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Proofgold Asset
asset id
fe4b78cd98c756b056b75b44fdad37f6909988d4db1f8732e7b8a00126b0a4f7
asset hash
58c25ac19e67733769bf690588d6fec97f0cb3639f2d934f6309a06e5549278e
bday / block
4964
tx
c0c37..
preasset
doc published by
Pr6Pc..
Param
explicit_Field
explicit_Field
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
ο
Param
explicit_Field_minus
explicit_Field_minus
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
ι
→
ι
Known
c888a..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
explicit_Field
x0
x1
x2
x3
x4
⟶
∀ x5 : ο .
(
(
∀ x6 .
x6
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
x6
∈
x0
)
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
x1
=
x1
⟶
(
∀ x6 .
x6
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
(
explicit_Field_minus
x0
x1
x2
x3
x4
x6
)
=
x6
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
x3
(
explicit_Field_minus
x0
x1
x2
x3
x4
x6
)
x6
=
x1
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
x3
x6
(
explicit_Field_minus
x0
x1
x2
x3
x4
x6
)
=
x1
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
(
x3
x6
x7
)
x8
=
x3
(
x4
x6
x8
)
(
x4
x7
x8
)
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
(
x3
x6
x7
)
=
x3
(
explicit_Field_minus
x0
x1
x2
x3
x4
x6
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x4
(
explicit_Field_minus
x0
x1
x2
x3
x4
x6
)
x7
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x6
x7
)
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x4
x6
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x6
x7
)
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
x4
x1
x6
=
x1
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
x4
x6
x1
=
x1
)
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
x2
∈
x0
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x6
(
x4
x7
x8
)
∈
x0
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x3
(
x3
x6
x7
)
(
x3
x8
x9
)
=
x3
(
x3
x6
x9
)
(
x3
x7
x8
)
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x3
(
x3
x6
x7
)
(
x3
x8
x9
)
=
x3
(
x3
x6
x8
)
(
x3
x7
x9
)
)
⟶
x5
)
⟶
x5
Param
explicit_Reals
explicit_Reals
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ο
) →
ο
Param
and
and
:
ο
→
ο
→
ο
Param
ReplSep2
ReplSep2
:
ι
→
(
ι
→
ι
) →
(
ι
→
ι
→
ο
) →
CT2
ι
Param
True
True
:
ο
Param
Sep
Sep
:
ι
→
(
ι
→
ο
) →
ι
Known
89287..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 :
ι →
ι → ι
.
explicit_Reals
x0
x1
x2
x3
x4
x5
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
x6
x7
x8
=
x6
x9
x10
⟶
and
(
x7
=
x9
)
(
x8
=
x10
)
)
⟶
∀ x7 : ο .
(
(
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x6
x8
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 :
ι → ο
.
(
∀ x10 .
x10
∈
x0
⟶
∀ x11 .
x11
∈
x0
⟶
x8
=
x6
x10
x11
⟶
x9
(
x6
x10
x11
)
)
⟶
x9
x8
)
⟶
(
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
x8
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
=
x8
)
⟶
(
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
x8
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x8
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
=
x9
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
∈
x0
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
∈
x0
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
x8
=
x6
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
⟶
(
∀ x8 .
x8
∈
x0
⟶
x6
x8
x1
∈
{x9 ∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
|
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x1
=
x9
}
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
=
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
=
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
⟶
x8
=
x9
)
⟶
x6
x1
x1
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
x6
x2
x1
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
(
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
∀ x11 .
x11
∈
x0
⟶
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x8
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x10
x11
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x8
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x8
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x10
x11
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x10
x11
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
x3
x8
x10
)
(
x3
x9
x11
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
=
x6
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x9
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
(
x3
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x9
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
=
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
=
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
⟶
(
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
∀ x11 .
x11
∈
x0
⟶
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x8
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x10
x11
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x8
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x8
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x10
x11
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x10
x11
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x8
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x10
x11
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x10
x11
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x6
x8
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x6
x8
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
x10
x11
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
x3
(
x4
x8
x10
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x9
x11
)
)
)
(
x3
(
x4
x8
x11
)
(
x4
x9
x10
)
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
=
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x9
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x9
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
)
∈
x0
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x9
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x9
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
∈
x0
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x9
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x9
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x9
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x9
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
)
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
=
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
⟶
(
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
=
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
⟶
x7
)
⟶
x7
Known
801dc..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 :
ι →
ι → ι
.
