153 lines
5.9 KiB
Plaintext
153 lines
5.9 KiB
Plaintext
(*
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* Copyright 2020, Data61, CSIRO (ABN 41 687 119 230)
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*
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* SPDX-License-Identifier: BSD-2-Clause
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*)
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theory StaticFun
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imports
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Main
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begin
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datatype ('a, 'b) Tree = Node 'a 'b "('a, 'b) Tree" "('a, 'b) Tree" | Leaf
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primrec
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lookup_tree :: "('a, 'b) Tree \<Rightarrow> ('a \<Rightarrow> 'c :: linorder) \<Rightarrow> 'a \<Rightarrow> 'b option"
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where
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"lookup_tree Leaf fn x = None"
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| "lookup_tree (Node y v l r) fn x = (if fn x = fn y then Some v
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else if fn x < fn y then lookup_tree l fn x
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else lookup_tree r fn x)"
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definition optional_strict_range :: "('a :: linorder) option \<Rightarrow> 'a option \<Rightarrow> 'a set"
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where
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"optional_strict_range x y = {z. (x = None \<or> the x < z) \<and> (y = None \<or> z < the y)}"
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lemma optional_strict_range_split:
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"z \<in> optional_strict_range x y
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\<Longrightarrow> optional_strict_range x (Some z) = ({..< z} \<inter> optional_strict_range x y)
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\<and> optional_strict_range (Some z) y = ({z <..} \<inter> optional_strict_range x y)"
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by (auto simp add: optional_strict_range_def)
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lemma optional_strict_rangeI:
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"z \<in> optional_strict_range None None"
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"z < y \<Longrightarrow> z \<in> optional_strict_range None (Some y)"
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"x < z \<Longrightarrow> z \<in> optional_strict_range (Some x) None"
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"x < z \<Longrightarrow> z < y \<Longrightarrow> z \<in> optional_strict_range (Some x) (Some y)"
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by (simp_all add: optional_strict_range_def)
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definition
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tree_eq_fun_in_range :: "('a, 'b) Tree \<Rightarrow> ('a \<Rightarrow> 'c :: linorder) \<Rightarrow> ('a \<rightharpoonup> 'b) \<Rightarrow> 'c set \<Rightarrow> bool"
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where
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"tree_eq_fun_in_range T ord f S \<equiv> \<forall>x. (ord x \<in> S) \<longrightarrow> f x = lookup_tree T ord x"
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lemma tree_eq_fun_in_range_from_def:
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"\<lbrakk> f \<equiv> lookup_tree T ord \<rbrakk>
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\<Longrightarrow> tree_eq_fun_in_range T ord f (optional_strict_range None None)"
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by (simp add: tree_eq_fun_in_range_def)
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lemma tree_eq_fun_in_range_split:
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"tree_eq_fun_in_range (Node z v l r) ord f (optional_strict_range x y)
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\<Longrightarrow> ord z \<in> optional_strict_range x y
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\<Longrightarrow> tree_eq_fun_in_range l ord f (optional_strict_range x (Some (ord z)))
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\<and> f z = Some v
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\<and> tree_eq_fun_in_range r ord f (optional_strict_range (Some (ord z)) y)"
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apply (simp add: tree_eq_fun_in_range_def optional_strict_range_split)
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apply fastforce
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done
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ML \<open>
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structure StaticFun = struct
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(* Actually build the tree -- theta (n lg(n)) *)
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fun build_tree' _ mk_leaf [] = mk_leaf
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| build_tree' mk_node mk_leaf xs = let
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val len = length xs
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val (ys, zs) = chop (len div 2) xs
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in case zs of [] => error "build_tree': impossible"
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| ((a, b) :: zs) => mk_node a b (build_tree' mk_node mk_leaf ys)
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(build_tree' mk_node mk_leaf zs)
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end
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fun build_tree ord xs = case xs of [] => error "build_tree : empty"
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| (idx, v) :: _ => let
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val idxT = fastype_of idx
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val vT = fastype_of v
