EvaluationContexts: products and sums

2024-11-28 07:16:20 +00:00 · 2021-03-28 13:28:34 -04:00 · 2021-03-28 13:28:34 -04:00 · af135d6853
commit af135d6853
parent 8d1cecf7f7
1 changed files with 587 additions and 0 deletions
--- a/EvaluationContexts.v
+++ b/EvaluationContexts.v
@ -294,3 +294,590 @@ Module Stlc.
    eapply plug_func; eassumption.
  Qed.    
 End Stlc.
 (** * Some More Classic Features *)
 (* Here's how easy it is to extend those definitions and proofs to two other
 * common features of functional-programming languages.  We'll use comments to
 * mark the only places where code is added.  Very little old code needs to be
 * changed!  The version in the book PDF shows even more clearly how evaluation
 * contexts make for compact descriptions of features, since here we are
 * manually writing [plug] relations, following clear conventions in
 * evaluation-context grammars. *)
 Module StlcPairs.
  Inductive exp : Set :=
  | Var (x : var)
  | Const (n : nat)
  | Plus (e1 e2 : exp)
  | Abs (x : var) (e1 : exp)
  | App (e1 e2 : exp)
  (* We can combine two values together into a pair, and then we can use
   * projection functions to retrieve the first and second components,
   * respectively. *)
  | Pair (e1 e2 : exp)
  | Fst (e1 : exp)
  | Snd (e2 : exp).
  Inductive value : exp -> Prop :=
  | VConst : forall n, value (Const n)
  | VAbs : forall x e1, value (Abs x e1)
  (* A pair of values is a value.  (Now this relation finally becomes
   * recursive.) *)
  | VPair : forall v1 v2, value v1 -> value v2 -> value (Pair v1 v2).
  Fixpoint subst (e1 : exp) (x : string) (e2 : exp) : exp :=
    match e2 with
      | Var y => if y ==v x then e1 else Var y
      | Const n => Const n
      | Plus e2' e2'' => Plus (subst e1 x e2') (subst e1 x e2'')
      | Abs y e2' => Abs y (if y ==v x then e2' else subst e1 x e2')
      | App e2' e2'' => App (subst e1 x e2') (subst e1 x e2'')
      (* Some bureaucratic work here to add predictable cases *)
      | Pair e2' e2'' => Pair (subst e1 x e2') (subst e1 x e2'')
      | Fst e2' => Fst (subst e1 x e2')
      | Snd e2' => Snd (subst e1 x e2')
    end.
  Inductive context : Set :=
  | Hole : context
  | Plus1 : context -> exp -> context
  | Plus2 : exp -> context -> context
  | App1 : context -> exp -> context
  | App2 : exp -> context -> context
  (* Two new context kinds, indicating left-to-right evaluation order for
   * pairs *)
  | Pair1 : context -> exp -> context
  | Pair2 : exp -> context -> context
  (* And similar for projections *)
  | Fst1 : context -> context
  | Snd1 : context -> context.
  Inductive plug : context -> exp -> exp -> Prop :=
  | PlugHole : forall e, plug Hole e e
  | PlugPlus1 : forall e e' C e2,
    plug C e e'
    -> plug (Plus1 C e2) e (Plus e' e2)
  | PlugPlus2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (Plus2 v1 C) e (Plus v1 e')
  | PlugApp1 : forall e e' C e2,
    plug C e e'
    -> plug (App1 C e2) e (App e' e2)
  | PlugApp2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (App2 v1 C) e (App v1 e')
  (* Our new plugging rules *)
  | PlugPair1 : forall e e' C e2,
    plug C e e'
    -> plug (Pair1 C e2) e (Pair e' e2)
  | PlugPair2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (Pair2 v1 C) e (Pair v1 e')
  | PlugFst1 : forall e e' C,
    plug C e e'
    -> plug (Fst1 C) e (Fst e')
  | PlugSnd1 : forall e e' C,
    plug C e e'
    -> plug (Snd1 C) e (Snd e').
  Inductive step0 : exp -> exp -> Prop :=
  | Beta : forall x e v,
    value v
    -> step0 (App (Abs x e) v) (subst v x e)
  | Add : forall n1 n2,
      step0 (Plus (Const n1) (Const n2)) (Const (n1 + n2))
  (* Reducing projections *)
  | FstPair : forall v1 v2,
      value v1
      -> value v2
      -> step0 (Fst (Pair v1 v2)) v1
  | SndPair : forall v1 v2,
      value v1
      -> value v2
      -> step0 (Snd (Pair v1 v2)) v2.