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x3
x7
x8
∈
x0
)
⟶
x1
∈
x0
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
x8
∈
x0
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
x7
(
x4
x8
x9
)
=
x4
(
x4
x7
x8
)
x9
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
x8
=
x4
x8
x7
)
⟶
x2
∈
x0
⟶
(
∀ x7 .
x7
∈
x0
⟶
(
x7
=
x1
⟶
∀ x8 : ο .
x8
)
⟶
∀ x8 : ο .
(
∀ x9 .
and
(
x9
∈
x0
)
(
x4
x7
x9
=
x2
)
⟶
x8
)
⟶
x8
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
x7
(
x3
x8
x9
)
=
x3
(
x4
x7
x8
)
(
x4
x7
x9
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
x7
∈
x0
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
(
x3
x7
x8
)
x9
=
x3
(
x4
x7
x9
)
(
x4
x8
x9
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
(
x3
x7
x8
)
=
x3
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
x8
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
x8
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x7
x8
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
(
explicit_Field_minus
x0
x1
x2
x3
x4
x8
)
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x7
x8
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
prim0
(
λ x8 .
and
(
x8
∈
x0
)
(
∀ x9 : ο .
(
∀ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
x8
x10
)
⟶
x9
)
⟶
x9
)
)
∈
x0
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
prim0
(
λ x8 .
and
(
x8
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
x8
)
)
∈
x0
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
⟶
x7
=
x8
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
)
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
)
)
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
)
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
)
)
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
)
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
)
)
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x7
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x8
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x8
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
)
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x7
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
)
)
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x6
x7
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x6
x7
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
x7
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x6
x7
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x6
x7
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
x8
)
⟶
x6
x1
x1
∈
ReplSep2
x0
(
λ x7 .
x0
)
(
λ x7 x8 .
True
)
x6
⟶
x6
x2
x1
∈
ReplSep2
x0
(
λ x7 .
x0
)
(
λ x7 x8 .
True
)
x6
⟶
(
∀ x7 .
x7
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
=
x7
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
x3
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
x7
=
x1
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
x4
x1
x7
=
x1
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x3
(
x4
x7
x7
)
(
x4
x8
x8
)
=
x1
⟶
and
(
x7
=
x1
)
(
x8
=
x1
)
)
⟶
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
(
x7
=
x6
x1
x1
⟶
∀ x8 : ο .
x8
)
⟶
∀ x8 : ο .
(
∀ x9 .
and
(
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
)
(
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
=
x6
x2
x1
)
⟶
x8
)
⟶
x8
Known
35f8e..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 :
ι →
ι → ι
.
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x3
x7
x8
∈
x0
)
⟶
x1
∈
x0
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
x8
∈
x0
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
x7
(
x4
x8
x9
)
=
x4
(
x4
x7
x8
)
x9
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
x8
=
x4
x8
x7
)
⟶
x2
∈
x0
⟶
(
∀ x7 .
x7
∈
x0
⟶
(
x7
=
x1
⟶
∀ x8 : ο .
x8
)
⟶
∀ x8 : ο .
