fin_collections.v 7.45 KB
 Robbert Krebbers committed Feb 08, 2015 1 ``````(* Copyright (c) 2012-2015, Robbert Krebbers. *) `````` Robbert Krebbers committed Aug 29, 2012 2 3 4 5 ``````(* This file is distributed under the terms of the BSD license. *) (** This file collects definitions and theorems on finite collections. Most importantly, it implements a fold and size function and some useful induction principles on finite collections . *) `````` Robbert Krebbers committed Feb 13, 2016 6 7 8 ``````From Coq Require Import Permutation. From stdpp Require Import relations listset. From stdpp Require Export numbers collections. `````` Robbert Krebbers committed Jun 11, 2012 9 `````` `````` Robbert Krebbers committed Nov 12, 2012 10 11 12 ``````Instance collection_size `{Elements A C} : Size C := length ∘ elements. Definition collection_fold `{Elements A C} {B} (f : A → B → B) (b : B) : C → B := foldr f b ∘ elements. `````` Robbert Krebbers committed Jun 11, 2012 13 14 15 `````` Section fin_collection. Context `{FinCollection A C}. `````` Robbert Krebbers committed Nov 18, 2015 16 ``````Implicit Types X Y : C. `````` Robbert Krebbers committed Jun 11, 2012 17 `````` `````` Robbert Krebbers committed Dec 11, 2015 18 19 ``````Lemma fin_collection_finite X : set_finite X. Proof. by exists (elements X); intros; rewrite elem_of_elements. Qed. `````` Robbert Krebbers committed Nov 18, 2015 20 ``````Global Instance elements_proper: Proper ((≡) ==> (≡ₚ)) (elements (C:=C)). `````` Robbert Krebbers committed Jun 11, 2012 21 22 ``````Proof. intros ?? E. apply NoDup_Permutation. `````` Robbert Krebbers committed Feb 17, 2016 23 24 25 `````` - apply NoDup_elements. - apply NoDup_elements. - intros. by rewrite !elem_of_elements, E. `````` Robbert Krebbers committed Jun 11, 2012 26 ``````Qed. `````` Robbert Krebbers committed Feb 17, 2016 27 28 29 30 31 32 33 34 35 36 37 38 39 40 41 42 43 ``````Lemma elements_empty : elements (∅ : C) = []. Proof. apply elem_of_nil_inv; intros x. rewrite elem_of_elements, elem_of_empty; tauto. Qed. Lemma elements_union_singleton (X : C) x : x ∉ X → elements ({[ x ]} ∪ X) ≡ₚ x :: elements X. Proof. intros ?; apply NoDup_Permutation. { apply NoDup_elements. } { by constructor; rewrite ?elem_of_elements; try apply NoDup_elements. } intros y; rewrite elem_of_elements, elem_of_union, elem_of_singleton. by rewrite elem_of_cons, elem_of_elements. Qed. Lemma elements_singleton x : elements {[ x ]} = [x]. Proof. apply Permutation_singleton. by rewrite <-(right_id ∅ (∪) {[x]}), `````` Robbert Krebbers committed Feb 17, 2016 44 `````` elements_union_singleton, elements_empty by set_solver. `````` Robbert Krebbers committed Feb 17, 2016 45 46 47 48 49 50 51 ``````Qed. Lemma elements_contains X Y : X ⊆ Y → elements X `contains` elements Y. Proof. intros; apply NoDup_contains; auto using NoDup_elements. intros x. rewrite !elem_of_elements; auto. Qed. `````` Robbert Krebbers committed Nov 18, 2015 52 ``````Global Instance collection_size_proper: Proper ((≡) ==> (=)) (@size C _). `````` Robbert Krebbers committed Oct 19, 2012 53 ``````Proof. intros ?? E. apply Permutation_length. by rewrite E. Qed. `````` Robbert Krebbers committed Nov 12, 2012 54 ``````Lemma size_empty : size (∅ : C) = 0. `````` Robbert Krebbers committed Feb 17, 2016 55 ``````Proof. unfold size, collection_size. simpl. by rewrite elements_empty. Qed. `````` Robbert Krebbers committed Nov 12, 2012 56 ``````Lemma