Proof of Nuprl Lemma : IdNotHomotopicConst-implies-BrowerFPT

Step * 1 1 1 1 1 1 3 of Lemma IdNotHomotopicConst-implies-BrowerFPT

1. n : ℕ
2. g : B(n + 1) ⟶ B(n + 1)
3. ∀x,y:B(n + 1).  (req-vec(n + 1;x;y) ⇒ req-vec(n + 1;g x;g y))
4. ∀x:B(n + 1). (||g x|| = r1)
5. ∀x:B(n + 1). ((||x|| = r1) ⇒ req-vec(n + 1;g x;x))
6. ∀h:{h:B(n + 1) ⟶ B(n + 1)| ∀p,q:B(n + 1).  (req-vec(n + 1;p;q) ⇒ req-vec(n + 1;h p;h q))} . (g o h ∈ sphere-map(n))
7. ∀t:{t:ℝ| t ∈ [r0, r1]} . ∀p:B(n + 1).  (t*p ∈ B(n + 1))
8. ∀t:{t:ℝ| t ∈ [r0, r1]} . (λp.t*p ∈ B(n + 1) ⟶ B(n + 1))
9. ∀t:{t:ℝ| t ∈ [r0, r1]}
     (λp.t*p ∈ {h:B(n + 1) ⟶ B(n + 1)| ∀p,q:B(n + 1).  (req-vec(n + 1;p;q) ⇒ req-vec(n + 1;h p;h q))} )
10. ∀t:{t:ℝ| t ∈ [r0, r1]} . (g o (λp.t*p) ∈ sphere-map(n))
11. ∀t,s:{t:ℝ| t ∈ [r0, r1]} .  ((t = s) ⇒ sphere-map-eq(n;g o (λp.t*p);g o (λp.s*p)))
12. λi.r0 ∈ B(n + 1)
13. ∀p:S(n). req-vec(n + 1;(λt.(g o (λp.t*p))) r1 p;p)
14. ∃q:S(n). ∀p:S(n). req-vec(n + 1;(λt.(g o (λp.t*p))) r0 p;q)
15. t1 : {t:ℝ| t ∈ [r0, r1]}
16. t2 : {t:ℝ| t ∈ [r0, r1]}
17. p1 : S(n)
18. p2 : S(n)
19. t1 = t2
20. req-vec(n + 1;p1;p2)
⊢ req-vec(n + 1;(λt.(g o (λp.t*p))) t1 p1;(λt.(g o (λp.t*p))) t2 p2)
BY
{ (Reduce 0 THEN BackThruSomeHyp THEN RWO "-1 -2" 0 THEN EAuto 1) }

Latex:

Latex:
1. n : \mBbbN{} 2. g : B(n + 1) {}\mrightarrow{} B(n + 1) 3. \mforall{}x,y:B(n + 1). (req-vec(n + 1;x;y) {}\mRightarrow{} req-vec(n + 1;g x;g y)) 4. \mforall{}x:B(n + 1). (||g x|| = r1) 5. \mforall{}x:B(n + 1). ((||x|| = r1) {}\mRightarrow{} req-vec(n + 1;g x;x)) 6. \mforall{}h:\{h:B(n + 1) {}\mrightarrow{} B(n + 1)| \mforall{}p,q:B(n + 1). (req-vec(n + 1;p;q) {}\mRightarrow{} req-vec(n + 1;h p;h q))\} (g o h \mmember{} sphere-map(n)) 7. \mforall{}t:\{t:\mBbbR{}| t \mmember{} [r0, r1]\} . \mforall{}p:B(n + 1). (t*p \mmember{} B(n + 1)) 8. \mforall{}t:\{t:\mBbbR{}| t \mmember{} [r0, r1]\} . (\mlambda{}p.t*p \mmember{} B(n + 1) {}\mrightarrow{} B(n + 1)) 9. \mforall{}t:\{t:\mBbbR{}| t \mmember{} [r0, r1]\} (\mlambda{}p.t*p \mmember{} \{h:B(n + 1) {}\mrightarrow{} B(n + 1)| \mforall{}p,q:B(n + 1). (req-vec(n + 1;p;q) {}\mRightarrow{} req-vec(n + 1;h p;h q))\} ) 10. \mforall{}t:\{t:\mBbbR{}| t \mmember{} [r0, r1]\} . (g o (\mlambda{}p.t*p) \mmember{} sphere-map(n)) 11. \mforall{}t,s:\{t:\mBbbR{}| t \mmember{} [r0, r1]\} . ((t = s) {}\mRightarrow{} sphere-map-eq(n;g o (\mlambda{}p.t*p);g o (\mlambda{}p.s*p))) 12. \mlambda{}i.r0 \mmember{} B(n + 1) 13. \mforall{}p:S(n). req-vec(n + 1;(\mlambda{}t.(g o (\mlambda{}p.t*p))) r1 p;p) 14. \mexists{}q:S(n). \mforall{}p:S(n). req-vec(n + 1;(\mlambda{}t.(g o (\mlambda{}p.t*p))) r0 p;q) 15. t1 : \{t:\mBbbR{}| t \mmember{} [r0, r1]\} 16. t2 : \{t:\mBbbR{}| t \mmember{} [r0, r1]\} 17. p1 : S(n) 18. p2 : S(n) 19. t1 = t2 20. req-vec(n + 1;p1;p2) \mvdash{} req-vec(n + 1;(\mlambda{}t.(g o (\mlambda{}p.t*p))) t1 p1;(\mlambda{}t.(g o (\mlambda{}p.t*p))) t2 p2) By Latex: (Reduce 0 THEN BackThruSomeHyp THEN RWO "-1 -2" 0 THEN EAuto 1) Home Index