Proof of Nuprl Lemma : padic-ring

Step * 2 5 1 1 of Lemma padic-ring_wf

1. p : {2...}
2. ℤ(p) ∈ RngSig
3. ∀[x,y,z:p-adics(p)]. (x + y + z = x + y + z ∈ p-adics(p))
4. ∀[x:p-adics(p)]. ((x + 0(p) = x ∈ p-adics(p)) ∧ (0(p) + x = x ∈ p-adics(p)))
5. ∀[x:p-adics(p)]. ((x + -(x) = 0(p) ∈ p-adics(p)) ∧ (-(x) + x = 0(p) ∈ p-adics(p)))
6. ∀[x,y,z:p-adics(p)]. (x * y * z = x * y * z ∈ p-adics(p))
7. ∀[x:p-adics(p)]. ((x * 1(p) = x ∈ p-adics(p)) ∧ (1(p) * x = x ∈ p-adics(p)))

8. ∀[a,x,y:p-adics(p)].  ((a * x + y = a * x + a * y ∈ p-adics(p)) ∧ (x + y * a = x * a + y * a ∈ p-adics(p)))

9. ∀[x,y:p-adics(p)].  (x * y = y * x ∈ p-adics(p))
10. ∀a,b:basic-padic(p).  bpa-equiv(p;bpa-mul(p;a;b);pa-mul(p;a;b))
11. ∀a,b:basic-padic(p).  bpa-equiv(p;bpa-add(p;a;b);pa-add(p;a;b))
12. IsMonoid(padic(p);λu,v. pa-mul(p;u;v);1(p))
13. a : padic(p)
14. x : padic(p)
15. y : padic(p)
16. X1 : ℕ
17. X2 : p-adics(p)
18. Y1 : ℕ
19. Y2 : p-adics(p)
20. Z1 : ℕ
21. Z2 : p-adics(p)
22. M : ℤ
23. imax(X1;Y1) = M ∈ ℤ
⊢ ((X1 ≤ M) ∧ (Y1 ≤ M))
⇒ (p^(Z1 + M)(p) * Z2 * p^(M - X1)(p) * X2 + p^(Z1 + M)(p) * Z2 * p^(M - Y1)(p) * Y2

   = p^((Z1 + M) + ((Z1 + M) - Z1 + X1))(p) * Z2 * X2 + p^((Z1 + M) + ((Z1 + M) - Z1 + Y1))(p) * Z2 * Y2

   ∈ p-adics(p))
BY
{ (Intro
   THEN D -1
   THEN (Subst' (Z1 + M) + ((Z1 + M) - Z1 + X1) ~ (Z1 + M) + (M - X1) 0 THENA Auto)
   THEN (Subst' (Z1 + M) + ((Z1 + M) - Z1 + Y1) ~ (Z1 + M) + (M - Y1) 0 THENA Auto)
   THEN GenConclTerms  Auto [⌜M - X1⌝;⌜M - Y1⌝;⌜Z1 + M⌝]⋅) }

1
1. p : {2...}
2. ℤ(p) ∈ RngSig
3. ∀[x,y,z:p-adics(p)].  (x + y + z = x + y + z ∈ p-adics(p))
4. ∀[x:p-adics(p)]. ((x + 0(p) = x ∈ p-adics(p)) ∧ (0(p) + x = x ∈ p-adics(p)))
5. ∀[x:p-adics(p)]. ((x + -(x) = 0(p) ∈ p-adics(p)) ∧ (-(x) + x = 0(p) ∈ p-adics(p)))
6. ∀[x,y,z:p-adics(p)].  (x * y * z = x * y * z ∈ p-adics(p))
7. ∀[x:p-adics(p)]. ((x * 1(p) = x ∈ p-adics(p)) ∧ (1(p) * x = x ∈ p-adics(p)))

8. ∀[a,x,y:p-adics(p)].  ((a * x + y = a * x + a * y ∈ p-adics(p)) ∧ (x + y * a = x * a + y * a ∈ p-adics(p)))

