-- | -- Untyped (nominal) lambda-calculus with integers and the conditional -- -- -- -- -- [The Abstract of the lecture notes] -- We expound a view of type checking as evaluation with `abstract values'. Whereas dynamic -- semantics, evaluation, deals with (dynamic) values like 0, 1, etc., static semantics, type -- checking, deals with approximations like int. A type system is sound if it correctly approximates -- the dynamic behavior and predicts its outcome: if the static semantics predicts that a term has -- the type int, the dynamic evaluation of the term, if it terminates, will yield an integer. -- -- As object language, we use simply-typed and let-polymorphic lambda calculi with integers and -- integer operations as constants. We use Haskell as a metalanguage in which to write evaluators, -- type checkers, type reconstructors and inferencers for the object language. -- -- We explore the deep relation between parametric polymorphism and `inlining'. Polymorphic type -- checking then is an optimization allowing us to type check a polymorphic term at the place of its -- definition rather than at the places of its use. -- -- Joint work with Chung-chieh Shan. -- -- Version -- The current version is 1.1, July 2008. -- References -- lecture.pdf [199K] -- module Language.TEval.EvalN where data Term = V VarName | L VarName Term | A Term Term | I Int | Term :+ Term -- addition | IFZ Term Term Term -- if zero deriving (Show, Eq) infixl 9 `A` type VarName = String -- | Environment: associating values with `free' variables type Env = [(VarName, Value)] env0 :: Env env0 = [] lkup :: Env -> VarName -> Value lkup env x = maybe err id $ lookup x env where err = error $ "Unbound variable " ++ x ext :: Env -> (VarName,Value) -> Env ext env xt = xt : env data Value = VI Int | VC (Value -> Value) instance Show Value where show (VI n) = "VI " ++ show n show (VC _) = "" -- | Denotational semantics. Why? How to make it operational? eval :: Env -> Term -> Value eval env (V x) = lkup env x eval env (L x e) = VC (\v -> eval (ext env (x,v)) e) eval env (A e1 e2) = let v1 = eval env e1 v2 = eval env e2 in case v1 of VC f -> f v2 v -> error $ "Trying to apply a non-function: " ++ show v eval env (I n) = VI n -- already a value eval env (e1 :+ e2) = let v1 = eval env e1 v2 = eval env e2 in case (v1,v2) of (VI n1, VI n2) -> VI (n1+n2) vs -> error $ "Trying to add non-integers: " ++ show vs eval env (IFZ e1 e2 e3) = let v1 = eval env e1 in case v1 of VI 0 -> eval env e2 VI _ -> eval env e3 v -> error $ "Trying to compare a non-integer to 0: " ++ show v (vx,vy) = (V "x",V "y") term1 = L "x" (IFZ vx (I 1) (vx :+ (I 2))) test11 = eval env0 term1 test12 = eval env0 (term1 `A` (I 2)) -- VI 4 test13 = eval env0 (term1 `A` (I 0)) -- VI 1 test14 = eval env0 (term1 `A` vx) -- Exception: Unbound variable x term2 = L "x" (L "y" (vx :+ vy)) test21 = eval env0 term2 test22 = eval env0 (term2 `A` (I 1)) test23 = eval env0 (term2 `A` (I 1) `A` (I 2)) -- VI 3 -- | Hidden problems term3 = L "x" (IFZ vx (I 1) vy) test31 = eval env0 term3 test32 = eval env0 (term3 `A` (I 0)) -- VI 1 test33 = eval env0 (term3 `A` (I 1)) -- Exception: Unbound variable y term4 = L "x" (IFZ vx (I 1) (vx `A` (I 1))) test41 = eval env0 term4 test42 = eval env0 (term4 `A` (I 0)) -- VI 1 test43 = eval env0 (term4 `A` (I 1)) -- applying a non-function term6 = (L "x" (I 1)) `A` vy test61 = eval env0 term6 -- regarding CBN vs CBV... -- (x+1)*y = x*y + y -- | why is this cheating? Try showing the term tmul1 = L "x" (L "y" (IFZ vx (I 0) ((tmul1 `A` (vx :+ (I (-1))) `A` vy) :+ vy))) testm1 = eval env0 (tmul1 `A` (I 2) `A` (I 3)) -- | termY f === f (termY f) -- or: termY f x === f (termY f) x termY = L "f" (delta `A` (L "y" (L "x" (vf `A` (delta `A` vy) `A` vx)))) where delta = L "y" (vy `A` vy) vf = V "f" tmul = termY `A` (L "self" (L "x" (L "y" (IFZ vx (I 0) (((V "self") `A` (vx :+ (I (-1))) `A` vy) :+ vy))))) testm2 = eval env0 (tmul `A` (I 2) `A` (I 3)) -- VI 6 -- | The following is the implementation of a few exercises. Don't show them termfib = termY `A` (L "self" (L "n" (IFZ vn (I 1) (IFZ (pred vn) (I 1) ((self `A` (pred vn)) :+ (self `A` (pred (pred vn)))))))) where (vn,self) = (V "n", V "self") pred x = x :+ (I (-1)) -- This is an _abbreviation_ testfib = map (\n -> eval env0 (termfib `A` (I n))) [0..7] -- [VI 1,VI 1,VI 2,VI 3,VI 5,VI 8,VI 13,VI 21]