Proof of Nuprl Lemma : fset-ac-order

Step * 1 2 of Lemma fset-ac-order

1. T : Type
2. eq : EqDecider(T)
3. Trans({ac:fset(fset(T))| ↑fset-antichain(eq;ac)} ;ac1,ac2.fset-ac-le(eq;ac1;ac2))
4. ac1 : fset(fset(T))
5. ↑fset-antichain(eq;ac1)
6. ac2 : fset(fset(T))
7. ↑fset-antichain(eq;ac2)
8. fset-ac-le(eq;ac1;ac2)
9. fset-ac-le(eq;ac2;ac1)
10. a : fset(T)
11. a ∈ ac2
12. ∀a:fset(T). (a ∈ ac2 ⇒ (¬({y ∈ ac1 | deq-f-subset(eq) y a} = {} ∈ fset(fset(T)))))
13. ¬({y ∈ ac1 | deq-f-subset(eq) y a} = {} ∈ fset(fset(T)))
⊢ a ∈ ac1
BY
{ (SupposeNot
   THEN D -2
   THEN Using [`eq',⌜deq-fset(eq)⌝] (BLemma `fset-extensionality`)⋅
   THEN Auto
   THEN All Reduce
   THEN Auto) }

1
1. T : Type
2. eq : EqDecider(T)
3. Trans({ac:fset(fset(T))| ↑fset-antichain(eq;ac)} ;ac1,ac2.fset-ac-le(eq;ac1;ac2))
4. ac1 : fset(fset(T))
5. ↑fset-antichain(eq;ac1)
6. ac2 : fset(fset(T))
7. ↑fset-antichain(eq;ac2)
8. fset-ac-le(eq;ac1;ac2)
9. fset-ac-le(eq;ac2;ac1)
10. a : fset(T)
11. a ∈ ac2
12. ∀a:fset(T). (a ∈ ac2 ⇒ (¬({y ∈ ac1 | deq-f-subset(eq) y a} = {} ∈ fset(fset(T)))))
13. ¬a ∈ ac1
14. a1 : fset(T)
15. a1 ∈ {y ∈ ac1 | deq-f-subset(eq) y a}
⊢ False

Latex:

Latex:
1. T : Type 2. eq : EqDecider(T) 3. Trans(\{ac:fset(fset(T))| \muparrow{}fset-antichain(eq;ac)\} ;ac1,ac2.fset-ac-le(eq;ac1;ac2)) 4. ac1 : fset(fset(T)) 5. \muparrow{}fset-antichain(eq;ac1) 6. ac2 : fset(fset(T)) 7. \muparrow{}fset-antichain(eq;ac2) 8. fset-ac-le(eq;ac1;ac2) 9. fset-ac-le(eq;ac2;ac1) 10. a : fset(T) 11. a \mmember{} ac2 12. \mforall{}a:fset(T). (a \mmember{} ac2 {}\mRightarrow{} (\mneg{}(\{y \mmember{} ac1 | deq-f-subset(eq) y a\} = \{\}))) 13. \mneg{}(\{y \mmember{} ac1 | deq-f-subset(eq) y a\} = \{\}) \mvdash{} a \mmember{} ac1 By Latex: (SupposeNot THEN D -2 THEN Using [`eq',\mkleeneopen{}deq-fset(eq)\mkleeneclose{}] (BLemma `fset-extensionality`)\mcdot{} THEN Auto THEN All Reduce THEN Auto) Home Index