_l. auto. replace (Int.sub x y) with (Int.add (Int.sub x i) (Int.neg n2)). apply eval_addimm_ptr. EvalOp. subst y. rewrite (Int.add_commut i n2). symmetry. apply Int.sub_add_r. EvalOp. Qed. Theorem eval_sub_ptr_ptr: forall le a b p x y, eval_expr ge sp e m le a (Vptr p x) -> eval_expr ge sp e m le b (Vptr p y) -> eval_expr ge sp e m le (sub a b) (Vint (Int.sub x y)). Proof. intros until y. unfold sub; case (sub_match a b); intros; InvEval. replace (Int.sub x y) with (Int.add (Int.sub i0 i) (Int.sub n1 n2)). apply eval_addimm. EvalOp. simpl; unfold eq_block. subst b0; subst b1; rewrite zeq_true. auto. subst x; subst y. repeat rewrite Int.sub_add_opp. repeat rewrite Int.add_assoc. decEq. rewrite Int.add_permut. decEq. symmetry. apply Int.neg_add_distr. subst b0. replace (Int.sub x y) with (Int.add (Int.sub i y) n1). apply eval_addimm. EvalOp. simpl. unfold eq_block. rewrite zeq_true. auto. subst x. rewrite Int.sub_add_l. auto. subst b0. replace (Int.sub x y) with (Int.add (Int.sub x i) (Int.neg n2)). apply eval_addimm. EvalOp. simpl. unfold eq_block. rewrite zeq_true. auto. subst y. rewrite (Int.add_commut i n2). symmetry. apply Int.sub_add_r. EvalOp. simpl. unfold eq_block. rewrite zeq_true. auto. Qed. Theorem eval_shlimm: forall le a n x, eval_expr ge sp e m le a (Vint x) -> Int.ltu n Int.iwordsize = true -> eval_expr ge sp e m le (shlimm a n) (Vint (Int.shl x n)). Proof. intros until x; unfold shlimm. generalize (Int.eq_spec n Int.zero); case (Int.eq n Int.zero). intros. subst n. rewrite Int.shl_zero. auto. case (shlimm_match a); intros. InvEval. EvalOp. case_eq (Int.ltu (Int.add n n1) Int.iwordsize); intros. InvEval. revert H8. case_eq (Int.ltu n1 Int.iwordsize); intros; inv H8. EvalOp. simpl. rewrite H2. rewrite Int.shl_shl; auto; rewrite Int.add_commut; auto. EvalOp. simpl. rewrite H1; auto. InvEval. subst. destruct (shift_is_scale n). EvalOp. simpl. decEq. decEq. rewrite (Int.shl_mul (Int.add i n1)); auto. rewrite (Int.shl_mul n1); auto. rewrite Int.mul_add_distr_l. auto. EvalOp. constructor. EvalOp. simpl. eauto. constructor. simpl. rewrite H1. auto. destruct (shift_is_scale n). EvalOp. simpl. decEq. decEq. rewrite Int.add_zero. symmetry. apply Int.shl_mul. EvalOp. simpl. rewrite H1; auto. Qed. Theorem eval_shruimm: forall le a n x, eval_expr ge sp e m le a (Vint x) -> Int.ltu n Int.iwordsize = true -> eval_expr ge sp e m le (shruimm a n) (Vint (Int.shru x n)). Proof. intros until x; unfold shruimm. generalize (Int.eq_spec n Int.zero); case (Int.eq n Int.zero). intros. subst n. rewrite Int.shru_zero. auto. case (shruimm_match a); intros. InvEval. EvalOp. case_eq (Int.ltu (Int.add n n1) Int.iwordsize); intros. InvEval. revert H8. case_eq (Int.ltu n1 Int.iwordsize); intros; inv H8. EvalOp. simpl. rewrite H2. rewrite Int.shru_shru; auto; rewrite Int.add_commut; auto. EvalOp. simpl. rewrite H1; auto. EvalOp. simpl. rewrite H1; auto. Qed. Theorem eval_shrimm: forall le a n x, eval_expr ge sp e m le a (Vint x) -> Int.ltu n Int.iwordsize = true -> eval_expr ge sp e m le (shrimm a n) (Vint (Int.shr x n)). Proof. intros until x; unfold shrimm. generalize (Int.eq_spec n Int.zero); case (Int.eq n Int.zero). intros. subst n. rewrite Int.shr_zero. auto. case (shrimm_match a); intros. InvEval. EvalOp. case_eq (Int.ltu (Int.add n n1) Int.iwordsize); intros. InvEval. revert H8. case_eq (Int.ltu n1 Int.iwordsize); intros; inv H8. EvalOp. simpl. rewrite H2. rewrite Int.shr_shr; auto; rewrite Int.add_commut; auto. EvalOp. simpl. rewrite H1; auto. EvalOp. simpl. rewrite H1; auto. Qed. Lemma eval_mulimm_base: forall le a n x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (mulimm_base n a) (Vint (Int.mul x