view paper/src/agda-hoare-rule.agda @ 19:046b2b20d6c7 default tip

fix
author ryokka
date Mon, 09 Mar 2020 11:25:49 +0900
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data HTProof : Cond -> Comm -> Cond -> Set where
  PrimRule : {bPre : Cond} -> {pcm : PrimComm} -> {bPost : Cond} ->
             (pr : Axiom bPre pcm bPost) ->
             HTProof bPre (PComm pcm) bPost
  SkipRule : (b : Cond) -> HTProof b Skip b
  AbortRule : (bPre : Cond) -> (bPost : Cond) ->
              HTProof bPre Abort bPost
  WeakeningRule : {bPre : Cond} -> {bPre' : Cond} -> {cm : Comm} ->
                {bPost' : Cond} -> {bPost : Cond} ->
                Tautology bPre bPre' ->
                HTProof bPre' cm bPost' ->
                Tautology bPost' bPost ->
                HTProof bPre cm bPost
  SeqRule : {bPre : Cond} -> {cm1 : Comm} -> {bMid : Cond} ->
            {cm2 : Comm} -> {bPost : Cond} ->
            HTProof bPre cm1 bMid ->
            HTProof bMid cm2 bPost ->
            HTProof bPre (Seq cm1 cm2) bPost
  IfRule : {cmThen : Comm} -> {cmElse : Comm} ->
           {bPre : Cond} -> {bPost : Cond} ->
           {b : Cond} ->
           HTProof (bPre /\ b) cmThen bPost ->
           HTProof (bPre /\ neg b) cmElse bPost ->
           HTProof bPre (If b cmThen cmElse) bPost
  WhileRule : {cm : Comm} -> {bInv : Cond} -> {b : Cond} ->
              HTProof (bInv /\ b) cm bInv ->
              HTProof bInv (While b cm) (bInv /\ neg b)