rhs of abstract code equations are not subject to preprocessing: inline code abbrevs explicitly
structure ROOT =
struct
structure Nat =
struct
datatype nat = Zero_nat | Suc of nat;
end; (*struct Nat*)
structure Integer =
struct
datatype bit = B0 | B1;
datatype int = Pls | Min | Bit of int * bit | Number_of_int of int;
fun pred (Bit (k, B0)) = Bit (pred k, B1)
| pred (Bit (k, B1)) = Bit (k, B0)
| pred Min = Bit (Min, B0)
| pred Pls = Min;
fun uminus_int (Number_of_int w) = Number_of_int (uminus_int w)
| uminus_int (Bit (k, B0)) = Bit (uminus_int k, B0)
| uminus_int (Bit (k, B1)) = Bit (pred (uminus_int k), B1)
| uminus_int Min = Bit (Pls, B1)
| uminus_int Pls = Pls;
fun succ (Bit (k, B0)) = Bit (k, B1)
| succ (Bit (k, B1)) = Bit (succ k, B0)
| succ Min = Pls
| succ Pls = Bit (Pls, B1);
fun plus_int (Number_of_int v) (Number_of_int w) =
Number_of_int (plus_int v w)
| plus_int k Min = pred k
| plus_int k Pls = k
| plus_int (Bit (k, B1)) (Bit (l, B1)) = Bit (plus_int k (succ l), B0)
| plus_int (Bit (k, B1)) (Bit (l, B0)) = Bit (plus_int k l, B1)
| plus_int (Bit (k, B0)) (Bit (l, b)) = Bit (plus_int k l, b)
| plus_int Min k = pred k
| plus_int Pls k = k;
fun minus_int (Number_of_int v) (Number_of_int w) =
Number_of_int (plus_int v (uminus_int w))
| minus_int z w = plus_int z (uminus_int w);
fun less_eq_int (Number_of_int k) (Number_of_int l) = less_eq_int k l
| less_eq_int (Bit (k1, B1)) (Bit (k2, B0)) = less_int k1 k2
| less_eq_int (Bit (k1, v)) (Bit (k2, B1)) = less_eq_int k1 k2
| less_eq_int (Bit (k1, B0)) (Bit (k2, v)) = less_eq_int k1 k2
| less_eq_int (Bit (k, v)) Min = less_eq_int k Min
| less_eq_int (Bit (k, B1)) Pls = less_int k Pls
| less_eq_int (Bit (k, B0)) Pls = less_eq_int k Pls
| less_eq_int Min (Bit (k, B1)) = less_eq_int Min k
| less_eq_int Min (Bit (k, B0)) = less_int Min k
| less_eq_int Min Min = true
| less_eq_int Min Pls = true
| less_eq_int Pls (Bit (k, v)) = less_eq_int Pls k
| less_eq_int Pls Min = false
| less_eq_int Pls Pls = true
and less_int (Number_of_int k) (Number_of_int l) = less_int k l
| less_int (Bit (k1, B0)) (Bit (k2, B1)) = less_eq_int k1 k2
| less_int (Bit (k1, B1)) (Bit (k2, v)) = less_int k1 k2
| less_int (Bit (k1, v)) (Bit (k2, B0)) = less_int k1 k2
| less_int (Bit (k, B1)) Min = less_int k Min
| less_int (Bit (k, B0)) Min = less_eq_int k Min
| less_int (Bit (k, v)) Pls = less_int k Pls
| less_int Min (Bit (k, v)) = less_int Min k
| less_int Min Min = false
| less_int Min Pls = true
| less_int Pls (Bit (k, B1)) = less_eq_int Pls k
| less_int Pls (Bit (k, B0)) = less_int Pls k
| less_int Pls Min = false
| less_int Pls Pls = false;
fun nat_aux n i =
(if less_eq_int i (Number_of_int Pls) then n
else nat_aux (Nat.Suc n)
(minus_int i (Number_of_int (Bit (Pls, B1)))));
fun nat i = nat_aux Nat.Zero_nat i;
end; (*struct Integer*)
structure Codegen =
struct
val dummy_set : (Nat.nat -> Nat.nat) list = Nat.Suc :: [];
val foobar_set : Nat.nat list =
Nat.Zero_nat ::
(Nat.Suc Nat.Zero_nat ::
(Integer.nat
(Integer.Number_of_int
(Integer.Bit
(Integer.Bit (Integer.Pls, Integer.B1), Integer.B0)))
:: []));
end; (*struct Codegen*)
end; (*struct ROOT*)