size_empty_inv (X : C) : size X = 0 → X ≡ ∅. `````` Robbert Krebbers committed Jun 11, 2012 57 ``````Proof. `````` Robbert Krebbers committed Dec 11, 2015 58 59 `````` intros; apply equiv_empty; intros x; rewrite <-elem_of_elements. by rewrite (nil_length_inv (elements X)), ?elem_of_nil. `````` Robbert Krebbers committed Jun 11, 2012 60 ``````Qed. `````` Robbert Krebbers committed Nov 12, 2012 61 ``````Lemma size_empty_iff (X : C) : size X = 0 ↔ X ≡ ∅. `````` Robbert Krebbers committed Dec 11, 2015 62 ``````Proof. split. apply size_empty_inv. by intros ->; rewrite size_empty. Qed. `````` Robbert Krebbers committed Jan 05, 2013 63 64 ``````Lemma size_non_empty_iff (X : C) : size X ≠ 0 ↔ X ≢ ∅. Proof. by rewrite size_empty_iff. Qed. `````` Robbert Krebbers committed Nov 12, 2012 65 ``````Lemma size_singleton (x : A) : size {[ x ]} = 1. `````` Robbert Krebbers committed Feb 17, 2016 66 ``````Proof. unfold size, collection_size. simpl. by rewrite elements_singleton. Qed. `````` Robbert Krebbers committed Jun 11, 2012 67 68 ``````Lemma size_singleton_inv X x y : size X = 1 → x ∈ X → y ∈ X → x = y. Proof. `````` Robbert Krebbers committed Jun 05, 2014 69 `````` unfold size, collection_size. simpl. rewrite <-!elem_of_elements. `````` Robbert Krebbers committed Feb 17, 2016 70 `````` generalize (elements X). intros [|? l]; intro; simplify_eq/=. `````` Robbert Krebbers committed Dec 11, 2015 71 `````` rewrite (nil_length_inv l), !elem_of_list_singleton by done; congruence. `````` Robbert Krebbers committed Jun 11, 2012 72 ``````Qed. `````` Robbert Krebbers committed Jun 05, 2014 73 ``````Lemma collection_choose_or_empty X : (∃ x, x ∈ X) ∨ X ≡ ∅. `````` Robbert Krebbers committed Oct 19, 2012 74 ``````Proof. `````` Robbert Krebbers committed Jun 05, 2014 75 `````` destruct (elements X) as [|x l] eqn:HX; [right|left]. `````` Robbert Krebbers committed Feb 17, 2016 76 77 `````` - apply equiv_empty; intros x. by rewrite <-elem_of_elements, HX, elem_of_nil. - exists x. rewrite <-elem_of_elements, HX. by left. `````` Robbert Krebbers committed Oct 19, 2012 78 ``````Qed. `````` Robbert Krebbers committed Jun 05, 2014 79 80 81 82 ``````Lemma collection_choose X : X ≢ ∅ → ∃ x, x ∈ X. Proof. intros. by destruct (collection_choose_or_empty X). Qed. Lemma collection_choose_L `{!LeibnizEquiv C} X : X ≠ ∅ → ∃ x, x ∈ X. Proof. unfold_leibniz. apply collection_choose. Qed. `````` Robbert Krebbers committed May 11, 2013 83 ``````Lemma size_pos_elem_of X : 0 < size X → ∃ x, x ∈ X. `````` Robbert Krebbers committed Aug 29, 2012 84 ``````Proof. `````` Robbert Krebbers committed Jun 05, 2014 85 86 `````` intros Hsz. destruct (collection_choose_or_empty X) as [|HX]; [done|]. contradict Hsz. rewrite HX, size_empty; lia. `````` Robbert Krebbers committed Jun 11, 2012 87 ``````Qed. `````` Robbert Krebbers committed May 11, 2013 88 ``````Lemma size_1_elem_of X : size X = 1 → ∃ x, X ≡ {[ x ]}. `````` Robbert Krebbers committed Jun 11, 2012 89 ``````Proof. `````` Robbert Krebbers committed May 11, 2013 90 91 `````` intros E. destruct (size_pos_elem_of X); auto with lia. exists x. apply elem_of_equiv. split. `````` Robbert Krebbers committed Feb 17, 2016 92 `````` - rewrite elem_of_singleton. eauto using size_singleton_inv. `````` Robbert Krebbers committed Feb 17, 2016 93 `````` - set_solver. `````` Robbert Krebbers committed Jun 11, 2012 94 ``````Qed. `````` Robbert Krebbers committed Mar 23, 2016 95 ``````Lemma size_union X