author  berghofe 
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child 25487  d96d5808d926 
permissions  rwrr 
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(* Title: HOL/Tools/inductive_set_package.ML 
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ID: $Id$ 
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Author: Stefan Berghofer, TU Muenchen 
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Wrapper for defining inductive sets using package for inductive predicates, 
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including infrastructure for converting between predicates and sets. 
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*) 
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signature INDUCTIVE_SET_PACKAGE = 
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sig 
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val to_set_att: thm list > attribute 
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val to_pred_att: thm list > attribute 
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val pred_set_conv_att: attribute 
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val add_inductive_i: 
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{verbose: bool, kind: string, alt_name: bstring, coind: bool, no_elim: bool, no_ind: bool} > 
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((string * typ) * mixfix) list > 
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(string * typ) list > ((bstring * Attrib.src list) * term) list > thm list > 
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local_theory > InductivePackage.inductive_result * local_theory 
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val add_inductive: bool > bool > (string * string option * mixfix) list > 
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(string * string option * mixfix) list > 
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((bstring * Attrib.src list) * string) list > (thmref * Attrib.src list) list > 
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local_theory > InductivePackage.inductive_result * local_theory 
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val setup: theory > theory 
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end; 
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structure InductiveSetPackage: INDUCTIVE_SET_PACKAGE = 
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struct 
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(**** simplify {(x1, ..., xn). (x1, ..., xn) : S} to S ****) 
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val collect_mem_simproc = 
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Simplifier.simproc (theory "Set") "Collect_mem" ["Collect t"] (fn thy => fn ss => 
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fn S as Const ("Collect", Type ("fun", [_, T])) $ t => 
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let val (u, Ts, ps) = HOLogic.strip_split t 
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in case u of 
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(c as Const ("op :", _)) $ q $ S' => 
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(case try (HOLogic.dest_tuple' ps) q of 
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NONE => NONE 
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 SOME ts => 
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if not (loose_bvar (S', 0)) andalso 
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ts = map Bound (length ps downto 0) 
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then 
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let val simp = full_simp_tac (Simplifier.inherit_context ss 
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(HOL_basic_ss addsimps [split_paired_all, split_conv])) 1 
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in 
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SOME (Goal.prove (Simplifier.the_context ss) [] [] 
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(Const ("==", T > T > propT) $ S $ S') 
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(K (EVERY 
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[rtac eq_reflection 1, rtac @{thm subset_antisym} 1, 
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rtac subsetI 1, dtac CollectD 1, simp, 
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rtac subsetI 1, rtac CollectI 1, simp]))) 
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end 
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else NONE) 
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 _ => NONE 
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end 
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 _ => NONE); 
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(***********************************************************************************) 
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(* simplifies (%x y. (x, y) : S & P x y) to (%x y. (x, y) : S Int {(x, y). P x y}) *) 
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(* and (%x y. (x, y) : S  P x y) to (%x y. (x, y) : S Un {(x, y). P x y}) *) 
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(* used for converting "strong" (co)induction rules *) 
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(***********************************************************************************) 
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val anyt = Free ("t", TFree ("'t", [])); 
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fun strong_ind_simproc tab = 
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Simplifier.simproc_i HOL.thy "strong_ind" [anyt] (fn thy => fn ss => fn t => 
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let 
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fun close p t f = 
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let val vs = Term.add_vars t [] 
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in Drule.instantiate' [] (rev (map (SOME o cterm_of thy o Var) vs)) 
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(p (fold (fn x as (_, T) => fn u => all T $ lambda (Var x) u) vs t) f) 
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end; 
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fun mkop "op &" T x = SOME (Const ("op Int", T > T > T), x) 
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 mkop "op " T x = SOME (Const ("op Un", T > T > T), x) 
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 mkop _ _ _ = NONE; 
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fun mk_collect p T t = 
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let val U = HOLogic.dest_setT T 
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in HOLogic.Collect_const U $ 
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HOLogic.ap_split' (HOLogic.prod_factors p) U HOLogic.boolT t 
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end; 
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fun decomp (Const (s, _) $ ((m as Const ("op :", 
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Type (_, [_, Type (_, [T, _])]))) $ p $ S) $ u) = 
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mkop s T (m, p, S, mk_collect p T (head_of u)) 
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 decomp (Const (s, _) $ u $ ((m as Const ("op :", 
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Type (_, [_, Type (_, [T, _])]))) $ p $ S)) = 
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mkop s T (m, p, mk_collect p T (head_of u), S) 
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 decomp _ = NONE; 
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val simp = full_simp_tac (Simplifier.inherit_context ss 
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(HOL_basic_ss addsimps [mem_Collect_eq, split_conv])) 1; 
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fun mk_rew t = (case strip_abs_vars t of 
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[] => NONE 
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 xs => (case decomp (strip_abs_body t) of 
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NONE => NONE 
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 SOME (bop, (m, p, S, S')) => 
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SOME (close (Goal.prove (Simplifier.the_context ss) [] []) 
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(Logic.mk_equals (t, list_abs (xs, m $ p $ (bop $ S $ S')))) 
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(K (EVERY 
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[rtac eq_reflection 1, REPEAT (rtac ext 1), rtac iffI 1, 
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EVERY [etac conjE 1, rtac IntI 1, simp, simp, 
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etac IntE 1, rtac conjI 1, simp, simp] ORELSE 
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EVERY [etac disjE 1, rtac UnI1 1, simp, rtac UnI2 1, simp, 
