From 5a8b5510d0b2d6dd1086658f97ce4f2186eced22 Mon Sep 17 00:00:00 2001
From: Enrico Tassi <enrico.tassi@inria.fr>
Date: Mon, 12 Nov 2007 16:38:46 +0000
Subject: [PATCH] removed dust

---
 matita/dama/ordered_sets.ma | 281 +-----------------------------------
 1 file changed, 1 insertion(+), 280 deletions(-)

diff --git a/matita/dama/ordered_sets.ma b/matita/dama/ordered_sets.ma
index b8c6952c7..fe16db53f 100644
--- a/matita/dama/ordered_sets.ma
+++ b/matita/dama/ordered_sets.ma
@@ -111,286 +111,7 @@ lapply (exc_coreflexive E) as r; unfold coreflexive in r;
 |2: lapply (c ?? x H2) as H3; cases H3 (H4 H4); [right; assumption|cases (Lxy H4)]]
 qed.
 
-theorem mah: ∀E:excedence.∀a,b:E. (a < b) → (b ≰ a).
+theorem lt_to_excede: ∀E:excedence.∀a,b:E. (a < b) → (b ≰ a).
 intros (E a b Lab); cases Lab (LEab Aab);
 cases Aab (H H); [cases (LEab H)] fold normalize (b ≰ a); assumption; (* BUG *)  
 qed.
-
--- altro file
-opposto TH è assioma per ordine totale.
-
--- 
-
-
-
-
-
-
-
-record is_order_relation (C:Type) (le:C→C→Prop) (eq:C→C→Prop) : Type ≝ { 
-  or_reflexive: reflexive ? le;
-  or_transitive: transitive ? le;
-  or_antisimmetric: antisymmetric ? le eq
-}.
-
-record ordered_set: Type ≝ { 
-  os_carr:> excedence;
-  os_order_relation_properties:> is_order_relation ? (le os_carr) (apart os_carr)
-}.
-
-ordered_set.
-
-E
-
-E
-
-theorem antisimmetric_to_cotransitive_to_transitive:
- ∀C.∀le:relation C. antisimmetric ? le → cotransitive ? le →
-  transitive ? le.
- intros;
- unfold transitive;
- intros;
- elim (c ? ? z H1);
-  [ assumption
-  | rewrite < (H ? ? H2 t);
-    assumption
-  ].
-qed.
-
-definition is_increasing ≝ λO:ordered_set.λa:nat→O.∀n:nat.a n ≤ a (S n).
-definition is_decreasing ≝ λO:ordered_set.λa:nat→O.∀n:nat.a (S n) ≤ a n.
-
-definition is_upper_bound ≝ λO:ordered_set.λa:nat→O.λu:O.∀n:nat.a n ≤ u.
-definition is_lower_bound ≝ λO:ordered_set.λa:nat→O.λu:O.∀n:nat.u ≤ a n.
-
-record is_sup (O:ordered_set) (a:nat→O) (u:O) : Prop ≝
- { sup_upper_bound: is_upper_bound O a u; 
-   sup_least_upper_bound: ∀v:O. is_upper_bound O a v → u≤v
- }.
-
-record is_inf (O:ordered_set) (a:nat→O) (u:O) : Prop ≝
- { inf_lower_bound: is_lower_bound O a u; 
-   inf_greatest_lower_bound: ∀v:O. is_lower_bound O a v → v≤u
- }.
-
-record is_bounded_below (O:ordered_set) (a:nat→O) : Type ≝
- { ib_lower_bound: O;
-   ib_lower_bound_is_lower_bound: is_lower_bound ? a ib_lower_bound
- }.
-
-record is_bounded_above (O:ordered_set) (a:nat→O) : Type ≝
- { ib_upper_bound: O;
-   ib_upper_bound_is_upper_bound: is_upper_bound ? a ib_upper_bound
- }.
-
-record is_bounded (O:ordered_set) (a:nat→O) : Type ≝
- { ib_bounded_below:> is_bounded_below ? a;
-   ib_bounded_above:> is_bounded_above ? a
- }.