Y : X ⊥ Y → size (X ∪ Y) = size X + size Y. `````` Robbert Krebbers committed Jun 11, 2012 96 ``````Proof. `````` Robbert Krebbers committed Mar 23, 2016 97 `````` intros. unfold size, collection_size. simpl. rewrite <-app_length. `````` Robbert Krebbers committed Jun 11, 2012 98 `````` apply Permutation_length, NoDup_Permutation. `````` Robbert Krebbers committed Feb 17, 2016 99 100 `````` - apply NoDup_elements. - apply NoDup_app; repeat split; try apply NoDup_elements. `````` Robbert Krebbers committed Feb 17, 2016 101 `````` intros x; rewrite !elem_of_elements; set_solver. `````` Robbert Krebbers committed Feb 17, 2016 102 `````` - intros. by rewrite elem_of_app, !elem_of_elements, elem_of_union. `````` Robbert Krebbers committed Jun 11, 2012 103 ``````Qed. `````` Robbert Krebbers committed Jul 22, 2016 104 `````` `````` Robbert Krebbers committed Oct 19, 2012 105 106 ``````Instance elem_of_dec_slow (x : A) (X : C) : Decision (x ∈ X) | 100. Proof. `````` Robbert Krebbers committed Nov 12, 2012 107 `````` refine (cast_if (decide_rel (∈) x (elements X))); `````` Robbert Krebbers committed Jun 05, 2014 108 `````` by rewrite <-(elem_of_elements _). `````` Robbert Krebbers committed Oct 19, 2012 109 ``````Defined. `````` Robbert Krebbers committed Jun 11, 2012 110 ``````Lemma size_union_alt X Y : size (X ∪ Y) = size X + size (Y ∖ X). `````` Robbert Krebbers committed Aug 29, 2012 111 ``````Proof. `````` Robbert Krebbers committed Feb 17, 2016 112 113 114 `````` rewrite <-size_union by set_solver. setoid_replace (Y ∖ X) with ((Y ∪ X) ∖ X) by set_solver. rewrite <-union_difference, (comm (∪)); set_solver. `````` Robbert Krebbers committed Jun 11, 2012 115 116 ``````Qed. Lemma subseteq_size X Y : X ⊆ Y → size X ≤ size Y. `````` Robbert Krebbers committed May 11, 2013 117 ``````Proof. intros. rewrite (union_difference X Y), size_union_alt by done. lia. Qed. `````` Robbert Krebbers committed Jan 05, 2013 118 ``````Lemma subset_size X Y : X ⊂ Y → size X < size Y. `````` Robbert Krebbers committed Jun 11, 2012 119 ``````Proof. `````` Robbert Krebbers committed Feb 17, 2016 120 `````` intros. rewrite (union_difference X Y) by set_solver. `````` Robbert Krebbers committed Jan 05, 2013 121 122 123 `````` rewrite size_union_alt, difference_twice. cut (size (Y ∖ X) ≠ 0); [lia |]. by apply size_non_empty_iff, non_empty_difference. `````` Robbert Krebbers committed Jun 11, 2012 124 ``````Qed. `````` Robbert Krebbers committed Aug 12, 2013 125 ``````Lemma collection_wf : wf (strict (@subseteq C _)). `````` Robbert Krebbers committed Aug 21, 2013 126 ``````Proof. apply (wf_projected (<) size); auto using subset_size, lt_wf. Qed. `````` Robbert Krebbers committed Jun 11, 2012 127 ``````Lemma collection_ind (P : C → Prop) : `````` Robbert Krebbers committed Aug 29, 2012 128 `````` Proper ((≡) ==> iff) P → `````` Robbert Krebbers committed May 11, 2013 129 `````` P ∅ → (∀ x X, x ∉ X → P X → P ({[ x ]} ∪ X)) → ∀ X, P X. `````` Robbert Krebbers committed Jun 11, 2012 130 ``````Proof. `````` Robbert Krebbers committed Jan 05, 2013 131 132 `````` intros ? Hemp Hadd. apply well_founded_induction with (⊂). { apply collection_wf. } `````` Robbert Krebbers committed Jun 05, 2014 133 `````` intros X IH. destruct (collection_choose_or_empty X) as [[x ?]