Integrations

[helm.git] / weblib / basics / logic.ma

(*
    ||M||  This file is part of HELM, an Hypertextual, Electronic        
    ||A||  Library of Mathematics, developed at the Computer Science     
    ||T||  Department of the University of Bologna, Italy.                     
    ||I||                                                                 
    ||T||  
    ||A||  
    \   /  This file is distributed under the terms of the       
     \ /   GNU General Public License Version 2   
      V_______________________________________________________________ *)

include "basics/pts.ma".
(*include "hints_declaration.ma".*)

(* propositional equality *)

inductive eq (A:Type[1]) (x:A) : A → Prop ≝
    refl: eq A x x. 

interpretation "leibnitz's equality" 'eq t x y = (eq t x y).

lemma eq_rect_r:
 ∀A.∀a,x.∀p:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 ? x a.∀P: 
 ∀x:A. x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 a → Type[2]. P a (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 A a) → P x p.
 #A #a #x #p (cases p) // qed.

lemma eq_ind_r :
 ∀A.∀a.∀P: ∀x:A. x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 a → Prop. P a (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 A a) → 
   ∀x.∀p:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 ? x a.P x p.
 #A #a #P #p #x0 #p0; @(\ 5a href="cic:/matita/basics/logic/eq_rect_r.def(1)"\ 6eq_rect_r\ 5/a\ 6 ? ? ? p0) //; qed.

lemma eq_rect_Type2_r:
  ∀A.∀a.∀P: ∀x:A. \ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 ? x a → Type[2]. P a (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 A a) → 
    ∀x.∀p:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 ? x a.P x p.
  #A #a #P #H #x #p (generalize in match H) (generalize in match P)
  cases p; //; qed.

theorem rewrite_l: ∀A:Type[1].∀x.∀P:A → Type[1]. P x → ∀y. x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 y → P y.
#A #x #P #Hx #y #Heq (cases Heq); //; qed.

theorem sym_eq: ∀A.∀x,y:A. x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 y → y \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x.
#A #x #y #Heq @(\ 5a href="cic:/matita/basics/logic/rewrite_l.def(1)"\ 6rewrite_l\ 5/a\ 6 A x (λz.z\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x)); //; qed.

theorem rewrite_r: ∀A:Type[1].∀x.∀P:A → Type[1]. P x → ∀y. y \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x → P y.
#A #x #P #Hx #y #Heq (cases (\ 5a href="cic:/matita/basics/logic/sym_eq.def(2)"\ 6sym_eq\ 5/a\ 6 ? ? ? Heq)); //; qed.

theorem eq_coerc: ∀A,B:Type[0].A→(A\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6B)→B.
#A #B #Ha #Heq (elim Heq); //; qed.

theorem trans_eq : ∀A.∀x,y,z:A. x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 y → y \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 z → x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 z.
#A #x #y #z #H1 #H2 >H1; //; qed.

theorem eq_f: ∀A,B.∀f:A→B.∀x,y:A. x\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6y → f x \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 f y.
#A #B #f #x #y #H >H; //; qed.

(* deleterio per auto? *)
theorem eq_f2: ∀A,B,C.∀f:A→B→C.
∀x1,x2:A.∀y1,y2:B. x1\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x2 → y1\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6y2 → f x1 y1 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 f x2 y2.
#A #B #C #f #x1 #x2 #y1 #y2 #E1 #E2 >E1; >E2; //; qed. 

(* hint to genereric equality 
definition eq_equality: equality ≝
 mk_equality eq refl rewrite_l rewrite_r.


unification hint 0 ≔ T,a,b;
 X ≟ eq_equality
(*------------------------------------*) ⊢
    equal X T a b ≡ eq T a b.
*)
  
(********** connectives ********)

inductive True: Prop ≝  
I : True.

inductive False: Prop ≝ .

(* ndefinition Not: Prop → Prop ≝
λA. A → False. *)

inductive Not (A:Prop): Prop ≝
nmk: (A → \ 5a href="cic:/matita/basics/logic/False.ind(1,0,0)"\ 6False\ 5/a\ 6) → Not A.


interpretation "logical not" 'not x = (Not x).

theorem absurd : ∀A:Prop. A → \ 5a title="logical not" href="cic:/fakeuri.def(1)"\ 6¬\ 5/a\ 6A → \ 5a href="cic:/matita/basics/logic/False.ind(1,0,0)"\ 6False\ 5/a\ 6.
#A #H #Hn (elim Hn); /2/; qed.

(*
ntheorem absurd : ∀ A,C:Prop. A → ¬A → C.
#A; #C; #H; #Hn; nelim (Hn H).
nqed. *)

theorem not_to_not : ∀A,B:Prop. (A → B) → \ 5a title="logical not" href="cic:/fakeuri.def(1)"\ 6¬\ 5/a\ 6B →\ 5a title="logical not" href="cic:/fakeuri.def(1)"\ 6¬\ 5/a\ 6A.
/4/; qed.

