Proof of Nuprl Lemma : bpa-equiv-iff-norm

Step * 1 2 2 1 4 of Lemma bpa-equiv-iff-norm

1. p : {2...}
2. EquivRel(basic-padic(p);x,y.bpa-equiv(p;x;y))
3. ∀x:basic-padic(p). bpa-equiv(p;x;bpa-norm(p;x))
4. n : {1...}
5. a : p-adics(p)
6. a n ≠ 0
7. m : {1...}
8. b : p-adics(p)
9. b m ≠ 0
10. p^m(p) * a = p^n(p) * b ∈ p-adics(p)

⊢ let k,b = p-unitize(p;a;n) in <n - k, b> = let k,b = p-unitize(p;b;m) in <m - k, b> ∈ (ℕ × p-adics(p))

BY
{ GenConclTerms Auto [⌜p-unitize(p;a;n)⌝;⌜p-unitize(p;b;m)⌝]⋅ }

1
1. p : {2...}
2. EquivRel(basic-padic(p);x,y.bpa-equiv(p;x;y))
3. ∀x:basic-padic(p). bpa-equiv(p;x;bpa-norm(p;x))
4. n : {1...}
5. a : p-adics(p)
6. a n ≠ 0
7. m : {1...}
8. b : p-adics(p)
9. b m ≠ 0
10. p^m(p) * a = p^n(p) * b ∈ p-adics(p)
11. v : k:ℕn + 1 × {b:p-units(p)| p^k(p) * b = a ∈ p-adics(p)}
12. p-unitize(p;a;n) = v ∈ (k:ℕn + 1 × {b:p-units(p)| p^k(p) * b = a ∈ p-adics(p)} )
13. v1 : k:ℕm + 1 × {b1:p-units(p)| p^k(p) * b1 = b ∈ p-adics(p)}
14. p-unitize(p;b;m) = v1 ∈ (k:ℕm + 1 × {b1:p-units(p)| p^k(p) * b1 = b ∈ p-adics(p)} )
⊢ let k,b = v in <n - k, b> = let k,b = v1 in <m - k, b> ∈ (ℕ × p-adics(p))

Latex:

Latex:
1. p : \{2...\} 2. EquivRel(basic-padic(p);x,y.bpa-equiv(p;x;y)) 3. \mforall{}x:basic-padic(p). bpa-equiv(p;x;bpa-norm(p;x)) 4. n : \{1...\} 5. a : p-adics(p) 6. a n \mneq{} 0 7. m : \{1...\} 8. b : p-adics(p) 9. b m \mneq{} 0 10. p\^{}m(p) * a = p\^{}n(p) * b \mvdash{} let k,b = p-unitize(p;a;n) in <n - k, b> = let k,b = p-unitize(p;b;m) in <m - k, b> By Latex: GenConclTerms Auto [\mkleeneopen{}p-unitize(p;a;n)\mkleeneclose{};\mkleeneopen{}p-unitize(p;b;m)\mkleeneclose{}]\mcdot{} Home Index