Proof of Nuprl Lemma : ip-extend-lemma

Step * 1 1 2 1 2 of Lemma ip-extend-lemma

1. rv : InnerProductSpace
2. a : Point(rv)
3. b : {b:Point(rv)| a # b}
4. dcd : {d:ℝ| r0 ≤ d}
5. r0 < ||a - b||
6. r0 ≤ dcd
7. (-(dcd)/||a - b||) = (r1 - (||a - b|| + dcd/||a - b||))
8. a ≡ (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
⇒ b ≡ (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
9. a # (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
10. r0 < (||a - b|| + dcd)
11. (dcd/||a - b|| + dcd) ∈ [r0, r1]

⊢ b ≡ (dcd/||a - b|| + dcd)*a + r1 - (dcd/||a - b|| + dcd)*(||a - b|| + dcd/||a - b||)*b + r1 - (||a - b||

+ dcd/||a - b||)*a
BY
{ ((MoveToConcl (-2) THEN MoveToConcl 5 THEN (GenConcl ⌜||a - b|| = dab ∈ ℝ⌝⋅ THENA Auto))
THEN GenConclTerm ⌜dab + dcd⌝⋅
THEN Auto) }

1
1. rv : InnerProductSpace
2. a : Point(rv)
3. b : {b:Point(rv)| a # b}
4. dcd : {d:ℝ| r0 ≤ d}
5. r0 ≤ dcd
6. (-(dcd)/||a - b||) = (r1 - (||a - b|| + dcd/||a - b||))
7. a ≡ (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
⇒ b ≡ (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
8. a # (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a
9. (dcd/||a - b|| + dcd) ∈ [r0, r1]
10. dab : ℝ
11. ||a - b|| = dab ∈ ℝ
12. v : ℝ
13. (dab + dcd) = v ∈ ℝ
14. r0 < dab
15. r0 < v
⊢ b ≡ (dcd/v)*a + r1 - (dcd/v)*(v/dab)*b + r1 - (v/dab)*a

Latex:

Latex:
1. rv : InnerProductSpace 2. a : Point(rv) 3. b : \{b:Point(rv)| a \# b\} 4. dcd : \{d:\mBbbR{}| r0 \mleq{} d\} 5. r0 < ||a - b|| 6. r0 \mleq{} dcd 7. (-(dcd)/||a - b||) = (r1 - (||a - b|| + dcd/||a - b||)) 8. a \mequiv{} (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a {}\mRightarrow{} b \mequiv{} (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a 9. a \# (||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a 10. r0 < (||a - b|| + dcd) 11. (dcd/||a - b|| + dcd) \mmember{} [r0, r1] \mvdash{} b \mequiv{} (dcd/||a - b|| + dcd)*a + r1 - (dcd/||a - b|| + dcd)*(||a - b|| + dcd/||a - b||)*b + r1 - (||a - b|| + dcd/||a - b||)*a By Latex: ((MoveToConcl (-2) THEN MoveToConcl 5 THEN (GenConcl \mkleeneopen{}||a - b|| = dab\mkleeneclose{}\mcdot{} THENA Auto)) THEN GenConclTerm \mkleeneopen{}dab + dcd\mkleeneclose{}\mcdot{} THEN Auto) Home Index