Proof of Nuprl Lemma : free-group-generators

Step * 1 1 1 1 1 1 of Lemma free-group-generators

1. X : Type
2. G : Group{i}@i'
3. f : |free-group(X)| ⟶ |G|
4. IsMonHom{free-group(X),G}(f)
5. g : |free-group(X)| ⟶ |G|
6. IsMonHom{free-group(X),G}(g)
7. ∀x:X. ((f free-letter(x)) = (g free-letter(x)) ∈ |G|)
8. (X + X) List ∈ Type
9. ∀w1,w2:(X + X) List.  (word-equiv(X;w1;w2) ∈ Type)
10. ∀w1:(X + X) List. word-equiv(X;w1;w1)
11. EquivRel((X + X) List;w1,w2.word-equiv(X;w1;w2))
12. w1 : (X + X) List@i
13. w2 : (X + X) List@i
14. w : (X + X) List@i
15. λx,y. word-rel(X;x;y)^* w1 w
16. λx,y. word-rel(X;x;y)^* w2 w
⊢ (f w1) = (f w) ∈ |G|
BY
{ (ThinVar `w2'
   THEN ThinVar `g'
   THEN RepUR ``transitive-reflexive-closure`` -1
   THEN D -1
   THEN Try ((RWO  "-1" 0 THEN Auto))) }

1
1. X : Type
2. G : Group{i}@i'
3. f : |free-group(X)| ⟶ |G|
4. IsMonHom{free-group(X),G}(f)
5. (X + X) List ∈ Type
6. ∀w1,w2:(X + X) List.  (word-equiv(X;w1;w2) ∈ Type)
7. ∀w1:(X + X) List. word-equiv(X;w1;w1)
8. EquivRel((X + X) List;w1,w2.word-equiv(X;w1;w2))
9. w1 : (X + X) List@i
10. w : (X + X) List@i
11. TC(λx,y. word-rel(X;x;y)) w1 w
⊢ (f w1) = (f w) ∈ |G|

Latex:

Latex:
1. X : Type 2. G : Group\{i\}@i' 3. f : |free-group(X)| {}\mrightarrow{} |G| 4. IsMonHom\{free-group(X),G\}(f) 5. g : |free-group(X)| {}\mrightarrow{} |G| 6. IsMonHom\{free-group(X),G\}(g) 7. \mforall{}x:X. ((f free-letter(x)) = (g free-letter(x))) 8. (X + X) List \mmember{} Type 9. \mforall{}w1,w2:(X + X) List. (word-equiv(X;w1;w2) \mmember{} Type) 10. \mforall{}w1:(X + X) List. word-equiv(X;w1;w1) 11. EquivRel((X + X) List;w1,w2.word-equiv(X;w1;w2)) 12. w1 : (X + X) List@i 13. w2 : (X + X) List@i 14. w : (X + X) List@i 15. \mlambda{}x,y. word-rel(X;x;y)\^{}* w1 w 16. \mlambda{}x,y. word-rel(X;x;y)\^{}* w2 w \mvdash{} (f w1) = (f w) By Latex: (ThinVar `w2' THEN ThinVar `g' THEN RepUR ``transitive-reflexive-closure`` -1 THEN D -1 THEN Try ((RWO "-1" 0 THEN Auto))) Home Index