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etac UnE 1, rtac disjI1 1, simp, rtac disjI2 1, simp]]))) 
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handle ERROR _ => NONE)) 
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in 
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case strip_comb t of 
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(h as Const (name, _), ts) => (case Symtab.lookup tab name of 
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SOME _ => 
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let val rews = map mk_rew ts 
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in 
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if forall is_none rews then NONE 
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else SOME (fold (fn th1 => fn th2 => combination th2 th1) 
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(map2 (fn SOME r => K r  NONE => reflexive o cterm_of thy) 
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rews ts) (reflexive (cterm_of thy h))) 
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end 
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 NONE => NONE) 
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 _ => NONE 
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end); 
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(* only eta contract terms occurring as arguments of functions satisfying p *) 
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fun eta_contract p = 
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let 
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fun eta b (Abs (a, T, body)) = 
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(case eta b body of 
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body' as (f $ Bound 0) => 
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if loose_bvar1 (f, 0) orelse not b then Abs (a, T, body') 
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else incr_boundvars ~1 f 
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 body' => Abs (a, T, body')) 
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 eta b (t $ u) = eta b t $ eta (p (head_of t)) u 
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 eta b t = t 
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in eta false end; 
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fun eta_contract_thm p = 
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Conv.fconv_rule (Conv.then_conv (Thm.beta_conversion true, fn ct => 
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Thm.transitive (Thm.eta_conversion ct) 
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(Thm.symmetric (Thm.eta_conversion 
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(cterm_of (theory_of_cterm ct) (eta_contract p (term_of ct))))))); 
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(***********************************************************) 
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(* rules for converting between predicate and set notation *) 
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(* *) 
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(* rules for converting predicates to sets have the form *) 
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(* P (%x y. (x, y) : s) = (%x y. (x, y) : S s) *) 
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(* *) 
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(* rules for converting sets to predicates have the form *) 
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(* S {(x, y). p x y} = {(x, y). P p x y} *) 
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(* *) 
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(* where s and p are parameters *) 
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(***********************************************************) 
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structure PredSetConvData = GenericDataFun 
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( 
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type T = 
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{(* rules for converting predicates to sets *) 
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to_set_simps: thm list, 
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(* rules for converting sets to predicates *) 
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to_pred_simps: thm list, 
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(* arities of functions of type t set => ... => u set *) 
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set_arities: (typ * (int list list option list * int list list option)) list Symtab.table, 
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(* arities of functions of type (t => ... => bool) => u => ... => bool *) 
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pred_arities: (typ * (int list list option list * int list list option)) list Symtab.table}; 
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val empty = {to_set_simps = [], to_pred_simps = [], 
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set_arities = Symtab.empty, pred_arities = Symtab.empty}; 
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val extend = I; 
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fun merge _ 
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({to_set_simps = to_set_simps1, to_pred_simps = to_pred_simps1, 
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set_arities = set_arities1, pred_arities = pred_arities1}, 
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{to_set_simps = to_set_simps2, to_pred_simps = to_pred_simps2, 
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set_arities = set_arities2, pred_arities = pred_arities2}) = 
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{to_set_simps = Thm.merge_thms (to_set_simps1, to_set_simps2), 
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to_pred_simps = Thm.merge_thms (to_pred_simps1, to_pred_simps2), 
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set_arities = Symtab.merge_list op = (set_arities1, set_arities2), 
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pred_arities = Symtab.merge_list op = (pred_arities1, pred_arities2)}; 
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); 
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fun name_type_of (Free p) = SOME p 
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 name_type_of (Const p) = SOME p 
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 name_type_of _ = NONE; 
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fun map_type f (Free (s, T)) = Free (s, f T) 
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 map_type f (Var (ixn, T)) = Var (ixn, f T) 
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 map_type f _ = error "map_type"; 
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fun find_most_specific is_inst f eq xs T = 
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find_first (fn U => is_inst (T, f U) 
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andalso forall (fn U' => eq (f U, f U') orelse not 
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(is_inst (T, f U') andalso is_inst (f U', f U))) 
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xs) xs; 
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fun lookup_arity thy arities (s, T) = case Symtab.lookup arities s of 
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NONE => NONE 
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 SOME xs => find_most_specific (Sign.typ_instance thy) fst (op =) xs T; 
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fun lookup_rule thy f rules = find_most_specific 
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(swap #> Pattern.matches thy) (f #> fst) (op aconv) rules; 
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fun infer_arities thy arities (optf, t) fs = case strip_comb t of 
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(Abs (s, T, u), []) => infer_arities thy arities (NONE, u) fs 
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 (Abs _, _) => infer_arities thy arities (NONE, Envir.beta_norm t) fs 
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 (u, ts) => (case Option.map (lookup_arity thy arities) (name_type_of u) of 
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SOME (SOME (_, (arity, _))) => 
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(fold (infer_arities thy arities) (arity ~~ List.take (ts, length arity)) fs 
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handle Subscript => error "infer_arities: bad term") 
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 _ => fold (infer_arities thy arities) (map (pair NONE) ts) 
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(case optf of 
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NONE => fs 
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 SOME f => AList.update op = (u, the_default f 
