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more notation moved to core notation, unification of duplicated CProp connectives
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2 (*       ___                                                              *)
3 (*      ||M||                                                             *)
4 (*      ||A||       A project by Andrea Asperti                           *)
5 (*      ||T||                                                             *)
6 (*      ||I||       Developers:                                           *)
7 (*      ||T||         The HELM team.                                      *)
8 (*      ||A||         http://helm.cs.unibo.it                             *)
9 (*      \   /                                                             *)
10 (*       \ /        This file is distributed under the terms of the       *)
11 (*        v         GNU General Public License Version 2                  *)
12 (*                                                                        *)
13 (**************************************************************************)
14
15 include "algebra/semigroups.ma".
16
17 record PreMonoid : Type ≝
18  { magma:> Magma;
19    e: magma
20  }.
21
22 record isMonoid (M:PreMonoid) : Prop ≝
23  { is_semi_group:> isSemiGroup M;
24    e_is_left_unit:
25     is_left_unit (mk_SemiGroup ? is_semi_group) (e M);
26    e_is_right_unit:
27     is_right_unit (mk_SemiGroup ? is_semi_group) (e M)
28  }.
29  
30 record Monoid : Type ≝
31  { premonoid:> PreMonoid;
32    monoid_properties:> isMonoid premonoid 
33  }.
34
35 interpretation "Monoid unit" 'neutral = (e _).
36   
37 definition is_left_inverse ≝
38  λM:Monoid.
39   λopp: M → M.
40    ∀x:M. (opp x)·x = ⅇ.
41    
42 definition is_right_inverse ≝
43  λM:Monoid.
44   λopp: M → M.
45    ∀x:M. x·(opp x) = ⅇ.
46
47 theorem is_left_inverse_to_is_right_inverse_to_eq:
48  ∀M:Monoid. ∀l,r.
49   is_left_inverse M l → is_right_inverse M r → 
50    ∀x:M. l x = r x.
51  intros;
52  generalize in match (H x); intro;
53  generalize in match (eq_f ? ? (λy.y·(r x)) ? ? H2);
54  simplify; fold simplify (op M);
55  intro; clear H2;
56  generalize in match (op_associative ? (is_semi_group ? (monoid_properties M)));
57  intro;
58  rewrite > H2 in H3; clear H2;
59  rewrite > H1 in H3;
60  rewrite > (e_is_left_unit ? (monoid_properties M)) in H3;
61  rewrite > (e_is_right_unit ? (monoid_properties M)) in H3;
62  assumption.
63 qed.