Theory Code_Target_Int

theory Code_Target_Int
imports GCD
(*  Title:      HOL/Library/Code_Target_Int.thy
    Author:     Florian Haftmann, TU Muenchen
*)

section ‹Implementation of integer numbers by target-language integers›

theory Code_Target_Int
imports "../GCD"
begin

code_datatype int_of_integer

declare [[code drop: integer_of_int]]

context
includes integer.lifting
begin

lemma [code]:
  "integer_of_int (int_of_integer k) = k"
  by transfer rule

lemma [code]:
  "Int.Pos = int_of_integer ∘ integer_of_num"
  by transfer (simp add: fun_eq_iff) 

lemma [code]:
  "Int.Neg = int_of_integer ∘ uminus ∘ integer_of_num"
  by transfer (simp add: fun_eq_iff) 

lemma [code_abbrev]:
  "int_of_integer (numeral k) = Int.Pos k"
  by transfer simp

lemma [code_abbrev]:
  "int_of_integer (- numeral k) = Int.Neg k"
  by transfer simp
  
lemma [code, symmetric, code_post]:
  "0 = int_of_integer 0"
  by transfer simp

lemma [code, symmetric, code_post]:
  "1 = int_of_integer 1"
  by transfer simp

lemma [code_post]:
  "int_of_integer (- 1) = - 1"
  by simp

lemma [code]:
  "k + l = int_of_integer (of_int k + of_int l)"
  by transfer simp

lemma [code]:
  "- k = int_of_integer (- of_int k)"
  by transfer simp

lemma [code]:
  "k - l = int_of_integer (of_int k - of_int l)"
  by transfer simp

lemma [code]:
  "Int.dup k = int_of_integer (Code_Numeral.dup (of_int k))"
  by transfer simp

declare [[code drop: Int.sub]]

lemma [code]:
  "k * l = int_of_integer (of_int k * of_int l)"
  by simp

lemma [code]:
  "k div l = int_of_integer (of_int k div of_int l)"
  by simp

lemma [code]:
  "k mod l = int_of_integer (of_int k mod of_int l)"
  by simp

lemma [code]:
  "divmod m n = map_prod int_of_integer int_of_integer (divmod m n)"
  unfolding prod_eq_iff divmod_def map_prod_def case_prod_beta fst_conv snd_conv
  by transfer simp

lemma [code]:
  "HOL.equal k l = HOL.equal (of_int k :: integer) (of_int l)"
  by transfer (simp add: equal)

lemma [code]:
  "k ≤ l ⟷ (of_int k :: integer) ≤ of_int l"
  by transfer rule

lemma [code]:
  "k < l ⟷ (of_int k :: integer) < of_int l"
  by transfer rule

lemma gcd_int_of_integer [code]:
  "gcd (int_of_integer x) (int_of_integer y) = int_of_integer (gcd x y)"
by transfer rule

lemma lcm_int_of_integer [code]:
  "lcm (int_of_integer x) (int_of_integer y) = int_of_integer (lcm x y)"
by transfer rule

end

lemma (in ring_1) of_int_code_if:
  "of_int k = (if k = 0 then 0
     else if k < 0 then - of_int (- k)
     else let
       l = 2 * of_int (k div 2);
       j = k mod 2
     in if j = 0 then l else l + 1)"
proof -
  from mod_div_equality have *: "of_int k = of_int (k div 2 * 2 + k mod 2)" by simp
  show ?thesis
    by (simp add: Let_def of_int_add [symmetric]) (simp add: * mult.commute)
qed

declare of_int_code_if [code]

lemma [code]:
  "nat = nat_of_integer ∘ of_int"
  including integer.lifting by transfer (simp add: fun_eq_iff)

code_identifier
  code_module Code_Target_Int 
    (SML) Arith and (OCaml) Arith and (Haskell) Arith

end