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(Option.map (curry op inter f) (AList.lookup op = fs u))) fs)); 
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(**************************************************************) 
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(* derive the to_pred equation from the to_set equation *) 
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(* *) 
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(* 1. instantiate each set parameter with {(x, y). p x y} *) 
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(* 2. apply %P. {(x, y). P x y} to both sides of the equation *) 
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(* 3. simplify *) 
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(**************************************************************) 
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fun mk_to_pred_inst thy fs = 
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map (fn (x, ps) => 
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let 
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val U = HOLogic.dest_setT (fastype_of x); 
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val x' = map_type (K (HOLogic.prodT_factors' ps U > HOLogic.boolT)) x 
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in 
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(cterm_of thy x, 
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cterm_of thy (HOLogic.Collect_const U $ 
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HOLogic.ap_split' ps U HOLogic.boolT x')) 
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end) fs; 
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fun mk_to_pred_eq p fs optfs' T thm = 
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let 
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val thy = theory_of_thm thm; 
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val insts = mk_to_pred_inst thy fs; 
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val thm' = Thm.instantiate ([], insts) thm; 
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val thm'' = (case optfs' of 
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NONE => thm' RS sym 
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 SOME fs' => 
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let 
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val U = HOLogic.dest_setT (body_type T); 
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val Ts = HOLogic.prodT_factors' fs' U; 
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(* FIXME: should cterm_instantiate increment indexes? *) 
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val arg_cong' = Thm.incr_indexes (Thm.maxidx_of thm + 1) arg_cong; 
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val (arg_cong_f, _) = arg_cong' > cprop_of > Drule.strip_imp_concl > 
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Thm.dest_comb > snd > Drule.strip_comb > snd > hd > Thm.dest_comb 
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in 
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thm' RS (Drule.cterm_instantiate [(arg_cong_f, 
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cterm_of thy (Abs ("P", Ts > HOLogic.boolT, 
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HOLogic.Collect_const U $ HOLogic.ap_split' fs' U 
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HOLogic.boolT (Bound 0))))] arg_cong' RS sym) 
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end) 
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in 
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Simplifier.simplify (HOL_basic_ss addsimps [mem_Collect_eq, split_conv] 
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addsimprocs [collect_mem_simproc]) thm'' > 
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zero_var_indexes > eta_contract_thm (equal p) 
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end; 
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(**** declare rules for converting predicates to sets ****) 
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fun add ctxt thm {to_set_simps, to_pred_simps, set_arities, pred_arities} = 
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case prop_of thm of 
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Const ("Trueprop", _) $ (Const ("op =", Type (_, [T, _])) $ lhs $ rhs) => 
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(case body_type T of 
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Type ("bool", []) => 
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let 
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val thy = Context.theory_of ctxt; 
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fun factors_of t fs = case strip_abs_body t of 
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Const ("op :", _) $ u $ S => 
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if is_Free S orelse is_Var S then 
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let val ps = HOLogic.prod_factors u 
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in (SOME ps, (S, ps) :: fs) end 
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else (NONE, fs) 
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 _ => (NONE, fs); 
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val (h, ts) = strip_comb lhs 
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val (pfs, fs) = fold_map factors_of ts []; 
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val ((h', ts'), fs') = (case rhs of 
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Abs _ => (case strip_abs_body rhs of 
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Const ("op :", _) $ u $ S => 
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(strip_comb S, SOME (HOLogic.prod_factors u)) 
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 _ => error "member symbol on righthand side expected") 
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 _ => (strip_comb rhs, NONE)) 
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in 
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case (name_type_of h, name_type_of h') of 
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(SOME (s, T), SOME (s', T')) => 
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(case Symtab.lookup set_arities s' of 
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NONE => () 
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 SOME xs => if exists (fn (U, _) => 
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Sign.typ_instance thy (T', U) andalso 
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Sign.typ_instance thy (U, T')) xs 
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then 
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error ("Clash of conversion rules for operator " ^ s') 
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else (); 
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{to_set_simps = thm :: to_set_simps, 
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to_pred_simps = 
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mk_to_pred_eq h fs fs' T' thm :: to_pred_simps, 
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set_arities = Symtab.insert_list op = (s', 
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(T', (map (AList.lookup op = fs) ts', fs'))) set_arities, 
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pred_arities = Symtab.insert_list op = (s, 
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(T, (pfs, fs'))) pred_arities}) 
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 _ => error "set / predicate constant expected" 
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end 
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 _ => error "equation between predicates expected") 
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 _ => error "equation expected"; 
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val pred_set_conv_att = Thm.declaration_attribute 
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(fn thm => fn ctxt => PredSetConvData.map (add ctxt thm) ctxt); 
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(**** convert theorem in set notation to predicate notation ****) 
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fun is_pred tab t = 
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case Option.map (Symtab.lookup tab o fst) (name_type_of t) of 
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SOME (SOME _) => true  _ => false; 
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fun to_pred_simproc rules = 
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let val rules' = map mk_meta_eq rules 
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in 
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Simplifier.simproc_i HOL.thy "to_pred" [anyt] 
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(fn thy => K (lookup_rule thy (prop_of #> Logic.dest_equals) rules')) 