(* inequality *)
interpretation "leibnitz's non-equality" 'neq t x y = (Not (eq t x y)).

theorem sym_not_eq: ∀A.∀x,y:A. x \ 5a title="leibnitz's non-equality" href="cic:/fakeuri.def(1)"\ 6≠\ 5/a\ 6 y → y \ 5a title="leibnitz's non-equality" href="cic:/fakeuri.def(1)"\ 6≠\ 5/a\ 6 x.
/3/; qed.

(* and *)
inductive And (A,B:Prop) : Prop ≝
    conj : A → B → And A B.

interpretation "logical and" 'and x y = (And x y).

theorem proj1: ∀A,B:Prop. A \ 5a title="logical and" href="cic:/fakeuri.def(1)"\ 6∧\ 5/a\ 6 B → A.
#A #B #AB (elim AB) //; qed.

theorem proj2: ∀ A,B:Prop. A \ 5a title="logical and" href="cic:/fakeuri.def(1)"\ 6∧\ 5/a\ 6 B → B.
#A #B #AB (elim AB) //; qed.

(* or *)
inductive Or (A,B:Prop) : Prop ≝
     or_introl : A → (Or A B)
   | or_intror : B → (Or A B).

interpretation "logical or" 'or x y = (Or x y).

definition decidable : Prop → Prop ≝ 
λ A:Prop. A \ 5a title="logical or" href="cic:/fakeuri.def(1)"\ 6∨\ 5/a\ 6 \ 5a title="logical not" href="cic:/fakeuri.def(1)"\ 6¬\ 5/a\ 6 A.

(* exists *)
inductive ex (A:Type[0]) (P:A → Prop) : Prop ≝
    ex_intro: ∀ x:A. P x →  ex A P.
    
interpretation "exists" 'exists x = (ex ? x).

inductive ex2 (A:Type[0]) (P,Q:A →Prop) : Prop ≝
    ex_intro2: ∀ x:A. P x → Q x → ex2 A P Q.

(* iff *)
definition iff :=
 λ A,B. (A → B) \ 5a title="logical and" href="cic:/fakeuri.def(1)"\ 6∧\ 5/a\ 6 (B → A).

interpretation "iff" 'iff a b = (iff a b).
  
lemma iff_sym: ∀A,B. A ↔ B → B ↔ A.
#A #B * /3/ qed.

lemma iff_trans:∀A,B,C. A ↔ B → B ↔ C → A ↔ C.
#A #B #C * #H1 #H2 * #H3 #H4 % /3/ qed.

lemma iff_not: ∀A,B. A ↔ B → ¬A ↔ ¬B.
#A #B * #H1 #H2 % /3/ qed.

lemma iff_and_l: ∀A,B,C. A ↔ B → C ∧ A ↔ C ∧ B.
#A #B #C * #H1 #H2 % * /3/ qed.  

lemma iff_and_r: ∀A,B,C. A ↔ B → A ∧ C ↔ B ∧ C.
#A #B #C * #H1 #H2 % * /3/ qed.  

lemma iff_or_l: ∀A,B,C. A ↔ B → C ∨ A ↔ C ∨ B.
#A #B #C * #H1 #H2 % * /3/ qed.  

lemma iff_or_r: ∀A,B,C. A ↔ B → A ∨ C ↔ B ∨ C.
#A #B #C * #H1 #H2 % * /3/ qed.  
(* cose per destruct: da rivedere *) 

definition R0 ≝ λT:Type[0].λt:T.t.
  
definition R1 ≝ \ 5a href="cic:/matita/basics/logic/eq_rect_Type0.fix(0,5,1)"\ 6eq_rect_Type0\ 5/a\ 6.

(* useless stuff *)
definition R2 :
  ∀T0:Type[0].
  ∀a0:T0.
  ∀T1:∀x0:T0. a0\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x0 → Type[0].
  ∀a1:T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a0).
  ∀T2:∀x0:T0. ∀p0:a0\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x0. ∀x1:T1 x0 p0. \ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? T1 a1 ? p0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x1 → Type[0].
  ∀a2:T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a1).
  ∀b0:T0.
  ∀e0:a0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 b0.
  ∀b1: T1 b0 e0.
  ∀e1:\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? T1 a1 ? e0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 b1.
  T2 b0 e0 b1 e1.
#T0 #a0 #T1 #a1 #T2 #a2 #b0 #e0 #b1 #e1 
@(\ 5a href="cic:/matita/basics/logic/eq_rect_Type0.fix(0,5,1)"\ 6eq_rect_Type0\ 5/a\ 6 ????? e1) 
@(\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? ? ?? e0) 
@a2 
qed.

