src/HOL/Library/Code_Abstract_Nat.thy
author haftmann
Tue, 26 Oct 2021 14:43:59 +0000
changeset 74592 3c587b7c3d5c
parent 69593 3dda49e08b9d
child 75651 f4116b7a6679
permissions -rw-r--r--
more generic bit/word lemmas for distribution

(*  Title:      HOL/Library/Code_Abstract_Nat.thy
    Author:     Stefan Berghofer, Florian Haftmann, TU Muenchen
*)

section \<open>Avoidance of pattern matching on natural numbers\<close>

theory Code_Abstract_Nat
imports Main
begin

text \<open>
  When natural numbers are implemented in another than the
  conventional inductive \<^term>\<open>0::nat\<close>/\<^term>\<open>Suc\<close> representation,
  it is necessary to avoid all pattern matching on natural numbers
  altogether.  This is accomplished by this theory (up to a certain
  extent).
\<close>

subsection \<open>Case analysis\<close>

text \<open>
  Case analysis on natural numbers is rephrased using a conditional
  expression:
\<close>

lemma [code, code_unfold]:
  "case_nat = (\<lambda>f g n. if n = 0 then f else g (n - 1))"
  by (auto simp add: fun_eq_iff dest!: gr0_implies_Suc)


subsection \<open>Preprocessors\<close>

text \<open>
  The term \<^term>\<open>Suc n\<close> is no longer a valid pattern.  Therefore,
  all occurrences of this term in a position where a pattern is
  expected (i.e.~on the left-hand side of a code equation) must be
  eliminated.  This can be accomplished -- as far as possible -- by
  applying the following transformation rule:
\<close>

lemma Suc_if_eq:
  assumes "\<And>n. f (Suc n) \<equiv> h n"
  assumes "f 0 \<equiv> g"
  shows "f n \<equiv> if n = 0 then g else h (n - 1)"
  by (rule eq_reflection) (cases n, insert assms, simp_all)

text \<open>
  The rule above is built into a preprocessor that is plugged into
  the code generator.
\<close>

setup \<open>
let

val Suc_if_eq = Thm.incr_indexes 1 @{thm Suc_if_eq};

fun remove_suc ctxt thms =
  let
    val vname = singleton (Name.variant_list (map fst
      (fold (Term.add_var_names o Thm.full_prop_of) thms []))) "n";
    val cv = Thm.cterm_of ctxt (Var ((vname, 0), HOLogic.natT));
    val lhs_of = snd o Thm.dest_comb o fst o Thm.dest_comb o Thm.cprop_of;
    val rhs_of = snd o Thm.dest_comb o Thm.cprop_of;
    fun find_vars ct = (case Thm.term_of ct of
        (Const (\<^const_name>\<open>Suc\<close>, _) $ Var _) => [(cv, snd (Thm.dest_comb ct))]
      | _ $ _ =>
        let val (ct1, ct2) = Thm.dest_comb ct
        in 
          map (apfst (fn ct => Thm.apply ct ct2)) (find_vars ct1) @
          map (apfst (Thm.apply ct1)) (find_vars ct2)
        end
      | _ => []);
    val eqs = maps
      (fn thm => map (pair thm) (find_vars (lhs_of thm))) thms;
    fun mk_thms (thm, (ct, cv')) =
      let
        val thm' =
          Thm.implies_elim
           (Conv.fconv_rule (Thm.beta_conversion true)
             (Thm.instantiate'
               [SOME (Thm.ctyp_of_cterm ct)] [SOME (Thm.lambda cv ct),
                 SOME (Thm.lambda cv' (rhs_of thm)), NONE, SOME cv']
               Suc_if_eq)) (Thm.forall_intr cv' thm)
      in
        case map_filter (fn thm'' =>
            SOME (thm'', singleton
              (Variable.trade (K (fn [thm'''] => [thm''' RS thm']))
                (Variable.declare_thm thm'' ctxt)) thm'')
          handle THM _ => NONE) thms of
            [] => NONE
          | thmps =>
              let val (thms1, thms2) = split_list thmps
              in SOME (subtract Thm.eq_thm (thm :: thms1) thms @ thms2) end
      end
  in get_first mk_thms eqs end;

fun eqn_suc_base_preproc ctxt thms =
  let
    val dest = fst o Logic.dest_equals o Thm.prop_of;
    val contains_suc = exists_Const (fn (c, _) => c = \<^const_name>\<open>Suc\<close>);
  in
    if forall (can dest) thms andalso exists (contains_suc o dest) thms
      then thms |> perhaps_loop (remove_suc ctxt) |> (Option.map o map) Drule.zero_var_indexes
       else NONE
  end;

val eqn_suc_preproc = Code_Preproc.simple_functrans eqn_suc_base_preproc;

in

  Code_Preproc.add_functrans ("eqn_Suc", eqn_suc_preproc)

end
\<close>


subsection \<open>One candidate which needs special treatment\<close>

lemma take_bit_num_code [code]:
  \<open>take_bit_num n Num.One =
    (case n of 0 \<Rightarrow> None | Suc n \<Rightarrow> Some Num.One)\<close>
  \<open>take_bit_num n (Num.Bit0 m) =
    (case n of 0 \<Rightarrow> None | Suc n \<Rightarrow> (case take_bit_num n m of None \<Rightarrow> None | Some q \<Rightarrow> Some (Num.Bit0 q)))\<close>
  \<open>take_bit_num n (Num.Bit1 m) =
    (case n of 0 \<Rightarrow> None | Suc n \<Rightarrow> Some (case take_bit_num n m of None \<Rightarrow> Num.One | Some q \<Rightarrow> Num.Bit1 q))\<close>
    apply (cases n; simp)+
  done

end