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end; 
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fun to_pred_proc thy rules t = case lookup_rule thy I rules t of 
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NONE => NONE 
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 SOME (lhs, rhs) => 
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SOME (Envir.subst_vars 
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(Pattern.match thy (lhs, t) (Vartab.empty, Vartab.empty)) rhs); 
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fun to_pred thms ctxt thm = 
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let 
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val thy = Context.theory_of ctxt; 
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val {to_pred_simps, set_arities, pred_arities, ...} = 
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fold (add ctxt) thms (PredSetConvData.get ctxt); 
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val fs = filter (is_Var o fst) 
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(infer_arities thy set_arities (NONE, prop_of thm) []); 
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(* instantiate each set parameter with {(x, y). p x y} *) 
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val insts = mk_to_pred_inst thy fs 
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in 
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thm > 
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Thm.instantiate ([], insts) > 
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Simplifier.full_simplify (HOL_basic_ss addsimprocs 
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[to_pred_simproc (mem_Collect_eq :: split_conv :: to_pred_simps)]) > 
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eta_contract_thm (is_pred pred_arities) > 
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RuleCases.save thm 
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end; 
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val to_pred_att = Thm.rule_attribute o to_pred; 
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(**** convert theorem in predicate notation to set notation ****) 
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fun to_set thms ctxt thm = 
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let 
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val thy = Context.theory_of ctxt; 
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val {to_set_simps, pred_arities, ...} = 
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fold (add ctxt) thms (PredSetConvData.get ctxt); 
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val fs = filter (is_Var o fst) 
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(infer_arities thy pred_arities (NONE, prop_of thm) []); 
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(* instantiate each predicate parameter with %x y. (x, y) : s *) 
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val insts = map (fn (x, ps) => 
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let 
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val Ts = binder_types (fastype_of x); 
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val T = HOLogic.mk_tupleT ps Ts; 
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val x' = map_type (K (HOLogic.mk_setT T)) x 
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in 
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(cterm_of thy x, 
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cterm_of thy (list_abs (map (pair "x") Ts, HOLogic.mk_mem 
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(HOLogic.mk_tuple' ps T (map Bound (length ps downto 0)), x')))) 
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end) fs 
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in 
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thm > 
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Thm.instantiate ([], insts) > 
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Simplifier.full_simplify (HOL_basic_ss addsimps to_set_simps 
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addsimprocs [strong_ind_simproc pred_arities]) > 
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RuleCases.save thm 
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end; 
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val to_set_att = Thm.rule_attribute o to_set; 
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(**** preprocessor for code generator ****) 
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fun codegen_preproc thy = 
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let 
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val {to_pred_simps, set_arities, pred_arities, ...} = 
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PredSetConvData.get (Context.Theory thy); 
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fun preproc thm = 
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if exists_Const (fn (s, _) => case Symtab.lookup set_arities s of 
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NONE => false 
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 SOME arities => exists (fn (_, (xs, _)) => 
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forall is_none xs) arities) (prop_of thm) 
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then 
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thm > 
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Simplifier.full_simplify (HOL_basic_ss addsimprocs 
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[to_pred_simproc (mem_Collect_eq :: split_conv :: to_pred_simps)]) > 
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eta_contract_thm (is_pred pred_arities) 
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else thm 
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in map preproc end; 
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fun code_ind_att optmod = to_pred_att [] #> InductiveCodegen.add optmod NONE; 
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(**** definition of inductive sets ****) 
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fun add_ind_set_def {verbose, kind, alt_name, coind, no_elim, no_ind} 
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cs intros monos params cnames_syn ctxt = 
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let 
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val thy = ProofContext.theory_of ctxt; 
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val {set_arities, pred_arities, to_pred_simps, ...} = 
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PredSetConvData.get (Context.Proof ctxt); 
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fun infer (Abs (_, _, t)) = infer t 
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 infer (Const ("op :", _) $ t $ u) = 
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infer_arities thy set_arities (SOME (HOLogic.prod_factors t), u) 
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 infer (t $ u) = infer t #> infer u 
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 infer _ = I; 
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val new_arities = filter_out 
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(fn (x as Free (_, Type ("fun", _)), _) => x mem params 
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 _ => false) (fold (snd #> infer) intros []); 
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val params' = map (fn x => (case AList.lookup op = new_arities x of 
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SOME fs => 
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let 
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val T = HOLogic.dest_setT (fastype_of x); 
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val Ts = HOLogic.prodT_factors' fs T; 
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val x' = map_type (K (Ts > HOLogic.boolT)) x 
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in 
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(x, (x', 
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(HOLogic.Collect_const T $ 
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HOLogic.ap_split' fs T HOLogic.boolT x', 
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list_abs (map (pair "x") Ts, HOLogic.mk_mem 
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(HOLogic.mk_tuple' fs T (map Bound (length fs downto 0)), 
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x))))) 
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end 
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 NONE => (x, (x, (x, x))))) params; 
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val (params1, (params2, params3)) = 
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params' > map snd > split_list > split_list; 
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436 

