(* Title: HOL/Codatatype/Tools/bnf_gfp_util.ML
Author: Dmitriy Traytel, TU Muenchen
Copyright 2012
Library for the codatatype construction.
*)
signature BNF_GFP_UTIL =
sig
val mk_rec_simps: int -> thm -> thm list -> thm list list
val dest_listT: typ -> typ
val mk_Cons: term -> term -> term
val mk_If: term -> term -> term -> term
val mk_Shift: term -> term -> term
val mk_Succ: term -> term -> term
val mk_Times: term * term -> term
val mk_append: term * term -> term
val mk_congruent: term -> term -> term
val mk_clists: term -> term
val mk_diag: term -> term
val mk_equiv: term -> term -> term
val mk_fromCard: term -> term -> term
val mk_list_rec: term -> term -> term
val mk_nat_rec: term -> term -> term
val mk_pickWP: term -> term -> term -> term -> term -> term
val mk_prefCl: term -> term
val mk_proj: term -> term
val mk_quotient: term -> term -> term
val mk_shift: term -> term -> term
val mk_size: term -> term
val mk_thePull: term -> term -> term -> term -> term
val mk_toCard: term -> term -> term
val mk_undefined: typ -> term
val mk_univ: term -> term
val mk_specN: int -> thm -> thm
val mk_InN_Field: int -> int -> thm
val mk_InN_inject: int -> int -> thm
val mk_InN_not_InM: int -> int -> thm
end;
structure BNF_GFP_Util : BNF_GFP_UTIL =
struct
open BNF_Util
val mk_append = HOLogic.mk_binop @{const_name append};
fun mk_equiv B R =
Const (@{const_name equiv}, fastype_of B --> fastype_of R --> HOLogic.boolT) $ B $ R;
fun mk_Sigma (A, B) =
let
val AT = fastype_of A;
val BT = fastype_of B;
val ABT = mk_relT (HOLogic.dest_setT AT, HOLogic.dest_setT (range_type BT));
in Const (@{const_name Sigma}, AT --> BT --> ABT) $ A $ B end;
fun mk_diag A =
let
val AT = fastype_of A;
val AAT = mk_relT (HOLogic.dest_setT AT, HOLogic.dest_setT AT);
in Const (@{const_name diag}, AT --> AAT) $ A end;
fun mk_Times (A, B) =
let val AT = HOLogic.dest_setT (fastype_of A);
in mk_Sigma (A, Term.absdummy AT B) end;
fun dest_listT (Type (@{type_name list}, [T])) = T
| dest_listT T = raise TYPE ("dest_setT: set type expected", [T], []);
fun mk_Succ Kl kl =
let val T = fastype_of kl;
in
Const (@{const_name Succ},
HOLogic.mk_setT T --> T --> HOLogic.mk_setT (dest_listT T)) $ Kl $ kl
end;
fun mk_Shift Kl k =
let val T = fastype_of Kl;
in
Const (@{const_name Shift}, T --> dest_listT (HOLogic.dest_setT T) --> T) $ Kl $ k
end;
fun mk_shift lab k =
let val T = fastype_of lab;
in
Const (@{const_name shift}, T --> dest_listT (Term.domain_type T) --> T) $ lab $ k
end;
fun mk_prefCl A =
Const (@{const_name prefCl}, fastype_of A --> HOLogic.boolT) $ A;
fun mk_clists r =
let val T = fastype_of r;
in Const (@{const_name clists}, T --> mk_relT (`I (HOLogic.listT (fst (dest_relT T))))) $ r end;
fun mk_toCard A r =
let
val AT = fastype_of A;
val rT = fastype_of r;
in
Const (@{const_name toCard},
