Some more progress in the proof of the (ad-hoc ?) pigeonhole principle.

[helm.git] / helm / matita / library / algebra / groups.ma

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(*       ___                                                              *)
(*      ||M||                                                             *)
(*      ||A||       A project by Andrea Asperti                           *)
(*      ||T||                                                             *)
(*      ||I||       Developers:                                           *)
(*      ||T||         The HELM team.                                      *)
(*      ||A||         http://helm.cs.unibo.it                             *)
(*      \   /                                                             *)
(*       \ /        This file is distributed under the terms of the       *)
(*        v         GNU General Public License Version 2                  *)
(*                                                                        *)
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set "baseuri" "cic:/matita/algebra/groups/".

include "algebra/monoids.ma".
include "nat/le_arith.ma".
include "datatypes/bool.ma".
include "nat/compare.ma".

record PreGroup : Type ≝
 { premonoid:> PreMonoid;
   opp: premonoid -> premonoid
 }.

record isGroup (G:PreGroup) : Prop ≝
 { is_monoid: isMonoid G;
   opp_is_left_inverse: is_left_inverse (mk_Monoid ? is_monoid) (opp G);
   opp_is_right_inverse: is_right_inverse (mk_Monoid ? is_monoid) (opp G)
 }.
 
record Group : Type ≝
 { pregroup:> PreGroup;
   group_properties:> isGroup pregroup
 }.

(*notation < "G"
for @{ 'monoid $G }.

interpretation "Monoid coercion" 'monoid G =
 (cic:/matita/algebra/groups/monoid.con G).*)

notation < "G"
for @{ 'type_of_group $G }.

interpretation "Type_of_group coercion" 'type_of_group G =
 (cic:/matita/algebra/groups/Type_of_Group.con G).

notation < "G"
for @{ 'magma_of_group $G }.

interpretation "magma_of_group coercion" 'magma_of_group G =
 (cic:/matita/algebra/groups/Magma_of_Group.con G).

notation "hvbox(x \sup (-1))" with precedence 89
for @{ 'gopp $x }.

interpretation "Group inverse" 'gopp x =
 (cic:/matita/algebra/groups/opp.con _ x).

definition left_cancellable ≝
 λT:Type. λop: T -> T -> T.
  ∀x. injective ? ? (op x).
  
definition right_cancellable ≝
 λT:Type. λop: T -> T -> T.
  ∀x. injective ? ? (λz.op z x).
  
theorem eq_op_x_y_op_x_z_to_eq:
 ∀G:Group. left_cancellable G (op G).
intros;
unfold left_cancellable;
unfold injective;
intros (x y z);
rewrite < (e_is_left_unit ? (is_monoid ? (group_properties G)));
rewrite < (e_is_left_unit ? (is_monoid ? (group_properties G)) z);
rewrite < (opp_is_left_inverse ? (group_properties G) x);
rewrite > (associative ? (is_semi_group ? (is_monoid ? (group_properties G))));
rewrite > (associative ? (is_semi_group ? (is_monoid ? (group_properties G))));
apply eq_f;
assumption.
qed.


theorem eq_op_x_y_op_z_y_to_eq:
 ∀G:Group. right_cancellable G (op G).
intros;
unfold right_cancellable;
unfold injective;
simplify;fold simplify (op G); 
intros (x y z);
rewrite < (e_is_right_unit ? (is_monoid ? (group_properties G)));
rewrite < (e_is_right_unit ? (is_monoid ? (group_properties G)) z);
rewrite < (opp_is_right_inverse ? (group_properties G) x);
rewrite < (associative ? (is_semi_group ? (is_monoid ? (group_properties G))));
rewrite < (associative ? (is_semi_group ? (is_monoid ? (group_properties G))));
rewrite > H;
reflexivity.
qed.


record finite_enumerable (T:Type) : Type ≝
 { order: nat;
   repr: nat → T;
   index_of: T → nat;
   index_of_sur: ∀x.index_of x ≤ order;
   index_of_repr: ∀n. n≤order → index_of (repr n) = n;
   repr_index_of: ∀x. repr (index_of x) = x
 }.
 
notation "hvbox(C \sub i)" with precedence 89
for @{ 'repr $C $i }.