n)). Proof. intros; unfold mulimm_base. generalize (Int.one_bits_decomp n). generalize (Int.one_bits_range n). destruct (Int.one_bits n). intros. EvalOp. destruct l. intros. rewrite H1. simpl. rewrite Int.add_zero. rewrite <- Int.shl_mul. apply eval_shlimm. auto. auto with coqlib. destruct l. intros. apply eval_Elet with (Vint x). auto. rewrite H1. simpl. rewrite Int.add_zero. rewrite Int.mul_add_distr_r. apply eval_add. rewrite <- Int.shl_mul. apply eval_shlimm. constructor. auto. auto with coqlib. rewrite <- Int.shl_mul. apply eval_shlimm. constructor. auto. auto with coqlib. intros. EvalOp. Qed. Theorem eval_mulimm: forall le a n x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (mulimm n a) (Vint (Int.mul x n)). Proof. intros until x; unfold mulimm. generalize (Int.eq_spec n Int.zero); case (Int.eq n Int.zero); intro. subst n. rewrite Int.mul_zero. intros. EvalOp. generalize (Int.eq_spec n Int.one); case (Int.eq n Int.one); intro. subst n. rewrite Int.mul_one. auto. case (mulimm_match a); intros; InvEval. EvalOp. rewrite Int.mul_commut. reflexivity. subst. rewrite Int.mul_add_distr_l. rewrite (Int.mul_commut n n2). apply eval_addimm. apply eval_mulimm_base. auto. apply eval_mulimm_base. assumption. Qed. Theorem eval_mul: forall le a b x y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (mul a b) (Vint (Int.mul x y)). Proof. intros until y. unfold mul; case (mul_match a b); intros; InvEval. rewrite Int.mul_commut. apply eval_mulimm. auto. apply eval_mulimm. auto. EvalOp. Qed. Lemma eval_orimm: forall le n a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (orimm n a) (Vint (Int.or x n)). Proof. intros. unfold orimm. predSpec Int.eq Int.eq_spec n Int.zero. subst n. rewrite Int.or_zero. auto. predSpec Int.eq Int.eq_spec n Int.mone. subst n. rewrite Int.or_mone. EvalOp. EvalOp. Qed. Remark eval_same_expr: forall a1 a2 le v1 v2, same_expr_pure a1 a2 = true -> eval_expr ge sp e m le a1 v1 -> eval_expr ge sp e m le a2 v2 -> a1 = a2 /\ v1 = v2. Proof. intros until v2. destruct a1; simpl; try (intros; discriminate). destruct a2; simpl; try (intros; discriminate). case (ident_eq i i0); intros. subst i0. inversion H0. inversion H1. split. auto. congruence. discriminate. Qed. Theorem eval_or: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (or a b) (Vint (Int.or x y)). Proof. intros until y; unfold or; case (or_match a b); intros; InvEval. rewrite Int.or_commut. apply eval_orimm; auto. apply eval_orimm; auto. revert H7; case_eq (Int.ltu n1 Int.iwordsize); intros; inv H7. revert H6; case_eq (Int.ltu n2 Int.iwordsize); intros; inv H6. caseEq (Int.eq (Int.add n1 n2) Int.iwordsize && same_expr_pure t1 t2); intro. destruct (andb_prop _ _ H1). generalize (Int.eq_spec (Int.add n1 n2) Int.iwordsize); rewrite H4; intros. exploit eval_same_expr; eauto. intros [EQ1 EQ2]. inv EQ1. inv EQ2. EvalOp. simpl. rewrite H0. rewrite <- Int.or_ror; auto. EvalOp. econstructor. EvalOp. simpl. rewrite H; eauto. econstructor. EvalOp. simpl. rewrite H0; eauto. constructor. simpl. auto. revert H7; case_eq (Int.ltu n2 Int.iwordsize); intros; inv H7. revert H6; case_eq (Int.ltu n1 Int.iwordsize); intros; inv H6. caseEq (Int.eq (Int.add n1 n2) Int.iwordsize && same_expr_pure t1 t2); intro. destruct (andb_prop _ _ H1). generalize (Int.eq_spec (Int.add n1 n2) Int.iwordsize); rewrite H4; intros. exploit eval_same_expr; eauto. intros [EQ1 EQ2]. inv EQ1. inv EQ2. EvalOp. simpl. rewrite H. rewrite Int.or_commut. rewrite <- Int.or_ror; auto. EvalOp. econstructor. EvalOp. simpl. rewrite H; eauto. econstructor. EvalOp. simpl. rewrite H0; eauto. constructor. simpl. auto. EvalOp. Qed. Lemma eval_andimm: forall le n