  Inductive step : exp -> exp -> Prop :=
  | StepRule : forall C e1 e2 e1' e2',
    plug C e1 e1'
    -> plug C e2 e2'
    -> step0 e1 e2
    -> step e1' e2'.
  Definition trsys_of (e : exp) := {|
    Initial := {e};
    Step := step
  |}.
  Inductive type :=
  | Nat
  | Fun (dom ran : type)
  | Prod (t1 t2 : type) (* "Prod" for "product," as in Cartesian product *).
  Inductive hasty : fmap var type -> exp -> type -> Prop :=
  | HtVar : forall G x t,
    G $? x = Some t
    -> hasty G (Var x) t
  | HtConst : forall G n,
    hasty G (Const n) Nat
  | HtPlus : forall G e1 e2,
    hasty G e1 Nat
    -> hasty G e2 Nat
    -> hasty G (Plus e1 e2) Nat
  | HtAbs : forall G x e1 t1 t2,
    hasty (G $+ (x, t1)) e1 t2
    -> hasty G (Abs x e1) (Fun t1 t2)
  | HtApp : forall G e1 e2 t1 t2,
    hasty G e1 (Fun t1 t2)
    -> hasty G e2 t1
    -> hasty G (App e1 e2) t2
  | HtPair : forall G e1 e2 t1 t2,
    hasty G e1 t1
    -> hasty G e2 t2
    -> hasty G (Pair e1 e2) (Prod t1 t2)
  | HtFst : forall G e1 t1 t2,
    hasty G e1 (Prod t1 t2)
    -> hasty G (Fst e1) t1
  | HtSnd : forall G e1 t1 t2,
    hasty G e1 (Prod t1 t2)
    -> hasty G (Snd e1) t2.
  Local Hint Constructors value plug step0 step hasty : core.
  Infix "-->" := Fun (at level 60, right associativity).
  Coercion Const : nat >-> exp.
  Infix "^+^" := Plus (at level 50).
  Coercion Var : var >-> exp.
  Notation "\ x , e" := (Abs x e) (at level 51).
  Infix "@" := App (at level 49, left associativity).
  Ltac t0 := match goal with
             | [ H : ex _ |- _ ] => invert H
             | [ H : _ /\ _ |- _ ] => invert H
             | [ |- context[?x ==v ?y] ] => cases (x ==v y)
             | [ H : Some _ = Some _ |- _ ] => invert H
             | [ H : step _ _ |- _ ] => invert H
             | [ H : step0 _ _ |- _ ] => invert1 H
             | [ H : hasty _ ?e _, H' : value ?e |- _ ] => invert H'; invert H; []
               (* Change here!  We need to enforce there is at most one
                * remaining subgoal, or we'll keep doing useless [value]
                * inversions ad infinitum. *)
             | [ H : hasty _ _ _ |- _ ] => invert1 H
             | [ H : plug _ _ _ |- _ ] => invert1 H
             end; subst.
  Ltac t := simplify; propositional; repeat (t0; simplify); try equality; eauto 6.
  Lemma progress : forall e t,
    hasty $0 e t
    -> value e
    \/ (exists e' : exp, step e e').
  Proof.
    induct 1; t.
  Qed.
  Lemma weakening_override : forall (G G' : fmap var type) x t,
    (forall x' t', G $? x' = Some t' -> G' $? x' = Some t')
    -> (forall x' t', G $+ (x, t) $? x' = Some t'
                      -> G' $+ (x, t) $? x' = Some t').
  Proof.
    simplify.
    cases (x ==v x'); simplify; eauto.
  Qed.
  Local Hint Resolve weakening_override : core.
  Lemma weakening : forall G e t,
    hasty G e t
    -> forall G', (forall x t, G $? x = Some t -> G' $? x = Some t)
      -> hasty G' e t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve weakening : core.
  (* Replacing a typing context with an equal one has no effect (useful to guide
   * proof search as a hint). *)
  Lemma hasty_change : forall G e t,
    hasty G e t
    -> forall G', G' = G
      -> hasty G' e t.