-
-record bounded_below_sequence (O:ordered_set) : Type ≝
- { bbs_seq:1> nat→O;
-   bbs_is_bounded_below:> is_bounded_below ? bbs_seq
- }.
-
-record bounded_above_sequence (O:ordered_set) : Type ≝
- { bas_seq:1> nat→O;
-   bas_is_bounded_above:> is_bounded_above ? bas_seq
- }.
-
-record bounded_sequence (O:ordered_set) : Type ≝
- { bs_seq:1> nat → O;
-   bs_is_bounded_below: is_bounded_below ? bs_seq;
-   bs_is_bounded_above: is_bounded_above ? bs_seq
- }.
-
-definition bounded_below_sequence_of_bounded_sequence ≝
- λO:ordered_set.λb:bounded_sequence O.
-  mk_bounded_below_sequence ? b (bs_is_bounded_below ? b).
-
-coercion cic:/matita/ordered_sets/bounded_below_sequence_of_bounded_sequence.con.
-
-definition bounded_above_sequence_of_bounded_sequence ≝
- λO:ordered_set.λb:bounded_sequence O.
-  mk_bounded_above_sequence ? b (bs_is_bounded_above ? b).
-
-coercion cic:/matita/ordered_sets/bounded_above_sequence_of_bounded_sequence.con.
-
-definition lower_bound ≝
- λO:ordered_set.λb:bounded_below_sequence O.
-  ib_lower_bound ? b (bbs_is_bounded_below ? b).
-
-lemma lower_bound_is_lower_bound:
- ∀O:ordered_set.∀b:bounded_below_sequence O.
-  is_lower_bound ? b (lower_bound ? b).
- intros;
- unfold lower_bound;
- apply ib_lower_bound_is_lower_bound.
-qed.
-
-definition upper_bound ≝
- λO:ordered_set.λb:bounded_above_sequence O.
-  ib_upper_bound ? b (bas_is_bounded_above ? b).
-
-lemma upper_bound_is_upper_bound:
- ∀O:ordered_set.∀b:bounded_above_sequence O.
-  is_upper_bound ? b (upper_bound ? b).
- intros;
- unfold upper_bound;
- apply ib_upper_bound_is_upper_bound.
-qed.
-
-definition lt ≝ λO:ordered_set.λa,b:O.a ≤ b ∧ a ≠ b.
-
-interpretation "Ordered set lt" 'lt a b =
- (cic:/matita/ordered_sets/lt.con _ a b).
-
-definition reverse_ordered_set: ordered_set → ordered_set.
- intros;
- apply mk_ordered_set;
-  [2:apply (λx,y:o.y ≤ x)
-  | skip
-  | apply mk_is_order_relation;
-     [ simplify;
-       intros;
-       apply (or_reflexive ? ? o)
-     | simplify;
-       intros;
-       apply (or_transitive ? ? o);
-        [2: apply H1
-        | skip
-        | assumption
-        ] 
-     | simplify;
-       intros;
-       apply (or_antisimmetric ? ? o);
-       assumption
-     ]
-  ].
-qed.
- 
-interpretation "Ordered set ge" 'geq a b =
- (cic:/matita/ordered_sets/os_le.con _
-  (cic:/matita/ordered_sets/os_pre_ordered_set.con _
-   (cic:/matita/ordered_sets/reverse_ordered_set.con _ _)) a b).
-
-lemma is_lower_bound_reverse_is_upper_bound:
- ∀O:ordered_set.∀a:nat→O.∀l:O.
-  is_lower_bound O a l → is_upper_bound (reverse_ordered_set O) a l.
- intros;
- unfold;
- intro;
- unfold;
- unfold reverse_ordered_set;
- simplify;
- apply H.
-qed.
-
-lemma is_upper_bound_reverse_is_lower_bound:
- ∀O:ordered_set.∀a:nat→O.∀l:O.
-  is_upper_bound O a l → is_lower_bound (reverse_ordered_set O) a l.