a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (andimm n a) (Vint (Int.and x n)). Proof. intros. unfold andimm. predSpec Int.eq Int.eq_spec n Int.zero. subst n. rewrite Int.and_zero. EvalOp. predSpec Int.eq Int.eq_spec n Int.mone. subst n. rewrite Int.and_mone. auto. EvalOp. Qed. Theorem eval_and: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (and a b) (Vint (Int.and x y)). Proof. intros until y; unfold and. case (mul_match a b); intros. InvEval. rewrite Int.and_commut. apply eval_andimm; auto. InvEval. apply eval_andimm; auto. EvalOp. Qed. Lemma eval_xorimm: forall le n a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (xorimm n a) (Vint (Int.xor x n)). Proof. intros. unfold xorimm. predSpec Int.eq Int.eq_spec n Int.zero. subst n. rewrite Int.xor_zero. auto. EvalOp. Qed. Theorem eval_xor: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (xor a b) (Vint (Int.xor x y)). Proof. intros until y; unfold xor. case (mul_match a b); intros. InvEval. rewrite Int.xor_commut. apply eval_xorimm; auto. InvEval. apply eval_xorimm; auto. EvalOp. Qed. Theorem eval_divu: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> y <> Int.zero -> eval_expr ge sp e m le (divu a b) (Vint (Int.divu x y)). Proof. intros; unfold divu; EvalOp. simpl. rewrite Int.eq_false; auto. Qed. Theorem eval_modu: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> y <> Int.zero -> eval_expr ge sp e m le (modu a b) (Vint (Int.modu x y)). Proof. intros; unfold modu; EvalOp. simpl. rewrite Int.eq_false; auto. Qed. Theorem eval_divs: forall le a b x y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> y <> Int.zero -> eval_expr ge sp e m le (divs a b) (Vint (Int.divs x y)). Proof. TrivialOp divs. simpl. predSpec Int.eq Int.eq_spec y Int.zero. contradiction. auto. Qed. Theorem eval_mods: forall le a b x y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> y <> Int.zero -> eval_expr ge sp e m le (mods a b) (Vint (Int.mods x y)). Proof. TrivialOp mods. simpl. predSpec Int.eq Int.eq_spec y Int.zero. contradiction. auto. Qed. Theorem eval_shl: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> Int.ltu y Int.iwordsize = true -> eval_expr ge sp e m le (shl a b) (Vint (Int.shl x y)). Proof. intros until y; unfold shl; case (shift_match b); intros. InvEval. apply eval_shlimm; auto. EvalOp. simpl. rewrite H1. auto. Qed. Theorem eval_shru: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> Int.ltu y Int.iwordsize = true -> eval_expr ge sp e m le (shru a b) (Vint (Int.shru x y)). Proof. intros until y; unfold shru; case (shift_match b); intros. InvEval. apply eval_shruimm; auto. EvalOp. simpl. rewrite H1. auto. Qed. Theorem eval_shr: forall le a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> Int.ltu y Int.iwordsize = true -> eval_expr ge sp e m le (shr a b) (Vint (Int.shr x y)). Proof. intros until y; unfold shr; case (shift_match b); intros. InvEval. apply eval_shrimm; auto. EvalOp. simpl. rewrite H1. auto. Qed. Theorem eval_comp_int: forall le c a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (comp c a b) (Val.of_bool(Int.cmp c x y)). Proof. intros until y. unfold comp; case (comp_match a b); intros; InvEval. EvalOp. simpl. rewrite Int.swap_cmp. destruct (Int.cmp c x y); reflexivity. EvalOp. simpl. destruct (Int.cmp c x y); reflexivity. EvalOp. simpl. destruct (Int.cmp c x y); reflexivity. Qed. Remark eval_compare_null_transf: forall c x v, Cminor.eval_compare_null c x = Some v -> match eval_compare_null c x with | Some true => Some Vtrue | Some false => Some Vfalse | None => None (A:=val) end = Some v. Proof. unfold Cminor.eval_compare_null, eval_compare_null; intros. destruct (Int.eq x Int.zero); try discriminate. destruct