Proofgold Proposition

∀ x0 x1 x2 . ∀ x3 x4 : ι → ι → ι . ∀ x5 : ι → ι → ο . ∀ x6 : ι → ι → ι . ∀ x7 . (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ ∀ x10 . prim1 x10 x0 ⟶ ∀ x11 . prim1 x11 x0 ⟶ x6 x8 x9 = x6 x10 x11 ⟶ and (x8 = x10) (x9 = x11)) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ prim1 (x3 x8 x9) x0) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ x3 x8 x9 = x3 x9 x8) ⟶ prim1 x1 x0 ⟶ (∀ x8 . prim1 x8 x0 ⟶ x3 x1 x8 = x8) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ prim1 (x4 x8 x9) x0) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ x4 x8 x9 = x4 x9 x8) ⟶ prim1 x2 x0 ⟶ (∀ x8 . prim1 x8 x0 ⟶ x4 x2 x8 = x8) ⟶ prim1 (explicit_Field_minus x0 x1 x2 x3 x4 x2) x0 ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ prim1 (x6 x8 x9) x7) ⟶ (∀ x8 . prim1 x8 x7 ⟶ ∀ x9 : ι → ο . (∀ x10 . prim1 x10 x0 ⟶ ∀ x11 . prim1 x11 x0 ⟶ x8 = x6 x10 x11 ⟶ x9 (x6 x10 x11)) ⟶ x9 x8) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x6 x8 x9 = x6 x11 x12))) = x8) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ prim0 (λ x11 . and (prim1 x11 x0) (x6 x8 x9 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x8 x9 = x6 x13 x14)))) x11)) = x9) ⟶ (∀ x8 . prim1 x8 x0 ⟶ prim1 (x6 x8 x1) (1216a.. x7 (λ x9 . x6 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x9 = x6 x11 x12)))) x1 = x9))) ⟶ (∀ x8 . prim1 x8 x7 ⟶ prim1 (prim0 (λ x9 . and (prim1 x9 x0) (∃ x10 . and (prim1 x10 x0) (x8 = x6 x9 x10)))) x0) ⟶ (∀ x8 . prim1 x8 x7 ⟶ prim1 (prim0 (λ x9 . and (prim1 x9 x0) (x8 = x6 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x8 = x6 x11 x12)))) x9))) x0) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ ∀ x10 . prim1 x10 x0 ⟶ ∀ x11 . prim1 x11 x0 ⟶ x6 (x3 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x8 x9 = x6 x13 x14)))) (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x10 x11 = x6 x13 x14))))) (x3 (prim0 (λ x13 . and (prim1 x13 x0) (x6 x8 x9 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x8 x9 = x6 x15 x16)))) x13))) (prim0 (λ x13 . and (prim1 x13 x0) (x6 x10 x11 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x10 x11 = x6 x15 x16)))) x13)))) = x6 (x3 x8 x10) (x3 x9 x11)) ⟶ (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ ∀ x10 . prim1 x10 x0 ⟶ ∀ x11 . prim1 x11 x0 ⟶ x6 (x3 (x4 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x8 x9 = x6 x13 x14)))) (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x10 x11 = x6 x13 x14))))) (explicit_Field_minus x0 x1 x2 x3 x4 (x4 (prim0 (λ x13 . and (prim1 x13 x0) (x6 x8 x9 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x8 x9 = x6 x15 x16)))) x13))) (prim0 (λ x13 . and (prim1 x13 x0) (x6 x10 x11 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x10 x11 = x6 x15 x16)))) x13)))))) (x3 (x4 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x8 x9 = x6 x13 x14)))) (prim0 (λ x13 . and (prim1 x13 x0) (x6 x10 x11 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x10 x11 = x6 x15 x16)))) x13)))) (x4 (prim0 (λ x13 . and (prim1 x13 x0) (x6 x8 x9 = x6 (prim0 (λ x15 . and (prim1 x15 x0) (∃ x16 . and (prim1 x16 x0) (x6 x8 x9 = x6 x15 x16)))) x13))) (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x6 x10 x11 = x6 x13 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 . prim1 x8 x0 ⟶ x3 (explicit_Field_minus x0 x1 x2 x3 x4 x8) x8 = x1) ⟶ (∀ x8 . prim1 x8 x0 ⟶ x3 x8 (explicit_Field_minus x0 x1 x2 x3 x4 x8) = x1) ⟶ explicit_Field_minus x0 x1 x2 x3 x4 x1 = x1 ⟶ (∀ x8 . prim1 x8 x0 ⟶ x4 x1 x8 = x1) ⟶ (∀ x8 . prim1 x8 x0 ⟶ x4 x8 x1 = x1) ⟶ explicit_Field x7 (x6 x1 x1) (x6 x2 x1) (λ x8 x9 . x6 (x3 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (x3 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10))))) (λ x8 x9 . x6 (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (explicit_Field_minus x0 x1 x2 x3 x4 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))))) (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))) (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))))) ⟶ 62ee1.. (1216a.. x7 (λ x8 . x6 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) x1 = x8)) (x6 x1 x1) (x6 x2 x1) (λ x8 x9 . x6 (x3 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (x3 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10))))) (λ x8 x9 . x6 (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (explicit_Field_minus x0 x1 x2 x3 x4 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))))) (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))) (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))))) (λ x8 x9 . x5 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) ⟶ and (11fac.. x7 (λ x8 . x6 (prim0 (λ x9 . and (prim1 x9 x0) (∃ x10 . and (prim1 x10 x0) (x8 = x6 x9 x10)))) x1) (λ x8 . x6 (prim0 (λ x9 . and (prim1 x9 x0) (x8 = x6 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x8 = x6 x11 x12)))) x9))) x1) (x6 x1 x1) (x6 x2 x1) (x6 x1 x2) (λ x8 x9 . x6 (x3 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (x3 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10))))) (λ x8 x9 . x6 (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11))))) (explicit_Field_minus x0 x1 x2 x3 x4 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))))) (x3 (x4 (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11)))) (prim0 (λ x10 . and (prim1 x10 x0) (x9 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x9 = x6 x12 x13)))) x10)))) (x4 (prim0 (λ x10 . and (prim1 x10 x0) (x8 = x6 (prim0 (λ x12 . and (prim1 x12 x0) (∃ x13 . and (prim1 x13 x0) (x8 = x6 x12 x13)))) x10))) (prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x9 = x6 x10 x11)))))))) ((∀ x8 . prim1 x8 x0 ⟶ x6 x8 x1 = x8) ⟶ and (and (and (and (and (Subq x0 x7) (∀ x8 . prim1 x8 x0 ⟶ prim0 (λ x10 . and (prim1 x10 x0) (∃ x11 . and (prim1 x11 x0) (x8 = x6 x10 x11))) = x8)) (x6 x1 x1 = x1)) (x6 x2 x1 = x2)) (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ x6 (x3 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x8 = x6 x11 x12)))) (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x9 = x6 x11 x12))))) (x3 (prim0 (λ x11 . and (prim1 x11 x0) (x8 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x8 = x6 x13 x14)))) x11))) (prim0 (λ x11 . and (prim1 x11 x0) (x9 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x9 = x6 x13 x14)))) x11)))) = x3 x8 x9)) (∀ x8 . prim1 x8 x0 ⟶ ∀ x9 . prim1 x9 x0 ⟶ x6 (x3 (x4 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x8 = x6 x11 x12)))) (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x9 = x6 x11 x12))))) (explicit_Field_minus x0 x1 x2 x3 x4 (x4 (prim0 (λ x11 . and (prim1 x11 x0) (x8 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x8 = x6 x13 x14)))) x11))) (prim0 (λ x11 . and (prim1 x11 x0) (x9 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x9 = x6 x13 x14)))) x11)))))) (x3 (x4 (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x8 = x6 x11 x12)))) (prim0 (λ x11 . and (prim1 x11 x0) (x9 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x9 = x6 x13 x14)))) x11)))) (x4 (prim0 (λ x11 . and (prim1 x11 x0) (x8 = x6 (prim0 (λ x13 . and (prim1 x13 x0) (∃ x14 . and (prim1 x14 x0) (x8 = x6 x13 x14)))) x11))) (prim0 (λ x11 . and (prim1 x11 x0) (∃ x12 . and (prim1 x12 x0) (x9 = x6 x11 x12)))))) = x4 x8 x9))

type
prop

theory
HoTg

name
-

proof
PUg87..

Megalodon
-

proofgold address
TMSap..

creator
3833 PrGxv../6938c..

owner
3833 PrGxv../6938c..

term root
1e489..