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(* equations for converting sets to predicates *) 
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val ((cs', cs_info), eqns) = cs > map (fn c as Free (s, T) => 
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let 
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val fs = the_default [] (AList.lookup op = new_arities c); 
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val U = HOLogic.dest_setT (body_type T); 
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val Ts = HOLogic.prodT_factors' fs U; 
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val c' = Free (s ^ "p", 
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map fastype_of params1 @ Ts > HOLogic.boolT) 
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in 
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((c', (fs, U, Ts)), 
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(list_comb (c, params2), 
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HOLogic.Collect_const U $ HOLogic.ap_split' fs U HOLogic.boolT 
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(list_comb (c', params1)))) 
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end) > split_list >> split_list; 
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val eqns' = eqns @ 
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map (prop_of #> HOLogic.dest_Trueprop #> HOLogic.dest_eq) 
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(mem_Collect_eq :: split_conv :: to_pred_simps); 
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454 

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(* predicate version of the introduction rules *) 
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val intros' = 
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map (fn (name_atts, t) => (name_atts, 
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t > 
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map_aterms (fn u => 
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(case AList.lookup op = params' u of 
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461 
SOME (_, (u', _)) => u' 
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462 
 NONE => u)) > 
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463 
Pattern.rewrite_term thy [] [to_pred_proc thy eqns'] > 
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eta_contract (member op = cs' orf is_pred pred_arities))) intros; 
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465 
val cnames_syn' = map (fn (s, _) => (s ^ "p", NoSyn)) cnames_syn; 
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val monos' = map (to_pred [] (Context.Proof ctxt)) monos; 
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val ({preds, intrs, elims, raw_induct, ...}, ctxt1) = 
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InductivePackage.add_ind_def {verbose = verbose, kind = kind, 
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alt_name = "", (* FIXME pass alt_name (!?) *) 
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coind = coind, no_elim = no_elim, no_ind = no_ind} 
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cs' intros' monos' params1 cnames_syn' ctxt; 
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472 