c; try discriminate; auto. Qed. Theorem eval_comp_ptr_int: forall le c a x1 x2 b y v, eval_expr ge sp e m le a (Vptr x1 x2) -> eval_expr ge sp e m le b (Vint y) -> Cminor.eval_compare_null c y = Some v -> eval_expr ge sp e m le (comp c a b) v. Proof. intros until v. unfold comp; case (comp_match a b); intros; InvEval. EvalOp. simpl. apply eval_compare_null_transf; auto. EvalOp. simpl. apply eval_compare_null_transf; auto. Qed. Remark eval_compare_null_swap: forall c x, Cminor.eval_compare_null (swap_comparison c) x = Cminor.eval_compare_null c x. Proof. intros. unfold Cminor.eval_compare_null. destruct (Int.eq x Int.zero). destruct c; auto. auto. Qed. Theorem eval_comp_int_ptr: forall le c a x b y1 y2 v, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vptr y1 y2) -> Cminor.eval_compare_null c x = Some v -> eval_expr ge sp e m le (comp c a b) v. Proof. intros until v. unfold comp; case (comp_match a b); intros; InvEval. EvalOp. simpl. apply eval_compare_null_transf. rewrite eval_compare_null_swap; auto. EvalOp. simpl. apply eval_compare_null_transf. auto. Qed. Theorem eval_comp_ptr_ptr: forall le c a x1 x2 b y1 y2, eval_expr ge sp e m le a (Vptr x1 x2) -> eval_expr ge sp e m le b (Vptr y1 y2) -> x1 = y1 -> eval_expr ge sp e m le (comp c a b) (Val.of_bool(Int.cmp c x2 y2)). Proof. intros until y2. unfold comp; case (comp_match a b); intros; InvEval. EvalOp. simpl. subst y1. rewrite dec_eq_true. destruct (Int.cmp c x2 y2); reflexivity. Qed. Theorem eval_comp_ptr_ptr_2: forall le c a x1 x2 b y1 y2 v, eval_expr ge sp e m le a (Vptr x1 x2) -> eval_expr ge sp e m le b (Vptr y1 y2) -> x1 <> y1 -> Cminor.eval_compare_mismatch c = Some v -> eval_expr ge sp e m le (comp c a b) v. Proof. intros until y2. unfold comp; case (comp_match a b); intros; InvEval. EvalOp. simpl. rewrite dec_eq_false; auto. destruct c; simpl in H2; inv H2; auto. Qed. Theorem eval_compu: forall le c a x b y, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le b (Vint y) -> eval_expr ge sp e m le (compu c a b) (Val.of_bool(Int.cmpu c x y)). Proof. intros until y. unfold compu; case (comp_match a b); intros; InvEval. EvalOp. simpl. rewrite Int.swap_cmpu. destruct (Int.cmpu c x y); reflexivity. EvalOp. simpl. destruct (Int.cmpu c x y); reflexivity. EvalOp. simpl. destruct (Int.cmpu c x y); reflexivity. Qed. Theorem eval_compf: forall le c a x b y, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le b (Vfloat y) -> eval_expr ge sp e m le (compf c a b) (Val.of_bool(Float.cmp c x y)). Proof. intros. unfold compf. EvalOp. simpl. destruct (Float.cmp c x y); reflexivity. Qed. Theorem eval_cast8signed: forall le a v, eval_expr ge sp e m le a v -> eval_expr ge sp e m le (cast8signed a) (Val.sign_ext 8 v). Proof. intros; unfold cast8signed; EvalOp. Qed. Theorem eval_cast8unsigned: forall le a v, eval_expr ge sp e m le a v -> eval_expr ge sp e m le (cast8unsigned a) (Val.zero_ext 8 v). Proof. intros; unfold cast8unsigned; EvalOp. Qed. Theorem eval_cast16signed: forall le a v, eval_expr ge sp e m le a v -> eval_expr ge sp e m le (cast16signed a) (Val.sign_ext 16 v). Proof. intros; unfold cast16signed; EvalOp. Qed. Theorem eval_cast16unsigned: forall le a v, eval_expr ge sp e m le a v -> eval_expr ge sp e m le (cast16unsigned a) (Val.zero_ext 16 v). Proof. intros; unfold cast16unsigned; EvalOp. Qed. Theorem eval_singleoffloat: forall le a v, eval_expr ge sp e m le a v -> eval_expr ge sp e m le (singleoffloat a) (Val.singleoffloat v). Proof. intros; unfold singleoffloat; EvalOp. Qed. Theorem eval_notint: forall le a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (notint a) (Vint (Int.xor x Int.mone)). Proof. intros; unfold