9. ∀[x,y:p-adics(p)].  (x * y = y * x ∈ p-adics(p))
10. ∀a,b:basic-padic(p).  bpa-equiv(p;bpa-mul(p;a;b);pa-mul(p;a;b))
11. ∀a,b:basic-padic(p).  bpa-equiv(p;bpa-add(p;a;b);pa-add(p;a;b))
12. IsMonoid(padic(p);λu,v. pa-mul(p;u;v);1(p))
13. a : padic(p)
14. x : padic(p)
15. y : padic(p)
16. X1 : ℕ
17. X2 : p-adics(p)
18. Y1 : ℕ
19. Y2 : p-adics(p)
20. Z1 : ℕ
21. Z2 : p-adics(p)
22. M : ℤ
23. imax(X1;Y1) = M ∈ ℤ
24. X1 ≤ M
25. Y1 ≤ M
26. v : ℤ
27. (M - X1) = v ∈ ℤ
28. v1 : ℤ
29. (M - Y1) = v1 ∈ ℤ
30. v2 : ℤ
31. (Z1 + M) = v2 ∈ ℤ
⊢ p^v2(p) * Z2 * p^v(p) * X2 + p^v2(p) * Z2 * p^v1(p) * Y2
= p^(v2 + v)(p) * Z2 * X2 + p^(v2 + v1)(p) * Z2 * Y2
∈ p-adics(p)

Latex:

Latex:
1. p : \{2...\} 2. \mBbbZ{}(p) \mmember{} RngSig 3. \mforall{}[x,y,z:p-adics(p)]. (x + y + z = x + y + z) 4. \mforall{}[x:p-adics(p)]. ((x + 0(p) = x) \mwedge{} (0(p) + x = x)) 5. \mforall{}[x:p-adics(p)]. ((x + -(x) = 0(p)) \mwedge{} (-(x) + x = 0(p))) 6. \mforall{}[x,y,z:p-adics(p)]. (x * y * z = x * y * z) 7. \mforall{}[x:p-adics(p)]. ((x * 1(p) = x) \mwedge{} (1(p) * x = x)) 8. \mforall{}[a,x,y:p-adics(p)]. ((a * x + y = a * x + a * y) \mwedge{} (x + y * a = x * a + y * a)) 9. \mforall{}[x,y:p-adics(p)]. (x * y = y * x) 10. \mforall{}a,b:basic-padic(p). bpa-equiv(p;bpa-mul(p;a;b);pa-mul(p;a;b)) 11. \mforall{}a,b:basic-padic(p). bpa-equiv(p;bpa-add(p;a;b);pa-add(p;a;b)) 12. IsMonoid(padic(p);\mlambda{}u,v. pa-mul(p;u;v);1(p)) 13. a : padic(p) 14. x : padic(p) 15. y : padic(p) 16. X1 : \mBbbN{} 17. X2 : p-adics(p) 18. Y1 : \mBbbN{} 19. Y2 : p-adics(p) 20. Z1 : \mBbbN{} 21. Z2 : p-adics(p) 22. M : \mBbbZ{} 23. imax(X1;Y1) = M \mvdash{} ((X1 \mleq{} M) \mwedge{} (Y1 \mleq{} M)) {}\mRightarrow{} (p\^{}(Z1 + M)(p) * Z2 * p\^{}(M - X1)(p) * X2 + p\^{}(Z1 + M)(p) * Z2 * p\^{}(M - Y1)(p) * Y2 = p\^{}((Z1 + M) + ((Z1 + M) - Z1 + X1))(p) * Z2 * X2 + p\^{}((Z1 + M) + ((Z1 + M) - Z1 + Y1))(p) * Z2 * Y2) By Latex: (Intro THEN D -1 THEN (Subst' (Z1 + M) + ((Z1 + M) - Z1 + X1) \msim{} (Z1 + M) + (M - X1) 0 THENA Auto) THEN (Subst' (Z1 + M) + ((Z1 + M) - Z1 + Y1) \msim{} (Z1 + M) + (M - Y1) 0 THENA Auto) THEN GenConclTerms Auto [\mkleeneopen{}M - X1\mkleeneclose{};\mkleeneopen{}M - Y1\mkleeneclose{};\mkleeneopen{}Z1 + M\mkleeneclose{}]\mcdot{}) Home Index