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Title: Elementary Equivalence Post by 0.999... on Aug 6th, 2015, 7:31pm Show that the abelian group of integers Z is not elementarily equivalent to the abelian group Z+Z (direct sum). That is, find (show that there exists) a sentence involving the symbols +,*,0 (and =) that is true for one but not for the other. |
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Title: Re: Elementary Equivalence Post by Michael Dagg on Aug 30th, 2015, 3:54pm I thought someone might have taken this by now since it has interesting analogies in other areas and those ideas are very similar. Elementary equivalent means that any first-order sentence (logical - meaning in group theory language and using forall and there exists) that is true for one of the groups is true for the other. Elementary equivalence is weaker than isomorphism - in fact, strictly weaker but you are at liberty to think of it as an equivalence relation as it certainly is. In particular, the group Z is cyclic with generators +-1. So, you can contrive a sentence asserting this fact involving forall and there exists (not necessarily involving its generators). This will certainly be true in Z but not in Z+Z since Z+Z is not cyclic. |
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