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(* define inductive sets using previously defined predicates *) 
25016  474 
val (defs, ctxt2) = fold_map (LocalTheory.define Thm.internalK) 
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(map (fn ((c_syn, (fs, U, _)), p) => (c_syn, (("", []), 
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fold_rev lambda params (HOLogic.Collect_const U $ 
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HOLogic.ap_split' fs U HOLogic.boolT (list_comb (p, params3)))))) 
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(cnames_syn ~~ cs_info ~~ preds)) ctxt1; 
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479 

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(* prove theorems for converting predicate to set notation *) 
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val ctxt3 = fold 
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(fn (((p, c as Free (s, _)), (fs, U, Ts)), (_, (_, def))) => fn ctxt => 
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let val conv_thm = 
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Goal.prove ctxt (map (fst o dest_Free) params) [] 
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(HOLogic.mk_Trueprop (HOLogic.mk_eq 
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(list_comb (p, params3), 
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487 
list_abs (map (pair "x") Ts, HOLogic.mk_mem 
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(HOLogic.mk_tuple' fs U (map Bound (length fs downto 0)), 
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489 
list_comb (c, params)))))) 
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(K (REPEAT (rtac ext 1) THEN simp_tac (HOL_basic_ss addsimps 
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[def, mem_Collect_eq, split_conv]) 1)) 
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492 
in 
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ctxt > LocalTheory.note kind ((s ^ "p_" ^ s ^ "_eq", 
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[Attrib.internal (K pred_set_conv_att)]), 
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[conv_thm]) > snd 
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end) (preds ~~ cs ~~ cs_info ~~ defs) ctxt2; 
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497 

