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4 (* ||A|| A project by Andrea Asperti *)
6 (* ||I|| Developers: *)
7 (* ||T|| The HELM team. *)
8 (* ||A|| http://helm.cs.unibo.it *)
10 (* \ / This file is distributed under the terms of the *)
11 (* v GNU General Public License Version 2 *)
13 (**************************************************************************)
15 include "formal_topology/subsets.ma".
17 record binary_relation (A,B: SET) : Type[1] ≝
18 { satisfy:> binary_morphism1 A B CPROP }.
20 notation < "hvbox (x \nbsp \natur term 90 r \nbsp y)" with precedence 45 for @{'satisfy $r $x $y}.
21 notation > "hvbox (x \natur term 90 r y)" with precedence 45 for @{'satisfy $r $x $y}.
22 interpretation "relation applied" 'satisfy r x y = (fun21 ??? (satisfy ?? r) x y).
24 definition binary_relation_setoid: SET → SET → setoid1.
27 [ apply (binary_relation A B)
29 [ apply (λA,B.λr,r': binary_relation A B. ∀x,y. r x y ↔ r' x y)
30 | simplify; intros 3; split; intro; assumption
31 | simplify; intros 5; split; intro;
32 [ apply (fi ?? (f ??)) | apply (if ?? (f ??))] assumption
33 | simplify; intros 7; split; intro;
34 [ apply (if ?? (f1 ??)) | apply (fi ?? (f ??)) ]
35 [ apply (if ?? (f ??)) | apply (fi ?? (f1 ??)) ]
39 definition binary_relation_of_binary_relation_setoid :
40 ∀A,B.binary_relation_setoid A B → binary_relation A B ≝ λA,B,c.c.
41 coercion binary_relation_of_binary_relation_setoid.
43 definition composition:
45 (binary_relation_setoid A B) × (binary_relation_setoid B C) ⇒_1 (binary_relation_setoid A C).
51 [ apply (λs1:A.λs3:C.∃s2:B. s1 ♮R12 s2 ∧ s2 ♮R23 s3);
53 split; intro; cases e2 (w H3); clear e2; exists; [1,3: apply w ]
54 [ apply (. (e^-1‡#)‡(#‡e1^-1)); assumption
55 | apply (. (e‡#)‡(#‡e1)); assumption]]
56 | intros 8; split; intro H2; simplify in H2 ⊢ %;
57 cases H2 (w H3); clear H2; exists [1,3: apply w] cases H3 (H2 H4); clear H3;
58 [ lapply (if ?? (e x w) H2) | lapply (fi ?? (e x w) H2) ]
59 [ lapply (if ?? (e1 w y) H4)| lapply (fi ?? (e1 w y) H4) ]
60 exists; try assumption;
64 definition REL: category1.
67 | intros (T T1); apply (binary_relation_setoid T T1)
68 | intros; constructor 1;
69 constructor 1; unfold setoid1_of_setoid; simplify;
70 [ (* changes required to avoid universe inconsistency *)
71 change with (carr o → carr o → CProp); intros; apply (eq ? c c1)
72 | intros; split; intro; change in a a' b b' with (carr o);
73 change in e with (eq ? a a'); change in e1 with (eq ? b b');
74 [ apply (.= (e ^ -1));
83 cases f (w H); clear f; cases H; clear H;
84 [cases f (w1 H); clear f | cases f1 (w1 H); clear f1]
86 exists; try assumption;
87 split; try assumption;
88 exists; try assumption;
90 |6,7: intros 5; unfold composition; simplify; split; intro;
91 unfold setoid1_of_setoid in x y; simplify in x y;
92 [1,3: cases e (w H1); clear e; cases H1; clear H1; unfold;
93 [ apply (. (e : eq1 ? x w)‡#); assumption
94 | apply (. #‡(e : eq1 ? w y)^-1); assumption]
95 |2,4: exists; try assumption; split;
96 (* change required to avoid universe inconsistency *)
97 change in x with (carr o1); change in y with (carr o2);
98 first [apply refl | assumption]]]
101 definition setoid_of_REL : objs1 REL → setoid ≝ λx.x.
102 coercion setoid_of_REL.
