Nuprl - Proof: same range sep inj eqv 1

(5steps total) PrintForm Definitions Lemmas DiscreteMath Sections DiscrMathExt Doc

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At: same range sep inj eqv 1

1. A : Type
2. B : Type

EquivRel on A inj

B, same_range_sep(A; B)

By:	(A inj B) (AB) By Def of A inj B THEN BackThru: equivrel characterization THEN GenUnivCD THEN OnAllClauses TryReduceSOAps THEN OnAllClauses TryReduce

Generated subgoals:

1 3. (A inj B)  (AB)
4. u : A inj B
  j:B. (i:A. u(i) = j)  (i:A. u(i) = j)
Auto

2 3. (A inj B)  (AB)
4. u : A inj B
5. v : A inj B
6. j:B. (i:A. u(i) = j)  (i:A. v(i) = j)
  j:B. (i:A. v(i) = j)  (i:A. u(i) = j)
1 step

3 3. (A inj B)  (AB)
4. u : A inj B
5. v : A inj B
6. j:B. (i:A. u(i) = j)  (i:A. v(i) = j)
7. z : A inj B
8. j:B. (i:A. v(i) = j)  (i:A. z(i) = j)
  j:B. (i:A. u(i) = j)  (i:A. z(i) = j)
1 step

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IF YOU CAN SEE THIS go to /sfa/Nuprl/Shared/Xindentation_hack_doc.html

(5steps total) PrintForm Definitions Lemmas DiscreteMath Sections DiscrMathExt Doc

1	3. (A inj B) (AB) 4. u : A inj B j:B. (i:A. u(i) = j) (i:A. u(i) = j)	Auto
2	3. (A inj B) (AB) 4. u : A inj B 5. v : A inj B 6. j:B. (i:A. u(i) = j) (i:A. v(i) = j) j:B. (i:A. v(i) = j) (i:A. u(i) = j)	1 step
3	3. (A inj B) (AB) 4. u : A inj B 5. v : A inj B 6. j:B. (i:A. u(i) = j) (i:A. v(i) = j) 7. z : A inj B 8. j:B. (i:A. v(i) = j) (i:A. z(i) = j) j:B. (i:A. u(i) = j) (i:A. z(i) = j)	1 step