Proof of Nuprl Lemma : es-prior-fixedpoints-unequal

Step * 1 1 2 2 1 of Lemma es-prior-fixedpoints-unequal

1. [Info] : Type
2. [es] : EO+(Info)
3. [X] : EClass(Top)
4. [f] : E(X) ─→ E(X)
5. [%] : ∀x:E(X). f x c≤ x
6. [e] : E(X)
7. [e'] : E(X)
8. [%1] : (e' ∈ prior-f-fixedpoints(e))
9. [%2] : ¬(e' = f**(e) ∈ E)
10. last(prior-f-fixedpoints(e)) = f**(e) ∈ E(X)
11. last(prior-f-fixedpoints(e')) = f**(e') ∈ E(X)
12. f**(e') = e' ∈ E(X)
13. ¬(last(prior-f-fixedpoints(e')) = last(prior-f-fixedpoints(e)) ∈ E(X))
⊢ ¬(last(prior-f-fixedpoints(e)) ∈ prior-f-fixedpoints(e'))
BY
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1
1. Info : Type
2. es : EO+(Info)
3. X : EClass(Top)
4. f : E(X) ─→ E(X)
5. ∀x:E(X). f x c≤ x
6. e : E(X)
7. e' : E(X)
8. (e' ∈ prior-f-fixedpoints(e))
9. ¬(e' = f**(e) ∈ E)
10. last(prior-f-fixedpoints(e)) = f**(e) ∈ E(X)
11. last(prior-f-fixedpoints(e')) = f**(e') ∈ E(X)
12. f**(e') = e' ∈ E(X)
13. ¬(last(prior-f-fixedpoints(e')) = last(prior-f-fixedpoints(e)) ∈ E(X))
⊢ ¬(last(prior-f-fixedpoints(e)) ∈ prior-f-fixedpoints(e'))

2
.....wf.....
1. Info : Type
2. es : EO+(Info)
3. X : EClass(Top)
4. f : E(X) ─→ E(X)
5. ∀x:E(X). f x c≤ x
6. e : E(X)
7. e' : E(X)
8. (e' ∈ prior-f-fixedpoints(e))
9. ¬(e' = f**(e) ∈ E)
10. last(prior-f-fixedpoints(e)) = f**(e) ∈ E(X)
11. last(prior-f-fixedpoints(e')) = f**(e') ∈ E(X)
12. f**(e') = e' ∈ E(X)
13. ¬(last(prior-f-fixedpoints(e')) = last(prior-f-fixedpoints(e)) ∈ E(X))
⊢ (last(prior-f-fixedpoints(e)) ∈ prior-f-fixedpoints(e')) ∈ ℙ

Latex:

Latex:
1. [Info] : Type 2. [es] : EO+(Info) 3. [X] : EClass(Top) 4. [f] : E(X) {}\mrightarrow{} E(X) 5. [\%] : \mforall{}x:E(X). f x c\mleq{} x 6. [e] : E(X) 7. [e'] : E(X) 8. [\%1] : (e' \mmember{} prior-f-fixedpoints(e)) 9. [\%2] : \mneg{}(e' = f**(e)) 10. last(prior-f-fixedpoints(e)) = f**(e) 11. last(prior-f-fixedpoints(e')) = f**(e') 12. f**(e') = e' 13. \mneg{}(last(prior-f-fixedpoints(e')) = last(prior-f-fixedpoints(e))) \mvdash{} \mneg{}(last(prior-f-fixedpoints(e)) \mmember{} prior-f-fixedpoints(e')) By Latex: Unhide Home Index