ConcurrentSeparationLogic: 3-stage producer-consumer

2024-09-20 04:07:13 +00:00 · 2016-04-28 10:20:16 -04:00 · 2016-04-28 10:20:16 -04:00 · 320eb45126
commit 320eb45126
parent 6e80356fed
1 changed files with 120 additions and 0 deletions
--- a/ConcurrentSeparationLogic.v
+++ b/ConcurrentSeparationLogic.v
@ -627,6 +627,126 @@ Proof.
 Qed.
 (** ** A length-3 producer-consumer chain *)
 Example stage1 :=
  _ <- for i := 0 loop
    cell <- Alloc 2;
    _ <- Write cell i;
    _ <- Lock 0;
    head <- Read 0;
    _ <- Write (cell+1) head;
    _ <- Write 0 cell;
    _ <- Unlock 0;
    Return (Again (2 + i))
  done;
  Return tt.
 Example stage2 :=
  for i := tt loop
    _ <- Lock 0;
    head <- Read 0;
    if head ==n 0 then
      _ <- Unlock 0;
      Return (Again tt)
    else
      tail <- Read (head+1);
      _ <- Write 0 tail;
      _ <- Unlock 0;
      _ <- Lock 1;
      head' <- Read 1;
      _ <- Write (head+1) head';
      _ <- Write 1 head;
      _ <- Unlock 1;
      Return (Again tt)
  done.
 Example stage3 :=
  for i := tt loop
    _ <- Lock 1;
    head <- Read 1;
    if head ==n 0 then
      _ <- Unlock 1;
      Return (Again tt)
    else
      tail <- Read (head+1);
      _ <- Write 1 tail;
      _ <- Unlock 1;
      data <- Read head;
      _ <- Free head 2;
      if isEven data then
        Return (Again tt)
      else
        Fail
  done.
 Definition stages_inv root :=
  (exists ls p, root |-> p * linkedList p ls * [| forallb isEven ls = true |])%sep.
 Theorem stages_ok :
  [stages_inv 0; stages_inv 1] ||- {{emp}} stage1 || stage2 || stage3 {{_ ~> emp}}.
 Proof.
  unfold stages_inv, stage1, stage2, stage3.
  fork (emp%sep) (emp%sep); ht.
  fork (emp%sep) (emp%sep); ht.
  loop_inv (fun o => [| isEven (valueOf o) = true |]%sep).
  erewrite (linkedList_nonnull _ H0).
  cancel.
  simp.
  rewrite H1, H4.
  simp.
  simp.
  cancel.
  cancel.
  cancel.
  loop_inv (fun _ : loop_outcome unit => emp%sep).
  simp.
  cases (r0 ==n 0).
  ht.
  cancel.
  setoid_rewrite (linkedList_nonnull _ n).
  ht.
  apply andb_true_iff in H.
  simp.
  erewrite (linkedList_nonnull _ H1).
  cancel.
  simp.
  apply andb_true_iff in H0.
  apply andb_true_iff.
  simp.
  cancel.
  cancel.
  cancel.
  loop_inv (fun _ : loop_outcome unit => emp%sep).
  simp.
  cases (r0 ==n 0).
  ht.
  cancel.
  setoid_rewrite (linkedList_nonnull _ n).
  ht.
  apply andb_true_iff in H.
  simp.
  simp.
  cases (isEven r4); ht.
  cancel.
  cancel.
  simp.
  rewrite Heq in H2.
  simp.
  equality.
  cancel.
  cancel.
  cancel.
  cancel.
 Qed.
 (** * Soundness proof *)
 Hint Resolve himp_refl.