Metamath Proof Explorer


Theorem axc11r

Description: Same as axc11 but with reversed antecedent. Note the use of ax-12 (and not merely ax12v as in axc11rv ).

This theorem is mostly used to eliminate conditions requiring set variables be distinct (cf. cbvaev and aecom , for example) in proofs. In practice, theorems beyond elementary set theory do not really benefit from such eliminations. As of 2024, it is used in conjunction with ax-13 only, and like that, it should be applied only in niches where indispensable. (Contributed by NM, 25-Jul-2015)

Ref Expression
Assertion axc11r y y = x x φ y φ

Proof

Step Hyp Ref Expression
1 ax-12 y = x x φ y y = x φ
2 1 sps y y = x x φ y y = x φ
3 pm2.27 y = x y = x φ φ
4 3 al2imi y y = x y y = x φ y φ
5 2 4 syld y y = x x φ y φ