(
∀ x9 .
and
(
x9
∈
x0
)
(
x4
x7
x9
=
x2
)
⟶
x8
)
⟶
x8
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
x7
(
x3
x8
x9
)
=
x3
(
x4
x7
x8
)
(
x4
x7
x9
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
x7
∈
x0
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x4
(
x3
x7
x8
)
x9
=
x3
(
x4
x7
x9
)
(
x4
x8
x9
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
explicit_Field_minus
x0
x1
x2
x3
x4
(
x3
x7
x8
)
=
x3
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
x8
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
(
explicit_Field_minus
x0
x1
x2
x3
x4
x7
)
x8
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x7
x8
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x7
(
explicit_Field_minus
x0
x1
x2
x3
x4
x8
)
=
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
x7
x8
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
prim0
(
λ x8 .
and
(
x8
∈
x0
)
(
∀ x9 : ο .
(
∀ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
x8
x10
)
⟶
x9
)
⟶
x9
)
)
∈
x0
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
prim0
(
λ x8 .
and
(
x8
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
x8
)
)
∈
x0
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
⟶
x7
=
x8
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
)
(
x4
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
)
)
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
)
(
x4
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
)
)
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
)
(
x4
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
)
)
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x7
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x8
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x8
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
)
(
x4
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x7
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
)
)
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
x3
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
(
x4
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
x6
(
x3
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
∀ x10 : ο .
(
∀ x11 .
and
(
x11
∈
x0
)
(
x8
=
x6
x9
x11
)
⟶
x10
)
⟶
x10
)
)
)
)
(
x3
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
(
prim0
(
λ x9 .
and
(
x9
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
x9
)
)
)
)
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
)
(
x3
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
x14
)
)
)
)
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
=
x3
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
∀ x11 : ο .
(
∀ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
x10
x12
)
⟶
x11
)
⟶
x11
)
)
)
)
⟶
(
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
)
(
x3
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x14 .
and
(
x14
∈
x0
)
(
∀ x15 : ο .
(
∀ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
x14
x16
)
⟶
x15
)
⟶
x15
)
)
)
x12
)
)
)
)
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x7
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
∀ x17 : ο .
(
∀ x18 .
and
(
x18
∈
x0
)
(
x8
=
x6
x16
x18
)
⟶
x17
)
⟶
x17
)
)
)
)
(
x3
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x7
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
(
prim0
(
λ x16 .
and
(
x16
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x18 .
and
(
x18
∈
x0
)
(
∀ x19 : ο .
(
∀ x20 .
and
(
x20
∈
x0
)
(
x8
=
x6
x18
x20
)
⟶
x19
)
⟶
x19
)
)
)
x16
)
)
)
)
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
=
x3
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x7
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
(
prim0
(
λ x10 .
and
(
x10
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x12 .
and
(
x12
∈
x0
)
(
∀ x13 : ο .
(
∀ x14 .
and
(
x14
∈
x0
)
(
x8
=
x6
x12
x14
)
⟶
x13
)
⟶
x13
)
)
)
x10
)
)
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
x3
(
x3
x7
x8
)
(
x3
x9
x10
)
=
x3
(
x3
x7
x9
)
(
x3
x8
x10
)
)
⟶
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
=
x6
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
Param
explicit_OrderedField
explicit_OrderedField
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ο
) →
ο
Param
lt
lt
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ο
) →
ι
→
ι
→
ο
Param
natOfOrderedField_p
natOfOrderedField_p
:
ι
→
ι
→
ι
→
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ι
) →
(
ι
→
ι
→
ο
) →
ι
→
ο
Param
setexp
setexp
:
ι
→
ι
→
ι
Param
ap
ap
:
ι
→
ι
→
ι
Known
explicit_Reals_E
explicit_Reals_E
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 : ο .
(
explicit_Reals
x0
x1
x2
x3
x4
x5
⟶
explicit_OrderedField
x0
x1
x2
x3
x4
x5
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
lt
x0
x1
x2
x3
x4
x5
x1
x7
⟶
x5
x1
x8
⟶
∀ x9 : ο .
