(* * Vericert: Verified high-level synthesis. * Copyright (C) 2019-2021 Yann Herklotz * 2020 James Pollard * * This program is free software: you can redistribute it and/or modify * it under the terms of the GNU General Public License as published by * the Free Software Foundation, either version 3 of the License, or * (at your option) any later version. * * This program is distributed in the hope that it will be useful, * but WITHOUT ANY WARRANTY; without even the implied warranty of * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the * GNU General Public License for more details. * * You should have received a copy of the GNU General Public License * along with this program. If not, see . *) Set Implicit Arguments. Require Export Coq.Bool.Bool. Require Export Coq.Lists.List. Require Export Coq.Strings.String. Require Export Coq.ZArith.ZArith. Require Export Coq.ZArith.Znumtheory. Require Import Coq.micromega.Lia. Require Export compcert.lib.Coqlib. Require Import compcert.lib.Integers. Require Import vericert.common.Show. (* Depend on CompCert for the basic library, as they declare and prove some useful theorems. *) Local Open Scope Z_scope. (* This tactic due to Clement Pit-Claudel with some minor additions by JDP to allow the result to be named: https://pit-claudel.fr/clement/MSc/#org96a1b5f *) Inductive Learnt {A: Type} (a: A) := | AlreadyKnown : Learnt a. Ltac learn_tac fact name := lazymatch goal with | [ H: Learnt fact |- _ ] => fail 0 "fact" fact "has already been learnt" | _ => let type := type of fact in lazymatch goal with | [ H: @Learnt type _ |- _ ] => fail 0 "fact" fact "of type" type "was already learnt through" H | _ => let learnt := fresh "Learn" in pose proof (AlreadyKnown fact) as learnt; pose proof fact as name end end. Tactic Notation "learn" constr(fact) := let name := fresh "H" in learn_tac fact name. Tactic Notation "learn" constr(fact) "as" simple_intropattern(name) := learn_tac fact name. Ltac unfold_rec c := unfold c; fold c. Ltac solve_by_inverts n := match goal with | H : ?T |- _ => match type of T with Prop => inversion H; match n with S (S (?n')) => subst; try constructor; solve_by_inverts (S n') end end end. Ltac solve_by_invert := solve_by_inverts 1. Ltac invert x := inversion x; subst; clear x. Ltac destruct_match := match goal with | [ |- context[match ?x with | _ => _ end ] ] => destruct x eqn:? | [ H: context[match ?x with | _ => _ end] |- _ ] => destruct x eqn:? end. Ltac auto_destruct x := destruct x eqn:?; simpl in *; try discriminate; try congruence. Ltac nicify_hypotheses := repeat match goal with | [ H : ex _ |- _ ] => invert H | [ H : Some _ = Some _ |- _ ] => invert H | [ H : ?x = ?x |- _ ] => clear H | [ H : _ /\ _ |- _ ] => invert H end. Ltac nicify_goals := repeat match goal with | [ |- _ /\ _ ] => split | [ |- Some _ = Some _ ] => f_equal | [ |- S _ = S _ ] => f_equal end. Ltac kill_bools := repeat match goal with | [ H : _ && _ = true |- _ ] => apply andb_prop in H | [ H : _ || _ = false |- _ ] => apply orb_false_elim in H | [ H : _ <=? _ = true |- _ ] => apply Z.leb_le in H | [ H : _ <=? _ = false |- _ ] => apply Z.leb_gt in H | [ H : _ apply Z.ltb_lt in H | [ H : _ apply Z.ltb_ge in H | [ H : _ >=? _ = _ |- _ ] => rewrite Z.geb_leb in H | [ H : _ >? _ = _ |- _ ] => rewrite Z.gtb_ltb in H | [ H : _ =? _ = true |- _ ] => apply Z.eqb_eq in H | [ H : _ =? _ = false |- _ ] => apply Z.eqb_neq in H end. Ltac unfold_constants := repeat match goal with | [ |- context[Integers.Ptrofs.modulus] ] => replace Integers.Ptrofs.modulus with 4294967296 by reflexivity | [ H : context[Integers.Ptrofs.modulus] |- _ ] => replace Integers.Ptrofs.modulus with 4294967296 in H by reflexivity | [ |- context[Integers.Ptrofs.min_signed] ] => replace Integers.Ptrofs.min_signed with (-2147483648) by reflexivity | [ H : context[Integers.Ptrofs.min_signed] |- _ ] => replace Integers.Ptrofs.min_signed with (-2147483648) in H by reflexivity | [ |- context[Integers.Ptrofs.max_signed] ] => replace Integers.Ptrofs.max_signed with 2147483647 by reflexivity | [ H : context[Integers.Ptrofs.max_signed] |- _ ] => replace Integers.Ptrofs.max_signed with 2147483647 in H by reflexivity | [ |- context[Integers.Ptrofs.max_unsigned] ] => replace Integers.Ptrofs.max_unsigned with 4294967295 by reflexivity | [ H : context[Integers.Ptrofs.max_unsigned] |- _ ] => replace Integers.Ptrofs.max_unsigned with 4294967295 in H by reflexivity | [ |- context[Integers.Int.modulus] ] => replace Integers.Int.modulus with 4294967296 by reflexivity | [ H : context[Integers.Int.modulus] |- _ ] => replace Integers.Int.modulus with 4294967296 in H by reflexivity | [ |- context[Integers.Int.min_signed] ] => replace Integers.Int.min_signed with (-2147483648) by reflexivity | [ H : context[Integers.Int.min_signed] |- _ ] => replace Integers.Int.min_signed with (-2147483648) in H by reflexivity | [ |- context[Integers.Int.max_signed] ] => replace Integers.Int.max_signed with 2147483647 by reflexivity | [ H : context[Integers.Int.max_signed] |- _ ] => replace Integers.Int.max_signed with 2147483647 in H by reflexivity | [ |- context[Integers.Int.max_unsigned] ] => replace Integers.Int.max_unsigned with 4294967295 by reflexivity | [ H : context[Integers.Int.max_unsigned] |- _ ] => replace Integers.Int.max_unsigned with 4294967295 in H by reflexivity | [ |- context[Integers.Ptrofs.unsigned (Integers.Ptrofs.repr ?x) ] ] => match (eval compute in (0 <=? x)) with | true => replace (Integers.Ptrofs.unsigned (Integers.Ptrofs.repr x)) with x by reflexivity | false => idtac end end. Ltac substpp := repeat match goal with | [ H1 : ?x = Some _, H2 : ?x = Some _ |- _ ] => let EQ := fresh "EQ" in learn H1 as EQ; rewrite H2 in EQ; invert EQ | _ => idtac end. Ltac simplify := intros; unfold_constants; simpl in *; repeat (nicify_hypotheses; nicify_goals; kill_bools; substpp); simpl in *. Infix "==nat" := eq_nat_dec (no associativity, at level 50). Infix "==Z" := Z.eq_dec (no associativity, at level 50). Ltac liapp := repeat match goal with | [ |- (?x | ?y) ] => match (eval compute in (Z.rem y x ==Z 0)) with | left _ => let q := (eval compute in (Z.div y x)) in exists q; reflexivity | _ => idtac end | _ => idtac end. Ltac crush := simplify; try discriminate; try congruence; try lia; liapp; try assumption; try (solve [auto]). Global Opaque Nat.div. Global Opaque Z.mul. (* Definition const (A B : Type) (a : A) (b : B) : A := a. Definition compose (A B C : Type) (f : B -> C) (g : A -> B) (x : A) : C := f (g x). *) Module Option. Definition default {T : Type} (x : T) (u : option T) : T := match u with | Some y => y | _ => x end. Definition map {S : Type} {T : Type} (f : S -> T) (u : option S) : option T := match u with | Some y => Some (f y) | _ => None end. Definition liftA2 {T : Type} (f : T -> T -> T) (a : option T) (b : option T) : option T := match a with | Some x => map (f x) b | _ => None end. Definition bind {A B : Type} (f : option A) (g : A -> option B) : option B := match f with | Some a => g a | _ => None end. Definition join {A : Type} (a : option (option A)) : option A := match a with | None => None | Some a' => a' end. Module Notation. Notation "'do' X <- A ; B" := (bind A (fun X => B)) (at level 200, X ident, A at level 100, B at level 200). End Notation. End Option. Parameter debug_print : string -> unit. Definition debug_show {A B : Type} `{Show A} (a : A) (b : B) : B := let unused := debug_print (show a) in b. Definition debug_show_msg {A B : Type} `{Show A} (s : string) (a : A) (b : B) : B := let unused := debug_print (s ++ show a) in b.