(* CSC: multiple interpretations in the same file are not considered in the
 right order
interpretation "Finite_enumerable representation" 'repr C i =
 (cic:/matita/algebra/groups/repr.con C _ i).*)
 
notation < "hvbox(|C|)" with precedence 89
for @{ 'card $C }.

interpretation "Finite_enumerable order" 'card C =
 (cic:/matita/algebra/groups/order.con C _).

record finite_enumerable_SemiGroup : Type ≝
 { semigroup:> SemiGroup;
   is_finite_enumerable:> finite_enumerable semigroup
 }.

notation < "S"
for @{ 'semigroup_of_finite_enumerable_semigroup $S }.

interpretation "Semigroup_of_finite_enumerable_semigroup"
 'semigroup_of_finite_enumerable_semigroup S
=
 (cic:/matita/algebra/groups/semigroup.con S).

notation < "S"
for @{ 'magma_of_finite_enumerable_semigroup $S }.

interpretation "Magma_of_finite_enumerable_semigroup"
 'magma_of_finite_enumerable_semigroup S
=
 (cic:/matita/algebra/groups/Magma_of_finite_enumerable_SemiGroup.con S).
 
notation < "S"
for @{ 'type_of_finite_enumerable_semigroup $S }.

interpretation "Type_of_finite_enumerable_semigroup"
 'type_of_finite_enumerable_semigroup S
=
 (cic:/matita/algebra/groups/Type_of_finite_enumerable_SemiGroup.con S).

interpretation "Finite_enumerable representation" 'repr S i =
 (cic:/matita/algebra/groups/repr.con S
  (cic:/matita/algebra/groups/is_finite_enumerable.con S) i).

notation "hvbox(ι e)" with precedence 60
for @{ 'index_of_finite_enumerable_semigroup $e }.

interpretation "Index_of_finite_enumerable representation"
 'index_of_finite_enumerable_semigroup e
=
 (cic:/matita/algebra/groups/index_of.con _
  (cic:/matita/algebra/groups/is_finite_enumerable.con _) e).


(* several definitions/theorems to be moved somewhere else *)

definition ltb ≝ λn,m. leb n m ∧ notb (eqb n m).

theorem not_eq_to_le_to_lt: ∀n,m. n≠m → n≤m → n<m.
intros;
elim (le_to_or_lt_eq ? ? H1);
[ assumption
| elim (H H2)
].
qed.

theorem ltb_to_Prop :
 ∀n,m.
  match ltb n m with
  [ true ⇒ n < m
  | false ⇒ n ≮ m
  ].
intros;
unfold ltb;
apply leb_elim;
apply eqb_elim;
intros;
simplify;
[ rewrite < H;
  apply le_to_not_lt;
  constructor 1
| apply (not_eq_to_le_to_lt ? ? H H1)
| rewrite < H;
  apply le_to_not_lt;
  constructor 1
| apply le_to_not_lt;
  generalize in match (not_le_to_lt ? ? H1);
  clear H1;
  intro;
  apply lt_to_le;
  assumption
].
qed.

theorem ltb_elim: \forall n,m:nat. \forall P:bool \to Prop.
(n < m \to (P true)) \to (n ≮ m \to (P false)) \to
P (ltb n m).
intros.
cut
(match (ltb n m) with
[ true  \Rightarrow n < m
| false \Rightarrow n ≮ m] \to (P (ltb n m))).
apply Hcut.apply ltb_to_Prop.
elim (ltb n m).
apply ((H H2)).
apply ((H1 H2)).
qed.

theorem Not_lt_n_n: ∀n. n ≮ n.
intro;
unfold Not;
intro;
unfold lt in H;
apply (not_le_Sn_n ? H).
qed.

theorem eq_pred_to_eq:
 ∀n,m. O < n → O < m → pred n = pred m → n = m.
intros 2;
elim n;
[ elim (Not_lt_n_n ? H)
| generalize in match H3;
  clear H3;
  generalize in match H2;
  clear H2;
  elim m;
  [ elim (Not_lt_n_n ? H2)
  | simplify in H4;
    apply (eq_f ? ? S);
    assumption
  ]
].
qed.

theorem le_pred_to_le:
 ∀n,m. O < m → pred n ≤ pred m \to n ≤ m.
intros 2;
elim n;
[ apply le_O_n
| simplify in H2;
  rewrite > (S_pred m);
  [ apply le_S_S;
    assumption
  | assumption
  ]
].
qed.

theorem le_to_le_pred:
 ∀n,m. n ≤ m → pred n ≤ pred m.
intros 2;
elim n;
[ simplify;
  apply le_O_n
| simplify;
  generalize in match H1;
  clear H1;
  elim m;
  [ elim (not_le_Sn_O ? H1)
  | simplify;
    apply le_S_S_to_le;
    assumption
  ]
].
qed.


