Proof of Nuprl Lemma : kernel-trans-from-kernel

Step * of Lemma kernel-trans-from-kernel

∀rv:InnerProductSpace. ∀e:{e:Point| e^2 = r1} . ∀f,g:{h:Point| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ.
  (trans-kernel-fun(rv;e;f)
  ⇒ (∀h:{h:Point| h ⋅ e = r0} . ∀r:ℝ.  ((f h (g h r)) = r))
  ⇒ (∀h:{h:Point| h ⋅ e = r0} . ∀t:ℝ.  (ρ(h;t) = (f h t))))
BY
{ (Auto
   THEN (InstLemma `kernel-fun-properties` [⌜rv⌝;⌜e⌝;⌜f⌝]⋅ THENA Auto)
   THEN ExRepD
   THEN RepeatFor 2 (Thin (-1))
   THEN (D -1 With ⌜g⌝  THENA Auto)
   THEN RepeatFor 2 ((D -1 THENA Auto))
   THEN D 5
   THEN ExRepD) }

1
1. rv : InnerProductSpace
2. e : {e:Point| e^2 = r1}
3. f : {h:Point| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
4. g : {h:Point| h ⋅ e = r0}  ⟶ ℝ ⟶ ℝ
5. ∀h1,h2:{h:Point| h ⋅ e = r0} . ∀t1,t2:ℝ.  (f h1 t1 ≠ f h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
6. ∀h:{h:Point| h ⋅ e = r0} . ((f h r0) = r0)
7. ∀h:{h:Point| h ⋅ e = r0} . ∀t1,t2:ℝ.  ((t1 < t2) ⇒ ((f h t1) < (f h t2)))
8. ∀h:{h:Point| h ⋅ e = r0} . ∀r:ℝ.  ∃t:ℝ. ((f h t) = r)
9. ∀h:{h:Point| h ⋅ e = r0} . ∀r:ℝ.  ((f h (g h r)) = r)
10. h : {h:Point| h ⋅ e = r0}
11. t : ℝ
12. ∀h1,h2:{h:Point| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((f h1 t1) = (f h2 t2)))
13. ∀h1,h2:{h:Point| h ⋅ e = r0} . ∀t1,t2:ℝ.  (g h1 t1 ≠ g h2 t2 ⇒ (h1 # h2 ∨ t1 ≠ t2))
14. ∀h1,h2:{h:Point| h ⋅ e = r0} . ∀t1,t2:ℝ.  (h1 ≡ h2 ⇒ (t1 = t2) ⇒ ((g h1 t1) = (g h2 t2)))
⊢ ρ(h;t) = (f h t)

Latex:

Latex:
\mforall{}rv:InnerProductSpace. \mforall{}e:\{e:Point| e\^{}2 = r1\} . \mforall{}f,g:\{h:Point| h \mcdot{} e = r0\} {}\mrightarrow{} \mBbbR{} {}\mrightarrow{} \mBbbR{}. (trans-kernel-fun(rv;e;f) {}\mRightarrow{} (\mforall{}h:\{h:Point| h \mcdot{} e = r0\} . \mforall{}r:\mBbbR{}. ((f h (g h r)) = r)) {}\mRightarrow{} (\mforall{}h:\{h:Point| h \mcdot{} e = r0\} . \mforall{}t:\mBbbR{}. (\mrho{}(h;t) = (f h t)))) By Latex: (Auto THEN (InstLemma `kernel-fun-properties` [\mkleeneopen{}rv\mkleeneclose{};\mkleeneopen{}e\mkleeneclose{};\mkleeneopen{}f\mkleeneclose{}]\mcdot{} THENA Auto) THEN ExRepD THEN RepeatFor 2 (Thin (-1)) THEN (D -1 With \mkleeneopen{}g\mkleeneclose{} THENA Auto) THEN RepeatFor 2 ((D -1 THENA Auto)) THEN D 5 THEN ExRepD) Home Index