104 definition binary_relation_setoid_of_arrow1_REL :
105 ∀P,Q. arrows1 REL P Q → binary_relation_setoid P Q ≝ λP,Q,x.x.
106 coercion binary_relation_setoid_of_arrow1_REL.
109 notation > "B ⇒_\r1 C" right associative with precedence 72 for @{'arrows1_REL $B $C}.
110 notation "B ⇒\sub (\r 1) C" right associative with precedence 72 for @{'arrows1_REL $B $C}.
111 interpretation "'arrows1_REL" 'arrows1_REL A B = (arrows1 REL A B).
112 notation > "B ⇒_\r2 C" right associative with precedence 72 for @{'arrows2_REL $B $C}.
113 notation "B ⇒\sub (\r 2) C" right associative with precedence 72 for @{'arrows2_REL $B $C}.
114 interpretation "'arrows2_REL" 'arrows2_REL A B = (arrows2 (category2_of_category1 REL) A B).
117 definition full_subset: ∀s:REL. Ω^s.
118 apply (λs.{x | True});
119 intros; simplify; split; intro; assumption.
122 coercion full_subset.
124 definition comprehension: ∀b:REL. (b ⇒_1. CPROP) → Ω^b.
125 apply (λb:REL. λP: b ⇒_1 CPROP. {x | P x});
127 apply (.= †e); apply refl1.
130 interpretation "subset comprehension" 'comprehension s p =
131 (comprehension s (mk_unary_morphism1 ?? p ?)).
133 definition ext: ∀X,S:REL. (X ⇒_\r1 S) × S ⇒_1 (Ω^X).
134 intros (X S); constructor 1;
135 [ apply (λr:X ⇒_\r1 S.λf:S.{x ∈ X | x ♮r f}); intros; simplify; apply (.= (e‡#)); apply refl1
136 | intros; simplify; split; intros; simplify;
137 [ change with (∀x. x ♮a b → x ♮a' b'); intros;
138 apply (. (#‡e1^-1)); whd in e; apply (if ?? (e ??)); assumption
139 | change with (∀x. x ♮a' b' → x ♮a b); intros;
140 apply (. (#‡e1)); whd in e; apply (fi ?? (e ??));assumption]]
143 definition extS: ∀X,S:REL. ∀r:X ⇒_\r1 S. Ω^S ⇒_1 Ω^X.
144 (* ∃ is not yet a morphism apply (λX,S,r,F.{x ∈ X | ∃a. a ∈ F ∧ x ♮r a});*)
145 intros (X S r); constructor 1;
146 [ intro F; constructor 1; constructor 1;
147 [ apply (λx. x ∈ X ∧ ∃a:S. a ∈ F ∧ x ♮r a);
148 | intros; split; intro; cases f (H1 H2); clear f; split;
149 [ apply (. (e^-1‡#)); assumption
150 |3: apply (. (e‡#)); assumption
151 |2,4: cases H2 (w H3); exists; [1,3: apply w]
152 [ apply (. (#‡(e^-1‡#))); assumption
153 | apply (. (#‡(e‡#))); assumption]]]
154 | intros; split; simplify; intros; cases f; cases e1; split;
156 |2,4: exists; [1,3: apply w]
157 [ apply (. (#‡e^-1)‡#); assumption
158 | apply (. (#‡e)‡#); assumption]]]
161 lemma equalset_extS_id_X_X: ∀o:REL.∀X.extS ?? (id1 ? o) X = X.
163 unfold extS; simplify;
165 [ intros 2; change with (a ∈ X);
169 change in f2 with (eq1 ? a w);
170 apply (. (f2\sup -1‡#));
172 | intros 2; change in f with (a ∈ X);
175 | exists; [ apply a ]
178 | change with (a = a); apply refl]]]
181 lemma extS_com: ∀o1,o2,o3,c1,c2,S. extS o1 o3 (c2 ∘ c1) S = extS o1 o2 c1 (extS o2 o3 c2 S).