AT --> rT --> HOLogic.dest_setT AT --> fst (dest_relT rT)) $ A $ r
end;
fun mk_fromCard A r =
let
val AT = fastype_of A;
val rT = fastype_of r;
in
Const (@{const_name fromCard},
AT --> rT --> fst (dest_relT rT) --> HOLogic.dest_setT AT) $ A $ r
end;
fun mk_Cons x xs =
let val T = fastype_of xs;
in Const (@{const_name Cons}, dest_listT T --> T --> T) $ x $ xs end;
fun mk_size t = HOLogic.size_const (fastype_of t) $ t;
fun mk_If p t f =
let val T = fastype_of t;
in Const (@{const_name If}, HOLogic.boolT --> T --> T --> T) $ p $ t $ f end;
fun mk_quotient A R =
let val T = fastype_of A;
in Const (@{const_name quotient}, T --> fastype_of R --> HOLogic.mk_setT T) $ A $ R end;
fun mk_proj R =
let val ((AT, BT), T) = `dest_relT (fastype_of R);
in Const (@{const_name proj}, T --> AT --> HOLogic.mk_setT BT) $ R end;
fun mk_univ f =
let val ((AT, BT), T) = `dest_funT (fastype_of f);
in Const (@{const_name univ}, T --> HOLogic.mk_setT AT --> BT) $ f end;
fun mk_congruent R f =
Const (@{const_name congruent}, fastype_of R --> fastype_of f --> HOLogic.boolT) $ R $ f;
fun mk_undefined T = Const (@{const_name undefined}, T);
fun mk_nat_rec Zero Suc =
let val T = fastype_of Zero;
in Const (@{const_name nat_rec}, T --> fastype_of Suc --> HOLogic.natT --> T) $ Zero $ Suc end;
fun mk_list_rec Nil Cons =
let
val T = fastype_of Nil;
val (U, consT) = `(Term.domain_type) (fastype_of Cons);
in
Const (@{const_name list_rec}, T --> consT --> HOLogic.listT U --> T) $ Nil $ Cons
end;
fun mk_thePull B1 B2 f1 f2 =
let
val fT1 = fastype_of f1;
val fT2 = fastype_of f2;
val BT1 = domain_type fT1;
val BT2 = domain_type fT2;
in
Const (@{const_name thePull}, HOLogic.mk_setT BT1 --> HOLogic.mk_setT BT2 --> fT1 --> fT2 -->
mk_relT (BT1, BT2)) $ B1 $ B2 $ f1 $ f2
end;
fun mk_pickWP A f1 f2 b1 b2 =
let
val fT1 = fastype_of f1;
val fT2 = fastype_of f2;
val AT = domain_type fT1;
val BT1 = range_type fT1;
val BT2 = range_type fT2;
in
Const (@{const_name pickWP}, HOLogic.mk_setT AT --> fT1 --> fT2 --> BT1 --> BT2 --> AT) $
A $ f1 $ f2 $ b1 $ b2
end;
fun mk_InN_not_InM 1 _ = @{thm Inl_not_Inr}
| mk_InN_not_InM n m =
if n > m then mk_InN_not_InM m n RS @{thm not_sym}
else mk_InN_not_InM (n - 1) (m - 1) RS @{thm not_arg_cong_Inr};
fun mk_InN_Field 1 1 = @{thm TrueE[OF TrueI]}
| mk_InN_Field _ 1 = @{thm Inl_Field_csum}
| mk_InN_Field 2 2 = @{thm Inr_Field_csum}
| mk_InN_Field n m = mk_InN_Field (n - 1) (m - 1) RS @{thm Inr_Field_csum};
fun mk_InN_inject 1 _ = @{thm TrueE[OF TrueI]}
| mk_InN_inject _ 1 = @{thm Inl_inject}
| mk_InN_inject 2 2 = @{thm Inr_inject}
| mk_InN_inject n m = @{thm Inr_inject} RS mk_InN_inject (n - 1) (m - 1);
fun mk_specN 0 thm = thm
| mk_specN n thm = mk_specN (n - 1) (thm RS spec);
fun mk_rec_simps n rec_thm defs = map (fn i =>
map (fn def => def RS rec_thm RS mk_nthI n i RS fun_cong) defs) (1 upto n);
end;