  Proof.
    t.
  Qed.
  Local Hint Resolve hasty_change : core.
  Lemma substitution : forall G x t' e t e',
    hasty (G $+ (x, t')) e t
    -> hasty $0 e' t'
    -> hasty G (subst e' x e) t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve substitution : core.
  Lemma preservation0 : forall e1 e2,
    step0 e1 e2
    -> forall t, hasty $0 e1 t
      -> hasty $0 e2 t.
  Proof.
    invert 1; t.
  Qed.
  Local Hint Resolve preservation0 : core.
  Lemma preservation' : forall C e1 e1',
      plug C e1 e1'
      -> forall e2 e2' t, plug C e2 e2'
      -> step0 e1 e2
      -> hasty $0 e1' t
      -> hasty $0 e2' t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve preservation' : core.
  Lemma preservation : forall e1 e2,
    step e1 e2
    -> forall t, hasty $0 e1 t
      -> hasty $0 e2 t.
  Proof.
    invert 1; t.
  Qed.
  Local Hint Resolve progress preservation : core.
  Theorem safety : forall e t, hasty $0 e t
    -> invariantFor (trsys_of e)
                    (fun e' => value e'
                               \/ exists e'', step e' e'').
  Proof.
    simplify.
    apply invariant_weaken with (invariant1 := fun e' => hasty $0 e' t); eauto.
    apply invariant_induction; simplify; eauto; equality.
  Qed.
 End StlcPairs.
 (* Next, the dual feature of *variants*, corresponding to the following type
 * family from Coq's standard library. *)
 Print sum.
 Module StlcSums.
  Inductive exp : Set :=
  | Var (x : var)
  | Const (n : nat)
  | Plus (e1 e2 : exp)
  | Abs (x : var) (e1 : exp)
  | App (e1 e2 : exp)
  | Pair (e1 e2 : exp)
  | Fst (e1 : exp)
  | Snd (e2 : exp)
  (* New cases: *)
  | Inl (e1 : exp)
  | Inr (e2 : exp)
  | Match (e' : exp) (x1 : var) (e1 : exp) (x2 : var) (e2 : exp).
  (* The last one roughly means "match e' with inl x1 => e1 | inr x2 => e2". *)
  Inductive value : exp -> Prop :=
  | VConst : forall n, value (Const n)
  | VAbs : forall x e1, value (Abs x e1)
  | VPair : forall v1 v2, value v1 -> value v2 -> value (Pair v1 v2)
  | VInl : forall v, value v -> value (Inl v)
  | VInr : forall v, value v -> value (Inr v).
  Fixpoint subst (e1 : exp) (x : string) (e2 : exp) : exp :=
    match e2 with
      | Var y => if y ==v x then e1 else Var y
      | Const n => Const n
      | Plus e2' e2'' => Plus (subst e1 x e2') (subst e1 x e2'')
      | Abs y e2' => Abs y (if y ==v x then e2' else subst e1 x e2')
      | App e2' e2'' => App (subst e1 x e2') (subst e1 x e2'')
      | Pair e2' e2'' => Pair (subst e1 x e2') (subst e1 x e2'')
      | Fst e2' => Fst (subst e1 x e2')
      | Snd e2' => Snd (subst e1 x e2')
      (* Some bureaucratic work here to add predictable cases *)
      | Inl e2' => Inl (subst e1 x e2')
      | Inr e2' => Inr (subst e1 x e2')
      | Match e2' x1 e21 x2 e22 => Match (subst e1 x e2')
                                         x1 (if x1 ==v x then e21 else subst e1 x e21)
                                         x2 (if x2 ==v x then e22 else subst e1 x e22)
    end.
  Inductive context : Set :=
  | Hole : context
  | Plus1 : context -> exp -> context
  | Plus2 : exp -> context -> context
  | App1 : context -> exp -> context
  | App2 : exp -> context -> context
  | Pair1 : context -> exp -> context
  | Pair2 : exp -> context -> context
  | Fst1 : context -> context
  | Snd1 : context -> context
  (* New cases: *)
  | Inl1 : context -> context
  | Inr1 : context -> context
  | Match1 : context -> var -> exp -> var -> exp -> context.
