Let x0 of type ι be given.

Let x1 of type ι be given.

Let x2 of type ι be given.

Assume H0: TwoRamseyProp x0 x1 x2.

Let x3 of type ι → ι → ο be given.

Assume H1: ∀ x4 x5 . x3 x4 x5 ⟶ x3 x5 x4.

Claim L2: ...

...

Apply H0 with λ x4 x5 . not (x3 x4 x5), or (∃ x4 . and (x4 ⊆ x2) (and (equip x1 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ x3 x5 x6))) (∃ x4 . and (x4 ⊆ x2) (and (equip x0 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ not (x3 x5 x6)))) leaving 3 subgoals.

The subproof is completed by applying L2.

Assume H3: ∃ x4 . and (x4 ⊆ x2) (and (equip x0 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ not (x3 x5 x6))).

Apply orIR with ∃ x4 . and (x4 ⊆ x2) (and (equip x1 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ x3 x5 x6)), ∃ x4 . and (x4 ⊆ x2) (and (equip x0 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ not (x3 x5 x6))).

The subproof is completed by applying H3.

Assume H3: ∃ x4 . and (x4 ⊆ x2) (and (equip x1 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ not (not (x3 x5 x6)))).

Apply H3 with or (∃ x4 . and (x4 ⊆ x2) (and (equip x1 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ x3 x5 x6))) (∃ x4 . and (x4 ⊆ x2) (and (equip x0 x4) (∀ x5 . x5 ∈ x4 ⟶ ∀ x6 . x6 ∈ x4 ⟶ (x5 = x6 ⟶ ∀ x7 : ο . x7) ⟶ not (x3 x5 x6)))).

Let x4 of type ι be given.

Assume H4: (λ x5 . and (x5 ⊆ x2) (and (equip x1 x5) (∀ x6 . x6 ∈ x5 ⟶ ∀ x7 . x7 ∈ x5 ⟶ (x6 = x7 ⟶ ∀ x8 : ο . x8) ⟶ not (not (x3 x6 x7))))) x4.

Apply H4 with or (∃ x5 . and (x5 ⊆ x2) (and (equip x1 x5) (∀ x6 . ... ⟶ ∀ x7 . ...))) ....

...

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Proofgold Proof