theorem pigeonhole:
 ∀n:nat.∀f:nat→nat.
  (∀x,y.x≤n → y≤n → f x = f y → x=y) →
  (∀m. f m ≤ n) →
   ∀x. x≤n \to ∃y.f y = x ∧ y ≤ n.
intro;
elim n;
[ apply (ex_intro ? ? O);
  split;
  rewrite < (le_n_O_to_eq ? H2);
  rewrite < (le_n_O_to_eq ? (H1 O));
  reflexivity
| clear n;
  apply (nat_compare_elim (f (S n1)) x);
  [ (* TODO: caso complicato, ma simile al terzo *) 
  | intros;
    apply (ex_intro ? ? (S n1));
    split;
    [ assumption
    | constructor 1
    ] 
  | intro;
    letin f' ≝
     (λx.
       let fSn1 ≝ f (S n1) in
       let fx ≝ f x in
        match ltb fSn1 fx with
        [ true ⇒ pred fx
        | false ⇒ fx
        ]);
    elim (H f' ? ? x);
    [ simplify in H5;
      clear f';
      elim H5;
      clear H5;
      apply (ex_intro ? ? a);
      split;
      [ generalize in match H4;
        clear H4;
        rewrite < H6;
        clear H6;
        apply (ltb_elim (f (S n1)) (f a));
        [ (* TODO: caso impossibile (uso l'iniettivita') *)
          simplify;
        | simplify;
          intros;
          reflexivity
        ]        
      | apply le_S;
        assumption
      ]
    | (* This branch proves injectivity of f' *)    
      simplify;
      intros 4;
      apply (ltb_elim (f (S n1)) (f x1));
      simplify;
      apply (ltb_elim (f (S n1)) (f y));
      simplify;
      intros;
      [ cut (f x1 = f y);
        [ apply (H1 ? ? ? ? Hcut);
          apply le_S;
          assumption
        | apply eq_pred_to_eq;
          [ apply (ltn_to_ltO ? ? H8)
          | apply (ltn_to_ltO ? ? H7)
          | assumption
          ]
        ]         
      | (* TODO: pred (f x1) = f y assurdo per iniettivita'
           poiche' y ≠ S n1 da cui f y ≠ f (S n1) da cui f y < f (S n1) < f x1
           da cui assurdo pred (f x1) = f y *)
      | (* TODO: f x1 = pred (f y) assurdo per iniettivita' *)
      | apply (H1 ? ? ? ? H9);
        apply le_S;
        assumption
      ]
    | simplify;
      intro;
      apply (ltb_elim (f (S n1)) (f m));
      simplify;
      intro;
      [ generalize in match (H2 m);
        intro;
        change in match n1 with (pred (S n1));
        apply le_to_le_pred;
        assumption
      | generalize in match (H2 (S n1));
        intro;
        generalize in match (not_lt_to_le ? ? H5);
        intro;
        generalize in match (transitive_le ? ? ? H7 H6);
        intro;
        (* TODO: qui mi serve dimostrare che f m ≠ f (S n1) (per iniettivita'?) *) 
      ]
    | rewrite > (pred_Sn n1);
      simplify;
      generalize in match (H2 (S n1));
      intro;
      generalize in match (lt_to_le_to_lt ? ? ? H4 H5);
      intro;
      unfold lt in H6;
      apply le_S_S_to_le;
      assumption
    ]
  ]
].
qed.

theorem foo:
 ∀G:finite_enumerable_SemiGroup.
  left_cancellable ? (op G) →
  right_cancellable ? (op G) →
   ∃e:G. isMonoid (mk_PreMonoid G e).
intros;
letin f ≝ (λn.ι(G \sub O · G \sub n));
cut (∀n.n ≤ order ? (is_finite_enumerable G) → ∃m.f m = n);
[ letin EX ≝ (Hcut O ?);
  [ apply le_O_n
  | clearbody EX;
    clear Hcut;
    unfold f in EX;
    elim EX;
    clear EX;
    letin HH ≝ (eq_f ? ? (repr ? (is_finite_enumerable G)) ? ? H2);
    clearbody HH;
    rewrite > (repr_index_of ? (is_finite_enumerable G)) in HH;
    apply (ex_intro ? ? (G \sub a));
    letin GOGO ≝ (refl_eq ? (repr ? (is_finite_enumerable G) O));
    clearbody GOGO;
    rewrite < HH in GOGO;
    rewrite < HH in GOGO:(? ? % ?);
    rewrite > (associative ? G) in GOGO;
    letin GaGa ≝ (H ? ? ? GOGO);
    clearbody GaGa;
    clear GOGO;
    constructor 1;
    [ simplify;
      apply (semigroup_properties G)
    | unfold is_left_unit; intro;
      letin GaxGax ≝ (refl_eq ? (G \sub a ·x));
      clearbody GaxGax;
      rewrite < GaGa in GaxGax:(? ? % ?);
      rewrite > (associative ? (semigroup_properties G)) in GaxGax;
      apply (H ? ? ? GaxGax)
    | unfold is_right_unit; intro;
      letin GaxGax ≝ (refl_eq ? (x·G \sub a));
      clearbody GaxGax;
      rewrite < GaGa in GaxGax:(? ? % ?);
      rewrite < (associative ? (semigroup_properties G)) in GaxGax;
      apply (H1 ? ? ? GaxGax)
    ]
  ]
| apply pigeonhole
].