Proof of Nuprl Lemma : inj_into

Step * 1 1 2 4 1 1 of Lemma inj_into_ocmon

1. g : GrpSig
2. h : OCMon
3. Assoc(|h|;*)
4. Ident(|h|;*;e)
5. Comm(|h|;*)
6. UniformlyRefl(|h|;x,y.↑(x ≤_b y))
7. UniformlyTrans(|h|;x,y.↑(x ≤_b y))
8. UniformlyAntiSym(|h|;x,y.↑(x ≤_b y))
9. Connex(|h|;x,y.↑(x ≤_b y))
10. Cancel(|h|;|h|;*)
11. ∀[z:|h|]. monot(|h|;x,y.↑(x ≤_b y);λw.(z * w))
12. f : |g| ⟶ |h|
13. ∀[a1,a2:|g|]. ((f (a1 * a2)) = ((f a1) * (f a2)) ∈ |h|)
14. (f e) = e ∈ |h|
15. Inj(|g|;|h|;f)
16. RelsIso(|g|;|h|;x,y.↑(x =_b y);x,y.↑(x =_b y);f)
17. RelsIso(|g|;|h|;x,y.↑(x ≤_b y);x,y.↑(x ≤_b y);f)
18. UniformLinorder(|g|;x,y.↑(x ≤_b y))
19. =_b = (λx,y. ((x ≤_b y) ∧_b (y ≤_b x))) ∈ (|g| ⟶ |g| ⟶ 𝔹)
20. Cancel(|g|;|g|;*)
21. z : |g|
22. a : |g|
⊢ (f (z * a)) = ((f z) * (f a)) ∈ |h|
BY
{ ((BHyp 13) THEN Auto) }

Latex:

Latex:
1. g : GrpSig 2. h : OCMon 3. Assoc(|h|;*) 4. Ident(|h|;*;e) 5. Comm(|h|;*) 6. UniformlyRefl(|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) 7. UniformlyTrans(|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) 8. UniformlyAntiSym(|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) 9. Connex(|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) 10. Cancel(|h|;|h|;*) 11. \mforall{}[z:|h|]. monot(|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y);\mlambda{}w.(z * w)) 12. f : |g| {}\mrightarrow{} |h| 13. \mforall{}[a1,a2:|g|]. ((f (a1 * a2)) = ((f a1) * (f a2))) 14. (f e) = e 15. Inj(|g|;|h|;f) 16. RelsIso(|g|;|h|;x,y.\muparrow{}(x =\msubb{} y);x,y.\muparrow{}(x =\msubb{} y);f) 17. RelsIso(|g|;|h|;x,y.\muparrow{}(x \mleq{}\msubb{} y);x,y.\muparrow{}(x \mleq{}\msubb{} y);f) 18. UniformLinorder(|g|;x,y.\muparrow{}(x \mleq{}\msubb{} y)) 19. =\msubb{} = (\mlambda{}x,y. ((x \mleq{}\msubb{} y) \mwedge{}\msubb{} (y \mleq{}\msubb{} x))) 20. Cancel(|g|;|g|;*) 21. z : |g| 22. a : |g| \mvdash{} (f (z * a)) = ((f z) * (f a)) By Latex: ((BHyp 13) THEN Auto) Home Index