|HX]. `````` Robbert Krebbers committed Feb 17, 2016 134 135 `````` - rewrite (union_difference {[ x ]} X) by set_solver. apply Hadd. set_solver. apply IH; set_solver. `````` Robbert Krebbers committed Feb 17, 2016 136 `````` - by rewrite HX. `````` Robbert Krebbers committed Jun 11, 2012 137 138 139 ``````Qed. Lemma collection_fold_ind {B} (P : B → C → Prop) (f : A → B → B) (b : B) : Proper ((=) ==> (≡) ==> iff) P → `````` Robbert Krebbers committed Jun 17, 2013 140 `````` P b ∅ → (∀ x X r, x ∉ X → P r X → P (f x r) ({[ x ]} ∪ X)) → `````` Robbert Krebbers committed Aug 21, 2012 141 `````` ∀ X, P (collection_fold f b X) X. `````` Robbert Krebbers committed Jun 11, 2012 142 143 ``````Proof. intros ? Hemp Hadd. `````` Robbert Krebbers committed Nov 12, 2012 144 `````` cut (∀ l, NoDup l → ∀ X, (∀ x, x ∈ X ↔ x ∈ l) → P (foldr f b l) X). `````` Robbert Krebbers committed Jun 05, 2014 145 146 `````` { intros help ?. apply help; [apply NoDup_elements|]. symmetry. apply elem_of_elements. } `````` Robbert Krebbers committed Jan 05, 2013 147 `````` induction 1 as [|x l ?? IH]; simpl. `````` Robbert Krebbers committed Feb 17, 2016 148 `````` - intros X HX. setoid_rewrite elem_of_nil in HX. `````` Robbert Krebbers committed Feb 17, 2016 149 `````` rewrite equiv_empty. done. set_solver. `````` Robbert Krebbers committed Feb 17, 2016 150 `````` - intros X HX. setoid_rewrite elem_of_cons in HX. `````` Robbert Krebbers committed Feb 17, 2016 151 152 `````` rewrite (union_difference {[ x ]} X) by set_solver. apply Hadd. set_solver. apply IH. set_solver. `````` Robbert Krebbers committed Jun 11, 2012 153 ``````Qed. `````` Robbert Krebbers committed May 07, 2013 154 155 ``````Lemma collection_fold_proper {B} (R : relation B) `{!Equivalence R} (f : A → B → B) (b : B) `{!Proper ((=) ==> R ==> R) f} `````` Robbert Krebbers committed Nov 12, 2012 156 `````` (Hf : ∀ a1 a2 b, R (f a1 (f a2 b)) (f a2 (f a1 b))) : `````` Robbert Krebbers committed Nov 18, 2015 157 `````` Proper ((≡) ==> R) (collection_fold f b : C → B). `````` Robbert Krebbers committed May 11, 2013 158 ``````Proof. intros ?? E. apply (foldr_permutation R f b); auto. by rewrite E. Qed. `````` Robbert Krebbers committed May 07, 2013 159 160 ``````Global Instance set_Forall_dec `(P : A → Prop) `{∀ x, Decision (P x)} X : Decision (set_Forall P X) | 100. `````` Robbert Krebbers committed Oct 19, 2012 161 162 ``````Proof. refine (cast_if (decide (Forall P (elements X)))); `````` Robbert Krebbers committed Jun 05, 2014 163 `````` abstract (unfold set_Forall; setoid_rewrite <-elem_of_elements; `````` Robbert Krebbers committed Nov 12, 2012 164 `````` by rewrite <-Forall_forall). `````` Robbert Krebbers committed Oct 19, 2012 165 ``````Defined. `````` Robbert Krebbers committed May 07, 2013 166 167 ``````Global Instance set_Exists_dec `(P : A → Prop) `{∀ x, Decision (P x)} X : Decision (set_Exists P X) | 100. `````` Robbert Krebbers committed Oct 19, 2012 168 169 ``````Proof. refine (cast_if (decide (Exists P (elements X)))); `````` Robbert Krebbers committed Jun 05, 2014 170 `````` abstract (unfold set_Exists; setoid_rewrite <-elem_of_elements; `````` Robbert Krebbers committed Nov 12, 2012 171 `````` by rewrite <-Exists_exists). `````` Robbert Krebbers committed Oct 19, 2012 172 ``````Defined. `````` Robbert Krebbers committed Aug 21, 2012 173 ``````Global Instance rel_elem_of_dec `{∀ x y, Decision (R x y)} x X : `````` Robbert Krebbers committed May 07, 2013 174 `````` Decision (elem_of_upto R x X) | 100 := decide (set_Exists (R x) X). `````` Robbert Krebbers committed Jun 11, 2012 175 ``End fin_collection.``