  Inductive plug : context -> exp -> exp -> Prop :=
  | PlugHole : forall e, plug Hole e e
  | PlugPlus1 : forall e e' C e2,
    plug C e e'
    -> plug (Plus1 C e2) e (Plus e' e2)
  | PlugPlus2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (Plus2 v1 C) e (Plus v1 e')
  | PlugApp1 : forall e e' C e2,
    plug C e e'
    -> plug (App1 C e2) e (App e' e2)
  | PlugApp2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (App2 v1 C) e (App v1 e')
  | PlugPair1 : forall e e' C e2,
    plug C e e'
    -> plug (Pair1 C e2) e (Pair e' e2)
  | PlugPair2 : forall e e' v1 C,
    value v1
    -> plug C e e'
    -> plug (Pair2 v1 C) e (Pair v1 e')
  | PlugFst1 : forall e e' C,
    plug C e e'
    -> plug (Fst1 C) e (Fst e')
  | PlugSnd1 : forall e e' C,
    plug C e e'
    -> plug (Snd1 C) e (Snd e')
  (* Our new plugging rules *)            
  | PlugInl1 : forall e e' C,
    plug C e e'
    -> plug (Inl1 C) e (Inl e')
  | PlugInr1 : forall e e' C,
    plug C e e'
    -> plug (Inr1 C) e (Inr e')
  | PluMatch1 : forall e e' C x1 e1 x2 e2,
    plug C e e'
    -> plug (Match1 C x1 e1 x2 e2) e (Match e' x1 e1 x2 e2).
  Inductive step0 : exp -> exp -> Prop :=
  | Beta : forall x e v,
    value v
    -> step0 (App (Abs x e) v) (subst v x e)
  | Add : forall n1 n2,
      step0 (Plus (Const n1) (Const n2)) (Const (n1 + n2))
  | FstPair : forall v1 v2,
      value v1
      -> value v2
      -> step0 (Fst (Pair v1 v2)) v1
  | SndPair : forall v1 v2,
      value v1
      -> value v2
      -> step0 (Snd (Pair v1 v2)) v2
  (* Reducing a [Match] *)
  | MatchInl : forall v x1 e1 x2 e2,
      value v
      -> step0 (Match (Inl v) x1 e1 x2 e2) (subst v x1 e1)
  | MatchInr : forall v x1 e1 x2 e2,
      value v
      -> step0 (Match (Inr v) x1 e1 x2 e2) (subst v x2 e2).
  Inductive step : exp -> exp -> Prop :=
  | StepRule : forall C e1 e2 e1' e2',
    plug C e1 e1'
    -> plug C e2 e2'
    -> step0 e1 e2
    -> step e1' e2'.
  Definition trsys_of (e : exp) := {|
    Initial := {e};
    Step := step
  |}.
  Inductive type :=
  | Nat
  | Fun (dom ran : type)
  | Prod (t1 t2 : type)
  (* New case: *)
  | Sum (t1 t2 : type).
  Inductive hasty : fmap var type -> exp -> type -> Prop :=
  | HtVar : forall G x t,
    G $? x = Some t
    -> hasty G (Var x) t
  | HtConst : forall G n,
    hasty G (Const n) Nat
  | HtPlus : forall G e1 e2,
    hasty G e1 Nat
    -> hasty G e2 Nat
    -> hasty G (Plus e1 e2) Nat
  | HtAbs : forall G x e1 t1 t2,
    hasty (G $+ (x, t1)) e1 t2
    -> hasty G (Abs x e1) (Fun t1 t2)
  | HtApp : forall G e1 e2 t1 t2,
    hasty G e1 (Fun t1 t2)
    -> hasty G e2 t1
    -> hasty G (App e1 e2) t2
  | HtPair : forall G e1 e2 t1 t2,
    hasty G e1 t1
    -> hasty G e2 t2
    -> hasty G (Pair e1 e2) (Prod t1 t2)
  | HtFst : forall G e1 t1 t2,
    hasty G e1 (Prod t1 t2)
    -> hasty G (Fst e1) t1
  | HtSnd : forall G e1 t1 t2,
    hasty G e1 (Prod t1 t2)
    -> hasty G (Snd e1) t2
  (* New cases: *)
  | HtInl : forall G e1 t1 t2,
      hasty G e1 t1
      -> hasty G (Inl e1) (Sum t1 t2)
  | HtInr : forall G e1 t1 t2,
      hasty G e1 t2
      -> hasty G (Inr e1) (Sum t1 t2)
  | HtMatch : forall G e t1 t2 x1 e1 x2 e2 t,
      hasty G e (Sum t1 t2)
      -> hasty (G $+ (x1, t1)) e1 t
      -> hasty (G $+ (x2, t2)) e2 t
      -> hasty G (Match e x1 e1 x2 e2) t.
