(* Title: HOL/Tools/BNF/bnf_lfp_util.ML Author: Dmitriy Traytel, TU Muenchen Author: Jasmin Blanchette, TU Muenchen Copyright 2012 Library for the datatype construction. *) signature BNF_LFP_UTIL = sig val mk_bij_betw: term -> term -> term -> term val mk_cardSuc: term -> term val mk_not_empty: term -> term val mk_not_eq: term -> term -> term val mk_rapp: term -> typ -> term val mk_relChain: term -> term -> term val mk_underS: term -> term val mk_worec: term -> term -> term end; structure BNF_LFP_Util : BNF_LFP_UTIL = struct open BNF_Util (*reverse application*) fun mk_rapp arg T = Term.absdummy (fastype_of arg --> T) (Bound 0 $ arg); fun mk_underS r = let val T = fst (dest_relT (fastype_of r)); in Const (\<^const_name>\underS\, mk_relT (T, T) --> T --> HOLogic.mk_setT T) $ r end; fun mk_worec r f = let val (A, AB) = apfst domain_type (dest_funT (fastype_of f)); in Const (\<^const_name>\wo_rel.worec\, mk_relT (A, A) --> (AB --> AB) --> AB) $ r $ f end; fun mk_relChain r f = let val (A, AB) = `domain_type (fastype_of f); in Const (\<^const_name>\relChain\, mk_relT (A, A) --> AB --> HOLogic.boolT) $ r $ f end; fun mk_cardSuc r = let val T = fst (dest_relT (fastype_of r)); in Const (\<^const_name>\cardSuc\, mk_relT (T, T) --> mk_relT (`I (HOLogic.mk_setT T))) $ r end; fun mk_bij_betw f A B = Const (\<^const_name>\bij_betw\, fastype_of f --> fastype_of A --> fastype_of B --> HOLogic.boolT) $ f $ A $ B; fun mk_not_eq x y = HOLogic.mk_not (HOLogic.mk_eq (x, y)); fun mk_not_empty B = mk_not_eq B (HOLogic.mk_set (HOLogic.dest_setT (fastype_of B)) []); end;