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Ok, I have the given relation: If F(x) is not true then no case satisfies G(x) and H(y,x). ((∀x ¬F(x)) ⇒¬(∀y G(y) ˄ H(y,x)))

Now, Can I possibly convert this into: (∀y G(y) ˄ H(y,x))) ⇒ ((∀x F(x)) ????

If not, the left hand side essentially has to imply: If F(x) is not true.... Mentions nothing about the For All or Existential Quantifiers. Can I take the negation outside of the Quantifier i.e. put it as (¬(∀x F(x)), because this makes the job much easier???

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A proper place to ask this question is math.stackexchange.com. –  Petr Pudlák Sep 26 '12 at 19:39

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up vote 2 down vote accepted

I'm not sure this is the right place but, no you can't. Moving the negation out would change the quantifier. Also, the initial formula may not be what you want: the last x is a free variable.

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I see, what if this was the statement now?(∀x ¬F(x)) ⇒¬(∃ y G(y)) ˄ H(y,x))? Sorry, I made an error before... –  gran_profaci Sep 26 '12 at 19:48
All you need here is two basic equivalences. Apologies for the notation: (1) ∀x ¬F = ¬ ∃x F (2) F ⇒ G = ¬ F v G. You can easily find out the answer by yourself :) –  NotAUser Sep 27 '12 at 15:13

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