(
∀ x10 .
and
(
x10
∈
Sep
x0
(
natOfOrderedField_p
x0
x1
x2
x3
x4
x5
)
)
(
x5
x8
(
x4
x10
x7
)
)
⟶
x9
)
⟶
x9
)
⟶
(
∀ x7 .
x7
∈
setexp
x0
(
Sep
x0
(
natOfOrderedField_p
x0
x1
x2
x3
x4
x5
)
)
⟶
∀ x8 .
x8
∈
setexp
x0
(
Sep
x0
(
natOfOrderedField_p
x0
x1
x2
x3
x4
x5
)
)
⟶
(
∀ x9 .
x9
∈
Sep
x0
(
natOfOrderedField_p
x0
x1
x2
x3
x4
x5
)
⟶
and
(
and
(
x5
(
ap
x7
x9
)
(
ap
x8
x9
)
)
(
x5
(
ap
x7
x9
)
(
ap
x7
(
x3
x9
x2
)
)
)
)
(
x5
(
ap
x8
(
x3
x9
x2
)
)
(
ap
x8
x9
)
)
)
⟶
∀ x9 : ο .
(
∀ x10 .
and
(
x10
∈
x0
)
(
∀ x11 .
x11
∈
Sep
x0
(
natOfOrderedField_p
x0
x1
x2
x3
x4
x5
)
⟶
and
(
x5
(
ap
x7
x11
)
x10
)
(
x5
x10
(
ap
x8
x11
)
)
)
⟶
x9
)
⟶
x9
)
⟶
x6
)
⟶
explicit_Reals
x0
x1
x2
x3
x4
x5
⟶
x6
Param
iff
iff
:
ο
→
ο
→
ο
Param
or
or
:
ο
→
ο
→
ο
Known
explicit_OrderedField_E
explicit_OrderedField_E
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 : ο .
(
explicit_OrderedField
x0
x1
x2
x3
x4
x5
⟶
explicit_Field
x0
x1
x2
x3
x4
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x5
x7
x8
⟶
x5
x8
x9
⟶
x5
x7
x9
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
iff
(
and
(
x5
x7
x8
)
(
x5
x8
x7
)
)
(
x7
=
x8
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
or
(
x5
x7
x8
)
(
x5
x8
x7
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
x5
x7
x8
⟶
x5
(
x3
x7
x9
)
(
x3
x8
x9
)
)
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x5
x1
x7
⟶
x5
x1
x8
⟶
x5
x1
(
x4
x7
x8
)
)
⟶
x6
)
⟶
explicit_OrderedField
x0
x1
x2
x3
x4
x5
⟶
x6
Known
explicit_Field_E
explicit_Field_E
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 : ο .
(
explicit_Field
x0
x1
x2
x3
x4
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x3
x6
x7
∈
x0
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x3
x6
(
x3
x7
x8
)
=
x3
(
x3
x6
x7
)
x8
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x3
x6
x7
=
x3
x7
x6
)
⟶
x1
∈
x0
⟶
(
∀ x6 .
x6
∈
x0
⟶
x3
x1
x6
=
x6
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 : ο .
(
∀ x8 .
and
(
x8
∈
x0
)
(
x3
x6
x8
=
x1
)
⟶
x7
)
⟶
x7
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x4
x6
x7
∈
x0
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x6
(
x4
x7
x8
)
=
x4
(
x4
x6
x7
)
x8
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x4
x6
x7
=
x4
x7
x6
)
⟶
x2
∈
x0
⟶
(
x2
=
x1
⟶
∀ x6 : ο .
x6
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
x4
x2
x6
=
x6
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
(
x6
=
x1
⟶
∀ x7 : ο .
x7
)
⟶
∀ x7 : ο .
