Proof of Nuprl Lemma : consensus-accum-num-property1

Step * 2 1 1 of Lemma consensus-accum-num-property1

.....assertion.....
1. V : Type
2. A : Id List@i
3. t : ℕ⁺@i
4. f : (V List) ─→ V@i
5. v0 : V@i
6. IdDeq ∈ EqDecider({b:Id| (b ∈ A)} )
7. ys : consensus-rcv(V;A) List@i
8. y2 : {b:Id| (b ∈ A)} @i
9. y4 : ℕ@i
10. y5 : V@i
11. v1 : 𝔹@i
12. v3 : ℤ@i
13. v5 : {a:Id| (a ∈ A)}  List@i
14. v7 : V List@i
15. v8 : V@i
16. (v3 - 1) ≤ y4
17. y4 ≤ (v3 - 1)
18. ¬(||remove-repeats(IdDeq;v5 @ [y2])|| = ((2 * t) + 1) ∈ ℤ)
19. filter(λr.v3 - 1 <z inning(r);ys) = [] ∈ (consensus-rcv(V;A) List)@i
20. ||v5|| = ||v7|| ∈ ℤ@i
21. zip(v5;v7) = votes-from-inning(v3 - 1;ys) ∈ (({b:Id| (b ∈ A)}  × V) List)@i
22. 0 ≤ v3@i
23. 1 ≤ v3 supposing ¬↑null(ys)@i
24. ||values-for-distinct(IdDeq;votes-from-inning(v3 - 1;ys))|| ≤ (2 * t)@i
⊢ map(λp.(fst(p));votes-from-inning(v3 - 1;ys)) = v5 ∈ ({a:Id| (a ∈ A)}  List)
BY
{ ((FLemma `unzip_zip` [-5] THENA Auto) THEN Unfold `unzip` -1 THEN AutoSimpHyp Auto (-1) THEN Auto) }

Latex:

.....assertion..... 1. V : Type 2. A : Id List@i 3. t : \mBbbN{}\msupplus{}@i 4. f : (V List) {}\mrightarrow{} V@i 5. v0 : V@i 6. IdDeq \mmember{} EqDecider(\{b:Id| (b \mmember{} A)\} ) 7. ys : consensus-rcv(V;A) List@i 8. y2 : \{b:Id| (b \mmember{} A)\} @i 9. y4 : \mBbbN{}@i 10. y5 : V@i 11. v1 : \mBbbB{}@i 12. v3 : \mBbbZ{}@i 13. v5 : \{a:Id| (a \mmember{} A)\} List@i 14. v7 : V List@i 15. v8 : V@i 16. (v3 - 1) \mleq{} y4 17. y4 \mleq{} (v3 - 1) 18. \mneg{}(||remove-repeats(IdDeq;v5 @ [y2])|| = ((2 * t) + 1)) 19. filter(\mlambda{}r.v3 - 1 <z inning(r);ys) = []@i 20. ||v5|| = ||v7||@i 21. zip(v5;v7) = votes-from-inning(v3 - 1;ys)@i 22. 0 \mleq{} v3@i 23. 1 \mleq{} v3 supposing \mneg{}\muparrow{}null(ys)@i 24. ||values-for-distinct(IdDeq;votes-from-inning(v3 - 1;ys))|| \mleq{} (2 * t)@i \mvdash{} map(\mlambda{}p.(fst(p));votes-from-inning(v3 - 1;ys)) = v5 By ((FLemma `unzip\_zip` [-5] THENA Auto) THEN Unfold `unzip` -1 THEN AutoSimpHyp Auto (-1) THEN Auto) Home Index