Step
*
of Lemma
unit-cube-to-unit-ball
∀n:ℕ+
∃g:ℝ^n ⟶ ℝ^n
((∀p:ℝ^n. (req-vec(n;p;λi.r0) ⇒ g p ≡ λi.r0))
∧ (∀p:{p:ℝ^n| r0 < ||p||} . g p ≡ (λp.(mdist(max-metric(n);λi.r0;p)/||p||)*p) p)
∧ (g ∈ {q:ℝ^n| mdist(max-metric(n);λi.r0;q) ≤ r1} ⟶ {q:ℝ^n| mdist(rn-metric(n);λi.r0;q) ≤ r1} )
∧ g:FUN(ℝ^n;ℝ^n))
BY
{ (Auto
THEN (InstLemma `max-metric-leq-rn-metric` [⌜n⌝]⋅ THENA Auto)
THEN (InstLemma `rn-metric-leq-max-metric` [⌜n⌝]⋅ THENA Auto)
THEN Assert ⌜∀p:ℝ^n. (r0 < ||p|| ⇐⇒ r0 < mdist(max-metric(n);λi.r0;p))⌝⋅) }
1
.....assertion.....
1. n : ℕ+
2. max-metric(n) ≤ rn-metric(n)
3. rn-metric(n) ≤ r(n)*max-metric(n)
⊢ ∀p:ℝ^n. (r0 < ||p|| ⇐⇒ r0 < mdist(max-metric(n);λi.r0;p))
2
1. n : ℕ+
2. max-metric(n) ≤ rn-metric(n)
3. rn-metric(n) ≤ r(n)*max-metric(n)
4. ∀p:ℝ^n. (r0 < ||p|| ⇐⇒ r0 < mdist(max-metric(n);λi.r0;p))
⊢ ∃g:ℝ^n ⟶ ℝ^n
((∀p:ℝ^n. (req-vec(n;p;λi.r0) ⇒ g p ≡ λi.r0))
∧ (∀p:{p:ℝ^n| r0 < ||p||} . g p ≡ (λp.(mdist(max-metric(n);λi.r0;p)/||p||)*p) p)
∧ (g ∈ {q:ℝ^n| mdist(max-metric(n);λi.r0;q) ≤ r1} ⟶ {q:ℝ^n| mdist(rn-metric(n);λi.r0;q) ≤ r1} )
∧ g:FUN(ℝ^n;ℝ^n))
Latex:
Latex:
\mforall{}n:\mBbbN{}\msupplus{}
\mexists{}g:\mBbbR{}\^{}n {}\mrightarrow{} \mBbbR{}\^{}n
((\mforall{}p:\mBbbR{}\^{}n. (req-vec(n;p;\mlambda{}i.r0) {}\mRightarrow{} g p \mequiv{} \mlambda{}i.r0))
\mwedge{} (\mforall{}p:\{p:\mBbbR{}\^{}n| r0 < ||p||\} . g p \mequiv{} (\mlambda{}p.(mdist(max-metric(n);\mlambda{}i.r0;p)/||p||)*p) p)
\mwedge{} (g \mmember{} \{q:\mBbbR{}\^{}n| mdist(max-metric(n);\mlambda{}i.r0;q) \mleq{} r1\} {}\mrightarrow{} \{q:\mBbbR{}\^{}n| mdist(rn-metric(n);\mlambda{}i.r0;q) \mleq{} r1\} )
\mwedge{} g:FUN(\mBbbR{}\^{}n;\mBbbR{}\^{}n))
By
Latex:
(Auto
THEN (InstLemma `max-metric-leq-rn-metric` [\mkleeneopen{}n\mkleeneclose{}]\mcdot{} THENA Auto)
THEN (InstLemma `rn-metric-leq-max-metric` [\mkleeneopen{}n\mkleeneclose{}]\mcdot{} THENA Auto)
THEN Assert \mkleeneopen{}\mforall{}p:\mBbbR{}\^{}n. (r0 < ||p|| \mLeftarrow{}{}\mRightarrow{} r0 < mdist(max-metric(n);\mlambda{}i.r0;p))\mkleeneclose{}\mcdot{})
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