- intros;
- unfold;
- intro;
- unfold;
- unfold reverse_ordered_set;
- simplify;
- apply H.
-qed.
-
-lemma reverse_is_lower_bound_is_upper_bound:
- ∀O:ordered_set.∀a:nat→O.∀l:O.
-  is_lower_bound (reverse_ordered_set O) a l → is_upper_bound O a l.
- intros;
- unfold in H;
- unfold reverse_ordered_set in H;
- apply H.
-qed.
-
-lemma reverse_is_upper_bound_is_lower_bound:
- ∀O:ordered_set.∀a:nat→O.∀l:O.
-  is_upper_bound (reverse_ordered_set O) a l → is_lower_bound O a l.
- intros;
- unfold in H;
- unfold reverse_ordered_set in H;
- apply H.
-qed.
-
-
-lemma is_inf_to_reverse_is_sup:
- ∀O:ordered_set.∀a:bounded_below_sequence O.∀l:O.
-  is_inf O a l → is_sup (reverse_ordered_set O) a l.
- intros;
- apply (mk_is_sup (reverse_ordered_set O));
-  [ apply is_lower_bound_reverse_is_upper_bound;
-    apply inf_lower_bound;
-    assumption
-  | intros;
-    change in v with (os_carrier O);
-    change with (v ≤ l);
-    apply (inf_greatest_lower_bound ? ? ? H);
-    apply reverse_is_upper_bound_is_lower_bound;
-    assumption
-  ].
-qed.
- 
-lemma is_sup_to_reverse_is_inf:
- ∀O:ordered_set.∀a:bounded_above_sequence O.∀l:O.
-  is_sup O a l → is_inf (reverse_ordered_set O) a l.
- intros;
- apply (mk_is_inf (reverse_ordered_set O));
-  [ apply is_upper_bound_reverse_is_lower_bound;
-    apply sup_upper_bound;
-    assumption
-  | intros;
-    change in v with (os_carrier O);
-    change with (l ≤ v);
-    apply (sup_least_upper_bound ? ? ? H);
-    apply reverse_is_lower_bound_is_upper_bound;
-    assumption
-  ].
-qed.
-
-lemma reverse_is_sup_to_is_inf:
- ∀O:ordered_set.∀a:bounded_above_sequence O.∀l:O.
-  is_sup (reverse_ordered_set O) a l → is_inf O a l.
- intros;
- apply mk_is_inf;
-  [ apply reverse_is_upper_bound_is_lower_bound;
-    change in l with (os_carrier (reverse_ordered_set O));
-    apply sup_upper_bound;
-    assumption
-  | intros;
-    change in l with (os_carrier (reverse_ordered_set O));
-    change in v with (os_carrier (reverse_ordered_set O));
-    change with (os_le (reverse_ordered_set O) l v);
-    apply (sup_least_upper_bound ? ? ? H);
-    change in v with (os_carrier O);
-    apply is_lower_bound_reverse_is_upper_bound;
-    assumption
-  ].
-qed.
-
-lemma reverse_is_inf_to_is_sup:
- ∀O:ordered_set.∀a:bounded_above_sequence O.∀l:O.
-  is_inf (reverse_ordered_set O) a l → is_sup O a l.
- intros;
- apply mk_is_sup;
-  [ apply reverse_is_lower_bound_is_upper_bound;
-    change in l with (os_carrier (reverse_ordered_set O));
-    apply (inf_lower_bound ? ? ? H)
-  | intros;
-    change in l with (os_carrier (reverse_ordered_set O));
-    change in v with (os_carrier (reverse_ordered_set O));
-    change with (os_le (reverse_ordered_set O) v l);
-    apply (inf_greatest_lower_bound ? ? ? H);
-    change in v with (os_carrier O);
-    apply is_upper_bound_reverse_is_lower_bound;
-    assumption
-  ].
-qed.
-
-record cotransitively_ordered_set: Type :=
- { cos_ordered_set :> ordered_set;
-   cos_cotransitive: cotransitive ? (os_le cos_ordered_set)
- }.
-- 
2.39.2