Step
*
2
1
of Lemma
apply-exception-type
1. T : Type
2. a : Base
3. b : Base
4. c : a = b ∈ T
5. B : Top
6. is-exception(a)
7. is-exception(b)
⊢ (a B ~ a) = (b B ~ b) ∈ Type
BY
{ (SquashConcl THEN ExceptionSqequal (-1) THEN HypSubst' (-1) 0) }
1
1. T : Type
2. a : Base
3. b : Base
4. c : a = b ∈ T
5. B : Top
6. is-exception(a)
7. is-exception(b)
8. u : Base
9. v : Base
10. b ~ exception(u; v)
⊢ ↓(a B ~ a) = ((exception(u; v)) B ~ exception(u; v)) ∈ Type
Latex:
Latex:
1. T : Type
2. a : Base
3. b : Base
4. c : a = b
5. B : Top
6. is-exception(a)
7. is-exception(b)
\mvdash{} (a B \msim{} a) = (b B \msim{} b)
By
Latex:
(SquashConcl THEN ExceptionSqequal (-1) THEN HypSubst' (-1) 0)
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