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I'm wondering how embedding works for "there exists" (∃) and "for all" (∀) in predicate calculus. Specifically, I'm trying to use existential instantiation (EI) and existential generalization (EG) to formally show that ∃x∃y(R(x,y)) --> ∃y∃x(R(x,y)).

Not looking for the whole proof. But some hints as to how embedding works with these entities (and how to get started with the proof) would be a huge help!

Thanks in advance.

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closed as off topic by Oliver Charlesworth, Femaref, Scott Wisniewski, Dour High Arch, Graviton Feb 24 '11 at 1:15

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Probably better at math.stackexchange.com or cstheory.stackexchange.com... –  Oliver Charlesworth Feb 23 '11 at 21:57
probably better suited for math. –  Femaref Feb 23 '11 at 21:57
I'm unsure that it is. Please compare: physicsforums.com/showthread.php?t=84099 –  Carnotaurus Feb 23 '11 at 22:04

1 Answer 1

up vote 0 down vote accepted

The statement reads "For some x and some y, if there is a relationship between them, then we can deduce that there is a relationship between some x and some y".

Hope that helps a bit

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