definition R3 :
  ∀T0:Type[0].
  ∀a0:T0.
  ∀T1:∀x0:T0. a0\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x0 → Type[0].
  ∀a1:T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a0).
  ∀T2:∀x0:T0. ∀p0:a0\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x0. ∀x1:T1 x0 p0. \ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? T1 a1 ? p0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x1 → Type[0].
  ∀a2:T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a1).
  ∀T3:∀x0:T0. ∀p0:a0\ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6x0. ∀x1:T1 x0 p0.∀p1:\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? T1 a1 ? p0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x1.
      ∀x2:T2 x0 p0 x1 p1.\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 ???? T2 a2 x0 p0 ? p1 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 x2 → Type[0].
  ∀a3:T3 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a1) a2 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? a2).
  ∀b0:T0.
  ∀e0:a0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 b0.
  ∀b1: T1 b0 e0.
  ∀e1:\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 ?? T1 a1 ? e0 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 b1.
  ∀b2: T2 b0 e0 b1 e1.
  ∀e2:\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 ???? T2 a2 b0 e0 ? e1 \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 b2.
  T3 b0 e0 b1 e1 b2 e2.
#T0 #a0 #T1 #a1 #T2 #a2 #T3 #a3 #b0 #e0 #b1 #e1 #b2 #e2 
@(\ 5a href="cic:/matita/basics/logic/eq_rect_Type0.fix(0,5,1)"\ 6eq_rect_Type0\ 5/a\ 6 ????? e2) 
@(\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 ?? ? ???? e0 ? e1) 
@a3 
qed.

definition R4 :
  ∀T0:Type[0].
  ∀a0:T0.
  ∀T1:∀x0:T0. \ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 T0 a0 x0 → Type[0].
  ∀a1:T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0).
  ∀T2:∀x0:T0. ∀p0:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T0 …) a0 x0. ∀x1:T1 x0 p0.\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T1 …) (\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 T0 a0 T1 a1 x0 p0) x1 → Type[0].
  ∀a2:T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1).
  ∀T3:∀x0:T0. ∀p0:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T0 …) a0 x0. ∀x1:T1 x0 p0.∀p1:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T1 …) (\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 T0 a0 T1 a1 x0 p0) x1.
      ∀x2:T2 x0 p0 x1 p1.\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T2 …) (\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 T0 a0 T1 a1 T2 a2 x0 p0 x1 p1) x2 → Type[0].
  ∀a3:T3 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1) 
      a2 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1)) a2). 
  ∀T4:∀x0:T0. ∀p0:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T0 …) a0 x0. ∀x1:T1 x0 p0.∀p1:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T1 …) (\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 T0 a0 T1 a1 x0 p0) x1.
      ∀x2:T2 x0 p0 x1 p1.∀p2:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T2 …) (\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 T0 a0 T1 a1 T2 a2 x0 p0 x1 p1) x2.
      ∀x3:T3 x0 p0 x1 p1 x2 p2.∀p3:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T3 …) (\ 5a href="cic:/matita/basics/logic/R3.def(4)"\ 6R3\ 5/a\ 6 T0 a0 T1 a1 T2 a2 T3 a3 x0 p0 x1 p1 x2 p2) x3. 
      Type[0].
  ∀a4:T4 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1) 
      a2 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1)) a2) 
      a3 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T3 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1) 
                   a2 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T2 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0) a1 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 (T1 a0 (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 T0 a0)) a1)) a2))
                   a3).
  ∀b0:T0.
  ∀e0:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T0 …) a0 b0.
  ∀b1: T1 b0 e0.
  ∀e1:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T1 …) (\ 5a href="cic:/matita/basics/logic/R1.def(2)"\ 6R1\ 5/a\ 6 T0 a0 T1 a1 b0 e0) b1.
  ∀b2: T2 b0 e0 b1 e1.
  ∀e2:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T2 …) (\ 5a href="cic:/matita/basics/logic/R2.def(3)"\ 6R2\ 5/a\ 6 T0 a0 T1 a1 T2 a2 b0 e0 b1 e1) b2.
  ∀b3: T3 b0 e0 b1 e1 b2 e2.
  ∀e3:\ 5a href="cic:/matita/basics/logic/eq.ind(1,0,2)"\ 6eq\ 5/a\ 6 (T3 …) (\ 5a href="cic:/matita/basics/logic/R3.def(4)"\ 6R3\ 5/a\ 6 T0 a0 T1 a1 T2 a2 T3 a3 b0 e0 b1 e1 b2 e2) b3.
  T4 b0 e0 b1 e1 b2 e2 b3 e3.
#T0 #a0 #T1 #a1 #T2 #a2 #T3 #a3 #T4 #a4 #b0 #e0 #b1 #e1 #b2 #e2 #b3 #e3 
@(\ 5a href="cic:/matita/basics/logic/eq_rect_Type0.fix(0,5,1)"\ 6eq_rect_Type0\ 5/a\ 6 ????? e3) 
@(\ 5a href="cic:/matita/basics/logic/R3.def(4)"\ 6R3\ 5/a\ 6 ????????? e0 ? e1 ? e2)
@a4 
qed.

(* TODO concrete definition by means of proof irrelevance *)
axiom streicherK : ∀T:Type[1].∀t:T.∀P:t \ 5a title="leibnitz's equality" href="cic:/fakeuri.def(1)"\ 6=\ 5/a\ 6 t → Type[2].P (\ 5a href="cic:/matita/basics/logic/eq.con(0,1,2)"\ 6refl\ 5/a\ 6 ? t) → ∀p.P p.