Search for blocks/addresses/...

Proofgold Proof

pf
Let x0 of type ι be given.
Let x1 of type ιιι be given.
Assume H0: explicit_Group x0 x1.
Apply H0 with ∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0∀ x4 . prim1 x4 x0x1 x2 x3 = x1 x2 x4x3 = x4.
Assume H1: and (∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0prim1 (x1 x2 x3) x0) (∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0∀ x4 . prim1 x4 x0x1 x2 (x1 x3 x4) = x1 (x1 x2 x3) x4).
Apply H1 with (∃ x2 . and (prim1 x2 x0) (and (∀ x3 . prim1 x3 x0and (x1 x2 x3 = x3) (x1 x3 x2 = x3)) (∀ x3 . prim1 x3 x0∃ x4 . and (prim1 x4 x0) (and (x1 x3 x4 = x2) (x1 x4 x3 = x2)))))∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0∀ x4 . prim1 x4 x0x1 x2 x3 = x1 x2 x4x3 = x4.
Assume H2: ∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0prim1 (x1 x2 x3) x0.
Assume H3: ∀ x2 . prim1 x2 x0∀ x3 . prim1 x3 x0∀ x4 . prim1 x4 x0x1 x2 (x1 x3 x4) = x1 (x1 x2 x3) x4.
Assume H4: ∃ x2 . and (prim1 x2 x0) (and (∀ x3 . prim1 x3 x0and (x1 x2 x3 = x3) (x1 x3 x2 = x3)) (∀ x3 . prim1 x3 x0∃ x4 . and (prim1 x4 x0) (and (x1 x3 x4 = x2) (x1 x4 x3 = x2)))).
Let x2 of type ι be given.
Assume H5: prim1 x2 x0.
Let x3 of type ι be given.
Assume H6: prim1 x3 x0.
Let x4 of type ι be given.
Assume H7: prim1 x4 x0.
Assume H8: x1 x2 x3 = x1 x2 x4.
Claim L9: ∀ x5 . prim1 x5 x0x1 (explicit_Group_inverse x0 x1 x2) (x1 x2 x5) = x5
Let x5 of type ι be given.
Assume H9: prim1 x5 x0.
...
Apply L9 with x3, λ x5 x6 . x5 = x4 leaving 2 subgoals.
The subproof is completed by applying H6.
Apply H8 with λ x5 x6 . x1 (explicit_Group_inverse x0 x1 x2) x6 = x4.
Apply L9 with x4.
The subproof is completed by applying H7.