DEFINITION pr3_eta()
TYPE =
∀c:C
.∀w:T
.∀u:T
.let t := THead (Bind Abst) w u
in ∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead (Flat Appl) (TLRef O) (lift (S O) O t)
t)
BODY =
assume c: C
assume w: T
assume u: T
we must prove
let t := THead (Bind Abst) w u
in ∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead (Flat Appl) (TLRef O) (lift (S O) O t)
t)
or equivalently
∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead
Flat Appl
TLRef O
lift (S O) O (THead (Bind Abst) w u)
THead (Bind Abst) w u)
assume v: T
suppose H: pr3 c v w
(h1)
(h1)
(h1)
by (pr0_refl .)
pr0 (TLRef O) (TLRef O)
end of h1
(h2)
by (pr0_refl .)
pr0 (lift (S O) (S O) u) (lift (S O) (S O) u)
end of h2
by (pr0_beta . . . h1 . . h2)
pr0
THead
Flat Appl
TLRef O
THead (Bind Abst) (lift (S O) O w) (lift (S O) (S O) u)
THead (Bind Abbr) (TLRef O) (lift (S O) (S O) u)
end of h1
(h2)
(h1)
(h1)
by (pr0_refl .)
pr0 (TLRef O) (TLRef O)
end of h1
(h2)
by (pr0_refl .)
pr0 (lift (S O) (S O) u) (lift (S O) (S O) u)
end of h2
(h3)
by (le_n .)
we proved le O O
by (subst1_lift_S . . . previous)
subst1 O (TLRef O) (lift (S O) (S O) u) (lift (S O) O u)
end of h3
by (pr0_delta1 . . h1 . . h2 . h3)
pr0
THead (Bind Abbr) (TLRef O) (lift (S O) (S O) u)
THead (Bind Abbr) (TLRef O) (lift (S O) O u)
end of h1
(h2)
by (pr0_refl .)
we proved pr0 u u
by (pr0_zeta . not_abbr_abst . . previous .)
we proved pr0 (THead (Bind Abbr) (TLRef O) (lift (S O) O u)) u
by (pr1_pr0 . . previous)
pr1 (THead (Bind Abbr) (TLRef O) (lift (S O) O u)) u
end of h2
by (pr1_sing . . h1 . h2)
pr1 (THead (Bind Abbr) (TLRef O) (lift (S O) (S O) u)) u
end of h2
by (pr1_sing . . h1 . h2)
we proved
pr1
THead
Flat Appl
TLRef O
THead (Bind Abst) (lift (S O) O w) (lift (S O) (S O) u)
u
by (pr3_pr1 . . previous .)
we proved
pr3
CHead c (Bind Abst) w
THead
Flat Appl
TLRef O
THead (Bind Abst) (lift (S O) O w) (lift (S O) (S O) u)
u
by (pr3_head_12 . . . H . . . previous)
pr3
c
THead
Bind Abst
v
THead
Flat Appl
TLRef O
THead (Bind Abst) (lift (S O) O w) (lift (S O) (S O) u)
THead (Bind Abst) w u
end of h1
(h2)
by (lift_bind . . . . .)
eq
T
lift (S O) O (THead (Bind Abst) w u)
THead (Bind Abst) (lift (S O) O w) (lift (S O) (S O) u)
end of h2
by (eq_ind_r . . . h1 . h2)
we proved
pr3
c
THead
Bind Abst
v
THead
Flat Appl
TLRef O
lift (S O) O (THead (Bind Abst) w u)
THead (Bind Abst) w u
we proved
∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead
Flat Appl
TLRef O
lift (S O) O (THead (Bind Abst) w u)
THead (Bind Abst) w u)
that is equivalent to
let t := THead (Bind Abst) w u
in ∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead (Flat Appl) (TLRef O) (lift (S O) O t)
t)
we proved
∀c:C
.∀w:T
.∀u:T
.let t := THead (Bind Abst) w u
in ∀v:T
.pr3 c v w
→(pr3
c
THead
Bind Abst
v
THead (Flat Appl) (TLRef O) (lift (S O) O t)
t)