(
∀ x8 .
and
(
x8
∈
x0
)
(
x4
x6
x8
=
x2
)
⟶
x7
)
⟶
x7
)
⟶
(
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
x4
x6
(
x3
x7
x8
)
=
x3
(
x4
x6
x7
)
(
x4
x6
x8
)
)
⟶
x5
)
⟶
explicit_Field
x0
x1
x2
x3
x4
⟶
x5
Known
explicit_OrderedField_sum_squares_zero_inv
explicit_OrderedField_sum_squares_zero_inv
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
explicit_OrderedField
x0
x1
x2
x3
x4
x5
⟶
∀ x6 .
x6
∈
x0
⟶
∀ x7 .
x7
∈
x0
⟶
x3
(
x4
x6
x6
)
(
x4
x7
x7
)
=
x1
⟶
and
(
x6
=
x1
)
(
x7
=
x1
)
Theorem
e6dd5..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 :
ι →
ι → ι
.
explicit_Reals
x0
x1
x2
x3
x4
x5
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
x6
x7
x8
=
x6
x9
x10
⟶
and
(
x7
=
x9
)
(
x8
=
x10
)
)
⟶
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
(
x7
=
x6
x1
x1
⟶
∀ x8 : ο .
x8
)
⟶
∀ x8 : ο .
(
∀ x9 .
and
(
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
)
(
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
=
x6
x2
x1
)
⟶
x8
)
⟶
x8
(proof)
Theorem
313bd..
:
∀ x0 x1 x2 .
∀ x3 x4 :
ι →
ι → ι
.
∀ x5 :
ι →
ι → ο
.
∀ x6 :
ι →
ι → ι
.
explicit_Reals
x0
x1
x2
x3
x4
x5
⟶
(
∀ x7 .
x7
∈
x0
⟶
∀ x8 .
x8
∈
x0
⟶
∀ x9 .
x9
∈
x0
⟶
∀ x10 .
x10
∈
x0
⟶
x6
x7
x8
=
x6
x9
x10
⟶
and
(
x7
=
x9
)
(
x8
=
x10
)
)
⟶
∀ x7 .
x7
∈
ReplSep2
x0
(
λ x8 .
x0
)
(
λ x8 x9 .
True
)
x6
⟶
∀ x8 .
x8
∈
ReplSep2
x0
(
λ x9 .
x0
)
(
λ x9 x10 .
True
)
x6
⟶
∀ x9 .
x9
∈
ReplSep2
x0
(
λ x10 .
x0
)
(
λ x10 x11 .
True
)
x6
⟶
x6
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
x3
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
x3
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(
x4
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
x3
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
)
=
x6
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
∀ x12 : ο .
(
∀ x13 .
and
(
x13
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
)
(
x4
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
x15
)
)
)
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
)
)
=
x6
x11
x13
)
⟶
x12
)
⟶
x12
)
)
)
)
(
x3
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x8
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x8
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x8
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x8
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
(
prim0
(
λ x11 .
and
(
x11
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x7
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
)
(
x4
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x15 .
and
(
x15
∈
x0
)
(
∀ x16 : ο .
(
∀ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
x15
x17
)
⟶
x16
)
⟶
x16
)
)
)
x13
)
)
)
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x9
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
)
)
=
x6
(
prim0
(
λ x13 .
and
(
x13
∈
x0
)
(
∀ x14 : ο .
(
∀ x15 .
and
(
x15
∈
x0
)
(
x6
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
(
explicit_Field_minus
x0
x1
x2
x3
x4
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
)
)
(
x3
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x7
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x9
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x9
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
)
(
x4
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
x7
=
x6
(
prim0
(
λ x19 .
and
(
x19
∈
x0
)
(
∀ x20 : ο .
(
∀ x21 .
and
(
x21
∈
x0
)
(
x7
=
x6
x19
x21
)
⟶
x20
)
⟶
x20
)
)
)
x17
)
)
)
(
prim0
(
λ x17 .
and
(
x17
∈
x0
)
(
∀ x18 : ο .
(
∀ x19 .
and
(
x19
∈
x0
)
(
x9
=
x6
x17
x19
)
⟶
x18
)
⟶
x18
)
)
)
)
)
=
x6
x13
x15
)
⟶
x14
)
⟶
x14
)
)
)
x11
)
)
)
)
(proof)