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Quelle Paper_Examples.thy Sprache: Isabelle |
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(* Title: HOL/Corec_Examples/Paper_Examples.thy
Author: Andreas Lochbihler, ETH Zuerich Author: Andrei Popescu, TU Muenchen Copyright 2016 Small examples from the paper "Friends with Benefits". *) section \<open>Small Examples from the Paper ``Friends with Benefits''\<close> theory Paper_Examples imports "HOL-Library.BNF_Corec" "HOL-Library.FSet" Complex_Main begin section \<open>Examples from the introduction\<close> codatatype 'a stream = SCons (shd: 'a) (stl: "'a stream") (infixr \<open>\<lhd>\<close> 65) corec "natsFrom" :: "nat \ "natsFrom n = n \ corec (friend) add1 :: "nat stream \ where "add1 ns = (shd ns + 1) \ corec natsFrom' :: "nat \ "natsFrom' n = n \ section \<open>Examples from section 3\<close> text \<open>We curry the example functions in this section because infix syntax works only for cu corec (friend) Plus :: "nat stream \ "x\<^sub>1 \ section \<open>Examples from section 4\<close> codatatype 'a llist = LNil | LCons 'a "'a llist" corec collatz :: "nat \ "collatz n = (if n \ else if even n then collatz (n div 2) else LCons n (collatz (3 * n + 1)))" datatype 'a nelist = NEList (hd:'a) (tl:"'a list") primrec (transfer) snoc :: "'a list \ "[] \ |"(b # bs) \ corec (friend) inter :: "nat stream nelist \ "inter xss = shd (hd xss) \ corec (friend) inter' :: "nat stream nelist \ "inter' xss = (case hd xss of x \ corec zero :: "nat stream" where "zero = 0 \ section \<open>Examples from Blanchette et al. (ICFP 2015)\<close> corec oneTwos :: "nat stream" where "oneTwos = 1 \ corec everyOther :: "'a stream \ where "everyOther xs = shd xs \ corec fibA :: "nat stream" where "fibA = 0 \ corec fibB :: "nat stream" where "fibB = (0 \ corec (friend) times :: "nat stream \ where "xs \ corec (friend) exp :: "nat stream \ where "exp xs = 2 ^ shd xs \ corec facA :: "nat stream" where "facA = (1 \ corec facB :: "nat stream" where "facB = exp (0 \ corec (friend) sfsup :: "nat stream fset \ where "sfsup X = Sup (fset (fimage shd X)) \ codatatype tree = Node (val: nat) (sub: "tree list") corec (friend) tplus :: "tree \ where "tplus t u = Node (val t + val u) (map (\ corec (friend) ttimes :: "tree \ where "ttimes t u = Node (val t * val u) (map (\<lambda>(t, u). tplus (ttimes t u) (ttimes t u)) (zip (sub t) (sub u)))" corecursive primes :: "nat \ where "primes m n = (if (m = 0 \<and> n > 1) \<or> coprime m n then n \<lhd> primes (m * n) (n + 1) else primes m (n + 1))" apply (relation "measure (\ apply (auto simp: mod_Suc diff_less_mono2 intro: Suc_lessI elim!: not_coprimeE) apply (metis dvd_1_iff_1 dvd_eq_mod_eq_0 mod_0 mod_Suc mod_Suc_eq mod_mod_cancel) done corec facC :: "nat \ where "facC n a i = (if i = 0 then a \ corec catalan :: "nat \ where "catalan n = (if n > 0 then catalan (n - 1) \ corec (friend) heart :: "nat stream \ where "xs \ corec (friend) g :: "'a stream \ where "g xs = shd xs \ end ¤ Dauer der Verarbeitung: 0.1 Sekunden (vorverarbeitet) ¤*© Formatika GbR, Deutschland |
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2026-03-28