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val treeT = Type (@{type_name StaticFun.Tree}, [idxT, vT])
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val mk_leaf = Const (@{const_name StaticFun.Leaf}, treeT)
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val node = Const (@{const_name StaticFun.Node},
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idxT --> vT --> treeT --> treeT --> treeT)
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fun mk_node a b l r = node $ a $ b $ l $ r
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val lookup = Const (@{const_name StaticFun.lookup_tree},
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treeT --> fastype_of ord --> idxT
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--> Type (@{type_name option}, [vT]))
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in
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lookup $ (build_tree' mk_node mk_leaf xs) $ ord
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end
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fun define_partial_map_tree name mappings ord ctxt = let
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val tree = build_tree ord mappings
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in Local_Theory.define
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((name, NoSyn), ((Thm.def_binding name, []), tree)) ctxt
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|> apfst (apsnd snd)
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end
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fun prove_partial_map_thms thm ctxt = let
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val init = thm RS @{thm tree_eq_fun_in_range_from_def}
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fun rec_tree thm = case Thm.concl_of thm of
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@{term Trueprop} $ (Const (@{const_name tree_eq_fun_in_range}, _)
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$ (Const (@{const_name Node}, _) $ z $ v $ _ $ _) $ _ $ _ $ _) => let
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val t' = thm RS @{thm tree_eq_fun_in_range_split}
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val solve_simp_tac = SUBGOAL (fn (t, i) =>
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(simp_tac ctxt THEN_ALL_NEW SUBGOAL (fn (t', _) =>
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raise TERM ("prove_partial_map_thms: unsolved", [t, t']))) i)
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val r = t' |> (resolve_tac ctxt @{thms optional_strict_rangeI}
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THEN_ALL_NEW solve_simp_tac) 1 |> Seq.hd
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val l = r RS @{thm conjunct1}
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val kr = r RS @{thm conjunct2}
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val k = kr RS @{thm conjunct1}
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val r = kr RS @{thm conjunct2}
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in rec_tree l @ [((z, v), k)] @ rec_tree r end
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| _ => []
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in rec_tree init end
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fun define_tree_and_save_thms name names mappings ord exsimps ctxt = let
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val ((tree, def_thm), ctxt) = define_partial_map_tree name mappings ord ctxt
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val thms = prove_partial_map_thms def_thm (ctxt addsimps exsimps)
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val (idents, thms) = map_split I thms
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val _ = map (fn ((x, y), (x', y')) => (x aconv x' andalso y aconv y')
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orelse raise TERM ("define_tree_and_thms: different", [x, y, x', y']))
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(mappings ~~ idents)
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val (_, ctxt) = Local_Theory.notes
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(map (fn (s, t) => ((Binding.name s, []), [([t], [])]))
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(names ~~ thms)) ctxt
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in (tree, ctxt) end
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fun define_tree_and_thms_with_defs name names key_defs opt_values ord ctxt = let
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val data = names ~~ (key_defs ~~ opt_values)
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|> map_filter (fn (_, (_, NONE)) => NONE | (nm, (thm, SOME v))
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=> SOME (nm, (fst (Logic.dest_equals (Thm.concl_of thm)), v)))
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val (names, mappings) = map_split I data
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in define_tree_and_save_thms name names mappings ord key_defs ctxt end
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end
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\<close>
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(* testing
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local_setup {* StaticFun.define_tree_and_save_thms @{binding tree}
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["one", "two", "three"]
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[(@{term "Suc 0"}, @{term "Suc 0"}),
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(@{term "2 :: nat"}, @{term "15 :: nat"}),
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(@{term "3 :: nat"}, @{term "1 :: nat"})]
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@{term "id :: nat \<Rightarrow> nat"}
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#> snd
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*}
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print_theorems
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*)
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end
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