  Local Hint Constructors value plug step0 step hasty : core.
  Infix "-->" := Fun (at level 60, right associativity).
  Coercion Const : nat >-> exp.
  Infix "^+^" := Plus (at level 50).
  Coercion Var : var >-> exp.
  Notation "\ x , e" := (Abs x e) (at level 51).
  Infix "@" := App (at level 49, left associativity).
  Ltac t0 := match goal with
             | [ H : ex _ |- _ ] => invert H
             | [ H : _ /\ _ |- _ ] => invert H
             | [ |- context[?x ==v ?y] ] => cases (x ==v y)
             | [ H : Some _ = Some _ |- _ ] => invert H
             | [ H : step _ _ |- _ ] => invert H
             | [ H : step0 _ _ |- _ ] => invert1 H
             | [ H : hasty _ ?e _, H' : value ?e |- _ ] => invert H'; invert H; []
             (* New case!  For sums, we sometimes need to consider two rules for
              * one [value] inversion. *)
             | [ H : hasty _ ?e _, H' : value ?e |- _ ] => invert H'; invert H; [|]
             | [ H : hasty _ _ _ |- _ ] => invert1 H
             | [ H : plug _ _ _ |- _ ] => invert1 H
             end; subst.
  Ltac t := simplify; propositional; repeat (t0; simplify); try equality; eauto 7.
                                                                 (* change! --^ *)
  Lemma progress : forall e t,
    hasty $0 e t
    -> value e
    \/ (exists e' : exp, step e e').
  Proof.
    induct 1; t.
  Qed.
  Lemma weakening_override : forall (G G' : fmap var type) x t,
    (forall x' t', G $? x' = Some t' -> G' $? x' = Some t')
    -> (forall x' t', G $+ (x, t) $? x' = Some t'
                      -> G' $+ (x, t) $? x' = Some t').
  Proof.
    simplify.
    cases (x ==v x'); simplify; eauto.
  Qed.
  Local Hint Resolve weakening_override : core.
  Lemma weakening : forall G e t,
    hasty G e t
    -> forall G', (forall x t, G $? x = Some t -> G' $? x = Some t)
      -> hasty G' e t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve weakening : core.
  (* Replacing a typing context with an equal one has no effect (useful to guide
   * proof search as a hint). *)
  Lemma hasty_change : forall G e t,
    hasty G e t
    -> forall G', G' = G
      -> hasty G' e t.
  Proof.
    t.
  Qed.
  Local Hint Resolve hasty_change : core.
  Lemma substitution : forall G x t' e t e',
    hasty (G $+ (x, t')) e t
    -> hasty $0 e' t'
    -> hasty G (subst e' x e) t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve substitution : core.
  Lemma preservation0 : forall e1 e2,
    step0 e1 e2
    -> forall t, hasty $0 e1 t
      -> hasty $0 e2 t.
  Proof.
    invert 1; t.
  Qed.
  Local Hint Resolve preservation0 : core.
  Lemma preservation' : forall C e1 e1',
      plug C e1 e1'
      -> forall e2 e2' t, plug C e2 e2'
      -> step0 e1 e2
      -> hasty $0 e1' t
      -> hasty $0 e2' t.
  Proof.
    induct 1; t.
  Qed.
  Local Hint Resolve preservation' : core.
  Lemma preservation : forall e1 e2,
    step e1 e2
    -> forall t, hasty $0 e1 t
      -> hasty $0 e2 t.
  Proof.
    invert 1; t.
  Qed.
  Local Hint Resolve progress preservation : core.
  Theorem safety : forall e t, hasty $0 e t
    -> invariantFor (trsys_of e)
                    (fun e' => value e'
                               \/ exists e'', step e' e'').
  Proof.
    simplify.
    apply invariant_weaken with (invariant1 := fun e' => hasty $0 e' t); eauto.
    apply invariant_induction; simplify; eauto; equality.
  Qed.
 End StlcSums.