182 intros; unfold extS; simplify; split; intros; simplify; intros;
183 [ cases f (H1 H2); cases H2 (w H3); clear f H2; split; [assumption]
184 cases H3 (H4 H5); cases H5 (w1 H6); clear H3 H5; cases H6 (H7 H8); clear H6;
185 exists; [apply w1] split [2: assumption] constructor 1; [assumption]
186 exists; [apply w] split; assumption
187 | cases f (H1 H2); cases H2 (w H3); clear f H2; split; [assumption]
188 cases H3 (H4 H5); cases H4 (w1 H6); clear H3 H4; cases H6 (w2 H7); clear H6;
189 cases H7; clear H7; exists; [apply w2] split; [assumption] exists [apply w] split;
194 (* the same as ⋄ for a basic pair *)
195 definition image: ∀U,V:REL. (U ⇒_\r1 V) ⇒_2 (Ω^U ⇒_2 Ω^V).
196 intros; constructor 1;
197 [ intro r; constructor 1;
198 [ apply (λS: Ω^U. {y | ∃x:U. x ♮r y ∧ x ∈ S });
199 intros; simplify; split; intro; cases e1; exists [1,3: apply w]
200 [ apply (. (#‡e^-1)‡#); assumption
201 | apply (. (#‡e)‡#); assumption]
203 [ intro y; simplify; intro yA; cases yA; exists; [ apply w ];
204 apply (. #‡(#‡e^-1)); assumption;
205 | intro y; simplify; intro yA; cases yA; exists; [ apply w ];
206 apply (. #‡(#‡e)); assumption;]]
207 | simplify; intros; intro y; simplify; split; simplify; intros (b H); cases H;
208 exists; [1,3: apply w]; cases x; split; try assumption;
209 [ apply (if ?? (e ??)); | apply (fi ?? (e ??)); ] assumption;]
212 (* the same as □ for a basic pair *)
213 definition minus_star_image: ∀U,V:REL. (U ⇒_\r1 V) ⇒_2 (Ω^U ⇒_2 Ω^V).
214 intros; constructor 1; intros;
216 [ apply (λS: Ω^U. {y | ∀x:U. x ♮c y → x ∈ S});
217 intros; simplify; split; intros; apply f;
218 [ apply (. #‡e); | apply (. #‡e ^ -1)] assumption;
219 | intros; split; intro; simplify; intros;
220 [ apply (. #‡e^-1);| apply (. #‡e); ] apply f; assumption;]
221 | intros; intro; simplify; split; simplify; intros; apply f;
222 [ apply (. (e x a2)); assumption | apply (. (e^-1 x a2)); assumption]]
225 (* the same as Rest for a basic pair *)
226 definition star_image: ∀U,V:REL. (U ⇒_\r1 V) ⇒_2 (Ω^V ⇒_2 Ω^U).
227 intros; constructor 1;
228 [ intro r; constructor 1;
229 [ apply (λS: Ω \sup V. {x | ∀y:V. x ♮r y → y ∈ S});
230 intros; simplify; split; intros; apply f;
231 [ apply (. e ‡#);| apply (. e^ -1‡#);] assumption;
232 | intros; split; simplify; intros;
233 [ apply (. #‡e^-1);| apply (. #‡e); ] apply f; assumption;]
234 | intros; intro; simplify; split; simplify; intros; apply f;
235 [ apply (. e a2 y); | apply (. e^-1 a2 y)] assumption;]
238 (* the same as Ext for a basic pair *)
239 definition minus_image: ∀U,V:REL. (U ⇒_\r1 V) ⇒_2 (Ω^V ⇒_2 Ω^U).
240 intros; constructor 1;
241 [ intro r; constructor 1;
242 [ apply (λS: Ω^V. {x | ∃y:V. x ♮r y ∧ y ∈ S }).
243 intros; simplify; split; intros; cases e1; cases x; exists; [1,3: apply w]
244 split; try assumption; [ apply (. (e^-1‡#)); | apply (. (e‡#));] assumption;
245 | intros; simplify; split; simplify; intros; cases e1; cases x;
246 exists [1,3: apply w] split; try assumption;
247 [ apply (. (#‡e^-1)); | apply (. (#‡e));] assumption]
248 | intros; intro; simplify; split; simplify; intros; cases e1; exists [1,3: apply w]
249 cases x; split; try assumption;
250 [ apply (. e^-1 a2 w); | apply (. e a2 w)] assumption;]
253 definition foo : ∀o1,o2:REL.carr1 (o1 ⇒_\r1 o2) → carr2 (setoid2_of_setoid1 (o1 ⇒_\r1 o2)) ≝ λo1,o2,x.x.
