Proof of Nuprl Lemma : path-comp-property

Step * 1 1 2 1 2 of Lemma path-comp-property_functionality

1. [X] : SeparationSpace
2. [Y] : SeparationSpace
3. f1 : Point(X ⟶ Y)
4. g1 : Point(Y ⟶ X)
5. ∀x:Point(X). g1(f1(x)) ≡ x
6. ∀y:Point(Y). f1(g1(y)) ≡ y
7. ∀f,g:Point(Path(X)). (f@r1 ≡ g@r0 ⇒ (∃h:Point(Path(X)). path-comp-rel(X;f;g;h)))
8. f : Point(Path(Y))
9. g : Point(Path(Y))
10. f@r1 ≡ g@r0
11. h : Point(Path(X))
12. ∀t:{x:ℝ| x ∈ [r0, (r1/r(2))]} . h@t ≡ ss-comp(g1;f)@r(2) * t
13. ∀t:{x:ℝ| x ∈ [(r1/r(2)), r1]} . h@t ≡ ss-comp(g1;g)@(r(2) * t) - r1
14. t : {x:ℝ| x ∈ [(r1/r(2)), r1]}
15. h@t ≡ ss-comp(g1;g)@(r(2) * t) - r1
⊢ ss-comp(f1;h)@t ≡ g@(r(2) * t) - r1
BY
{ ((Assert (r(2) * t) - r1 ∈ {t:ℝ| (r0 ≤ t) ∧ (t ≤ r1)} BY

          (DVar `t' THEN All Reduce THEN (MemTypeCD THEN Auto) THEN nRMul ⌜r(2)⌝ (-3)⋅ THEN Auto))

   THEN (Assert t ∈ {t:ℝ| (r0 ≤ t) ∧ (t ≤ r1)}  BY
               ((DVar `t' THEN All Reduce) THEN MemTypeCD THEN Auto))
   ) }

1
1. [X] : SeparationSpace
2. [Y] : SeparationSpace
3. f1 : Point(X ⟶ Y)
4. g1 : Point(Y ⟶ X)
5. ∀x:Point(X). g1(f1(x)) ≡ x
6. ∀y:Point(Y). f1(g1(y)) ≡ y
7. ∀f,g:Point(Path(X)).  (f@r1 ≡ g@r0 ⇒ (∃h:Point(Path(X)). path-comp-rel(X;f;g;h)))
8. f : Point(Path(Y))
9. g : Point(Path(Y))
10. f@r1 ≡ g@r0
11. h : Point(Path(X))
12. ∀t:{x:ℝ| x ∈ [r0, (r1/r(2))]} . h@t ≡ ss-comp(g1;f)@r(2) * t
13. ∀t:{x:ℝ| x ∈ [(r1/r(2)), r1]} . h@t ≡ ss-comp(g1;g)@(r(2) * t) - r1
14. t : {x:ℝ| x ∈ [(r1/r(2)), r1]}
15. h@t ≡ ss-comp(g1;g)@(r(2) * t) - r1
16. (r(2) * t) - r1 ∈ {t:ℝ| (r0 ≤ t) ∧ (t ≤ r1)}
17. t ∈ {t:ℝ| (r0 ≤ t) ∧ (t ≤ r1)}
⊢ ss-comp(f1;h)@t ≡ g@(r(2) * t) - r1

Latex:

Latex:
1. [X] : SeparationSpace 2. [Y] : SeparationSpace 3. f1 : Point(X {}\mrightarrow{} Y) 4. g1 : Point(Y {}\mrightarrow{} X) 5. \mforall{}x:Point(X). g1(f1(x)) \mequiv{} x 6. \mforall{}y:Point(Y). f1(g1(y)) \mequiv{} y 7. \mforall{}f,g:Point(Path(X)). (f@r1 \mequiv{} g@r0 {}\mRightarrow{} (\mexists{}h:Point(Path(X)). path-comp-rel(X;f;g;h))) 8. f : Point(Path(Y)) 9. g : Point(Path(Y)) 10. f@r1 \mequiv{} g@r0 11. h : Point(Path(X)) 12. \mforall{}t:\{x:\mBbbR{}| x \mmember{} [r0, (r1/r(2))]\} . h@t \mequiv{} ss-comp(g1;f)@r(2) * t 13. \mforall{}t:\{x:\mBbbR{}| x \mmember{} [(r1/r(2)), r1]\} . h@t \mequiv{} ss-comp(g1;g)@(r(2) * t) - r1 14. t : \{x:\mBbbR{}| x \mmember{} [(r1/r(2)), r1]\} 15. h@t \mequiv{} ss-comp(g1;g)@(r(2) * t) - r1 \mvdash{} ss-comp(f1;h)@t \mequiv{} g@(r(2) * t) - r1 By Latex: ((Assert (r(2) * t) - r1 \mmember{} \{t:\mBbbR{}| (r0 \mleq{} t) \mwedge{} (t \mleq{} r1)\} BY (DVar `t' THEN All Reduce THEN (MemTypeCD THEN Auto) THEN nRMul \mkleeneopen{}r(2)\mkleeneclose{} (-3)\mcdot{} THEN Auto)) THEN (Assert t \mmember{} \{t:\mBbbR{}| (r0 \mleq{} t) \mwedge{} (t \mleq{} r1)\} BY ((DVar `t' THEN All Reduce) THEN MemTypeCD THEN Auto)) ) Home Index