Proof of Nuprl Lemma : sqeq-copath5

Step * 4 2 of Lemma sqeq-copath5

1. n : Base
2. m : Base
3. is-exception((m - n - 1) + (-1))
4. is-exception(m - n - 1)
5. u : Base
6. v : Base
7. m - n - 1 ~ exception(u; v)
⊢ m - n - 1 - 1 ≤ (m + 1) - n - 1
BY
{ (ExceptionCases (-1) THEN Try (ExceptionSqequal (-1))) }

1
1. n : Base
2. m : Base
3. is-exception((m - n - 1) + (-1))
4. is-exception(m - n - 1)
5. u : Base
6. v : Base
7. m - n - 1 ~ exception(u; v)
8. is-exception(m + (-(n - 1)))
9. m ∈ ℤ
10. is-exception(-(n - 1))
11. u1 : Base
12. v1 : Base
13. -(n - 1) ~ exception(u1; v1)
⊢ m - n - 1 - 1 ≤ (m + 1) - n - 1

2
1. n : Base
2. m : Base
3. is-exception((m - n - 1) + (-1))
4. is-exception(m - n - 1)
5. u : Base
6. v : Base
7. m - n - 1 ~ exception(u; v)
8. is-exception(m + (-(n - 1)))
9. is-exception(m)
10. u1 : Base
11. v1 : Base
12. m ~ exception(u1; v1)
⊢ m - n - 1 - 1 ≤ (m + 1) - n - 1

Latex:

Latex:
1. n : Base 2. m : Base 3. is-exception((m - n - 1) + (-1)) 4. is-exception(m - n - 1) 5. u : Base 6. v : Base 7. m - n - 1 \msim{} exception(u; v) \mvdash{} m - n - 1 - 1 \mleq{} (m + 1) - n - 1 By Latex: (ExceptionCases (-1) THEN Try (ExceptionSqequal (-1))) Home Index