255 interpretation "relation f⎻*" 'OR_f_minus_star r = (fun12 ?? (minus_star_image ? ?) (foo ?? r)).
256 interpretation "relation f⎻" 'OR_f_minus r = (fun12 ?? (minus_image ? ?) (foo ?? r)).
257 interpretation "relation f*" 'OR_f_star r = (fun12 ?? (star_image ? ?) (foo ?? r)).
259 definition image_coercion: ∀U,V:REL. (U ⇒_\r1 V) → Ω^U ⇒_2 Ω^V.
260 intros (U V r Us); apply (image U V r); qed.
261 coercion image_coercion.
263 (* minus_image is the same as ext *)
265 theorem image_id: ∀o. (id1 REL o : carr2 (Ω^o ⇒_2 Ω^o)) =_1 (id2 SET1 Ω^o).
266 intros; unfold image_coercion; unfold image; simplify;
267 whd in match (?:carr2 ?);
268 intro U; simplify; split; simplify; intros;
269 [ change with (a ∈ U);
270 cases e; cases x; change in e1 with (w =_1 a); apply (. e1^-1‡#); assumption
271 | change in f with (a ∈ U);
272 exists; [apply a] split; [ change with (a = a); apply refl1 | assumption]]
275 theorem minus_star_image_id: ∀o:REL.
276 ((id1 REL o)⎻* : carr2 (Ω^o ⇒_2 Ω^o)) =_1 (id2 SET1 Ω^o).
277 intros; unfold minus_star_image; simplify; intro U; simplify;
278 split; simplify; intros;
279 [ change with (a ∈ U); apply f; change with (a=a); apply refl1
280 | change in f1 with (eq1 ? x a); apply (. f1‡#); apply f]
283 alias symbol "compose" (instance 5) = "category2 composition".
284 alias symbol "compose" (instance 4) = "category1 composition".
285 theorem image_comp: ∀A,B,C.∀r:B ⇒_\r1 C.∀s:A ⇒_\r1 B.
286 ((r ∘ s) : carr2 (Ω^A ⇒_2 Ω^C)) =_1 r ∘ s.
287 intros; intro U; split; intro x; (unfold image; unfold SET1; simplify);
289 cases x1; [cases f|cases f1]; exists; [1,3: apply w1] cases x2; split; try assumption;
290 exists; try assumption; split; assumption;
293 theorem minus_star_image_comp:
294 ∀A,B,C.∀r:B ⇒_\r1 C.∀s:A ⇒_\r1 B.
295 minus_star_image A C (r ∘ s) =_1 minus_star_image B C r ∘ (minus_star_image A B s).
296 intros; unfold minus_star_image; intro X; simplify; split; simplify; intros;
297 [ whd; intros; simplify; whd; intros; apply f; exists; try assumption; split; assumption;
298 | cases f1; cases x1; apply f; assumption]
308 ∀x. ext ?? (b∘a) x = extS ?? a (ext ?? b x).
310 unfold ext; unfold extS; simplify; split; intro; simplify; intros;
311 cases f; clear f; split; try assumption;
312 [ cases f2; clear f2; cases x1; clear x1; exists; [apply w] split;
313 [1: split] assumption;
314 | cases H; clear H; cases x1; clear x1; exists [apply w]; split;
315 [2: cases f] assumption]
319 axiom daemon : False.
321 theorem extS_singleton:
322 ∀o1,o2.∀a.∀x.extS o1 o2 a {(x)} = ext o1 o2 a x.
323 intros; unfold extS; unfold ext; unfold singleton; simplify;
324 split; intros 2; simplify; simplify in f;
325 [ cases f; cases e; cases x1; change in f2 with (x =_1 w); apply (. #‡f2); assumption;
326 | split; try apply I; exists [apply x] split; try assumption; change with (x = x); apply rule #;] qed.