EmptyOrChopImpRule

EmptyOrChopImpRule

⊢

f ⊃ empty ∨ f₁ ⇒ ⊢ f ; g ⊃ g ∨ (f₁ ; g)

EmptyOrChopImpRule

Proof:

1	⊢ f ⊃empty ∨ f₁	given
2	⊢ f ; g ⊃ (empty ∨ f₁) ; g	1,LeftChopImpChop
3	⊢ (empty ∨ f₁) ; g ≡ g ∨ (f₁ ; g)	EmptyOrChopEqv
4	⊢ f ; g ⊃ g ∨ (f₁ ; g)	2, 3,Prop

qed

Here is a related lemma:

2024-08-03

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