Proof of Nuprl Lemma : subtype-fpf-cap-void2

Step * 1 of Lemma subtype-fpf-cap-void2

.....truecase.....
1. X : Type
2. eq : EqDecider(X)
3. f : x:X fp-> Type
4. g : x:X fp-> Type
5. x : X
6. z : if x ∈ dom(g) then g(x) else Void fi
7. ∀x:X. (((↑x ∈ dom(f)) ∧ (↑x ∈ dom(g))) ⇒ (f(x) = g(x) ∈ Type))
8. ↑x ∈ dom(f)
⊢ f(x) ⊆r if x ∈ dom(g) then g(x) else Void fi
BY
{ xxx(SplitOnConclITE THENA Auto)xxx }

1
.....truecase.....
1. X : Type
2. eq : EqDecider(X)
3. f : x:X fp-> Type
4. g : x:X fp-> Type
5. x : X
6. z : if x ∈ dom(g) then g(x) else Void fi
7. ∀x:X. (((↑x ∈ dom(f)) ∧ (↑x ∈ dom(g))) ⇒ (f(x) = g(x) ∈ Type))
8. ↑x ∈ dom(f)
9. ↑x ∈ dom(g)
⊢ f(x) ⊆r g(x)

2
.....falsecase.....
1. X : Type
2. eq : EqDecider(X)
3. f : x:X fp-> Type
4. g : x:X fp-> Type
5. x : X
6. z : if x ∈ dom(g) then g(x) else Void fi
7. ∀x:X. (((↑x ∈ dom(f)) ∧ (↑x ∈ dom(g))) ⇒ (f(x) = g(x) ∈ Type))
8. ↑x ∈ dom(f)
9. ¬↑x ∈ dom(g)
⊢ f(x) ⊆r Void

Latex:

Latex:
.....truecase..... 1. X : Type 2. eq : EqDecider(X) 3. f : x:X fp-> Type 4. g : x:X fp-> Type 5. x : X 6. z : if x \mmember{} dom(g) then g(x) else Void fi 7. \mforall{}x:X. (((\muparrow{}x \mmember{} dom(f)) \mwedge{} (\muparrow{}x \mmember{} dom(g))) {}\mRightarrow{} (f(x) = g(x))) 8. \muparrow{}x \mmember{} dom(f) \mvdash{} f(x) \msubseteq{}r if x \mmember{} dom(g) then g(x) else Void fi By Latex: xxx(SplitOnConclITE THENA Auto)xxx Home Index