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I want to prove that the proof system A is not complete. A consists of these axioms:

1. Y subset or equal X => X->Y
2. X->Y and Y->Z   =>  X->Z (Transitive relation)

Therefore, I thought that I needed to prove that the axiom: X->Y => XZ->YZ cannot be proven using the axioms above. I thought about proving this using induction but I'm not sure how.

I could say that the base is: X->Y therefore XZ->YZ cannot be proven. But what about the rest?

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3 seems like a better fit for this question ??? –  Erwin Smout Jun 3 '14 at 10:27

1 Answer 1

You want to prove that A is not complete with respect to what?

The rule X->Y => XZ->YZ can be proved using the proof system A. You go by induction with respect to size of the proof of X->Y.

  • Base case: if X->Y follows from 1. then XZ->YZ follows from 1 (YZ is a subset of XZ).
  • Step: if X->Y follows from 2. with X->B, B->Y as premises, then XZ->BZ and BZ->YZ follow from the induction step. The apply rule 2. again and you get XZ->YZ. QED
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