notint; EvalOp. Qed. Theorem eval_negint: forall le a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (negint a) (Vint (Int.neg x)). Proof. intros; unfold negint; EvalOp. Qed. Theorem eval_negf: forall le a x, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le (negf a) (Vfloat (Float.neg x)). Proof. intros; unfold negf; EvalOp. Qed. Theorem eval_absf: forall le a x, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le (absf a) (Vfloat (Float.abs x)). Proof. intros; unfold absf; EvalOp. Qed. Theorem eval_intoffloat: forall le a x, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le (intoffloat a) (Vint (Float.intoffloat x)). Proof. intros; unfold intoffloat; EvalOp. Qed. Theorem eval_floatofint: forall le a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (floatofint a) (Vfloat (Float.floatofint x)). Proof. intros; unfold floatofint; EvalOp. Qed. Theorem eval_addf: forall le a x b y, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le b (Vfloat y) -> eval_expr ge sp e m le (addf a b) (Vfloat (Float.add x y)). Proof. intros; unfold addf; EvalOp. Qed. Theorem eval_subf: forall le a x b y, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le b (Vfloat y) -> eval_expr ge sp e m le (subf a b) (Vfloat (Float.sub x y)). Proof. intros; unfold subf; EvalOp. Qed. Theorem eval_mulf: forall le a x b y, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le b (Vfloat y) -> eval_expr ge sp e m le (mulf a b) (Vfloat (Float.mul x y)). Proof. intros; unfold mulf; EvalOp. Qed. Theorem eval_divf: forall le a x b y, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le b (Vfloat y) -> eval_expr ge sp e m le (divf a b) (Vfloat (Float.div x y)). Proof. intros; unfold divf; EvalOp. Qed. Theorem eval_intuoffloat: forall le a x, eval_expr ge sp e m le a (Vfloat x) -> eval_expr ge sp e m le (intuoffloat a) (Vint (Float.intuoffloat x)). Proof. intros. unfold intuoffloat. econstructor. eauto. set (im := Int.repr Int.half_modulus). set (fm := Float.floatofintu im). assert (eval_expr ge sp e m (Vfloat x :: le) (Eletvar O) (Vfloat x)). constructor. auto. apply eval_Econdition with (v1 := Float.cmp Clt x fm). econstructor. constructor. eauto. constructor. EvalOp. simpl; eauto. constructor. simpl. auto. caseEq (Float.cmp Clt x fm); intros. rewrite Float.intuoffloat_intoffloat_1; auto. EvalOp. rewrite Float.intuoffloat_intoffloat_2; auto. fold im. apply eval_addimm. apply eval_intoffloat. apply eval_subf; auto. EvalOp. Qed. Theorem eval_floatofintu: forall le a x, eval_expr ge sp e m le a (Vint x) -> eval_expr ge sp e m le (floatofintu a) (Vfloat (Float.floatofintu x)). Proof. intros. unfold floatofintu. econstructor. eauto. set (fm := Float.floatofintu Float.ox8000_0000). assert (eval_expr ge sp e m (Vint x :: le) (Eletvar O) (Vint x)). constructor. auto. apply eval_Econdition with (v1 := Int.ltu x Float.ox8000_0000). econstructor. constructor. eauto. constructor. simpl. auto. caseEq (Int.ltu x Float.ox8000_0000); intros. rewrite Float.floatofintu_floatofint_1; auto. apply eval_floatofint; auto. rewrite Float.floatofintu_floatofint_2; auto. fold fm. apply eval_addf. apply eval_floatofint. rewrite Int.sub_add_opp. apply eval_addimm; auto. EvalOp. Qed. Theorem eval_addressing: forall le chunk a v b ofs, eval_expr ge sp e m le a v -> v = Vptr b ofs -> match addressing chunk a with (mode, args) => exists vl, eval_exprlist ge sp e m le args vl /\ eval_addressing ge sp mode vl = Some v end. Proof. intros until v. unfold addressing; case (addressing_match a); intros; InvEval. inv H. exists vl; auto. exists (v :: nil); split. constructor; auto. constructor. subst; simpl. rewrite Int.add_zero; auto. Qed. End CMCONSTR.