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498 
(* convert theorems to set notation *) 
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val rec_name = if alt_name = "" then 
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space_implode "_" (map fst cnames_syn) else alt_name; 
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val cnames = map (Sign.full_name (ProofContext.theory_of ctxt3) o #1) cnames_syn; (* FIXME *) 
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502 
val (intr_names, intr_atts) = split_list (map fst intros); 
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val raw_induct' = to_set [] (Context.Proof ctxt3) raw_induct; 
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val (intrs', elims', induct, ctxt4) = 
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InductivePackage.declare_rules kind rec_name coind no_ind cnames 
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(map (to_set [] (Context.Proof ctxt3)) intrs) intr_names intr_atts 
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(map (fn th => (to_set [] (Context.Proof ctxt3) th, 
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508 
map fst (fst (RuleCases.get th)))) elims) 
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509 
raw_induct' ctxt3 
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510 
in 
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511 
({intrs = intrs', elims = elims', induct = induct, 
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512 
raw_induct = raw_induct', preds = map fst defs}, 
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513 
ctxt4) 
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514 
end; 
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515 

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val add_inductive_i = InductivePackage.gen_add_inductive_i add_ind_set_def; 
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val add_inductive = InductivePackage.gen_add_inductive add_ind_set_def; 
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518 

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519 
val mono_add_att = to_pred_att [] #> InductivePackage.mono_add; 
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val mono_del_att = to_pred_att [] #> InductivePackage.mono_del; 
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521 

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522 

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523 
(** package setup **) 
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524 

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525 
(* setup theory *) 
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526 

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527 
val setup = 
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528 
Attrib.add_attributes 
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529 
[("pred_set_conv", Attrib.no_args pred_set_conv_att, 
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530 
"declare rules for converting between predicate and set notation"), 
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531 
("to_set", Attrib.syntax (Attrib.thms >> to_set_att), 
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532 
"convert rule to set notation"), 
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533 
("to_pred", Attrib.syntax (Attrib.thms >> to_pred_att), 
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534 
"convert rule to predicate notation")] #> 
24219  535 
Code.add_attribute ("ind_set", 
536 
Scan.option (Args.$$$ "target"  Args.colon  Args.name) >> code_ind_att) #> 

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537 
Codegen.add_preprocessor codegen_preproc #> 
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538 
Attrib.add_attributes [("mono_set", Attrib.add_del_args mono_add_att mono_del_att, 
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539 
"declaration of monotonicity rule for set operators")] #> 
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540 
Context.theory_map (Simplifier.map_ss (fn ss => 
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541 
ss addsimprocs [collect_mem_simproc])); 
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542 

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543 
(* outer syntax *) 
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544 

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545 
local structure P = OuterParse and K = OuterKeyword in 
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546 

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547 
val ind_set_decl = InductivePackage.gen_ind_decl add_ind_set_def; 
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548 

24867  549 
val _ = 
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550 
OuterSyntax.command "inductive_set" "define inductive sets" K.thy_decl (ind_set_decl false); 
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551 

24867  552 
val _ = 
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OuterSyntax.command "coinductive_set" "define coinductive sets" K.thy_decl (ind_set_decl true); 
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554 

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555 
end; 
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556 

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557 
end; 