Connected Reduced Products

Abstract

If is a binary relation on a set X, the structure X= X, is connected iff the minimal equivalence relation containing is the full relation on X. We show that, for a set I the following conditions are equivalent (a) |I| is less than the first measurable cardinal, (b) For each filter ⊂ P(I) and each family \ Xi :i∈ I\ of binary structures, the reduced product Π Xi is connected, iff there are a finite set K⊂ I and n∈ ω such that Xi is connected, for each i∈ K, and \ i∈ I: Xi is of diameter ≤ n\ K∈ , (c)The ultraproduct Π U Gω is a disconnected graph for each non-principal ultrafilter U⊂ P(I), where Gω is the linear graph on ω. Moreover, the implication "" in (b) holds in ZFC.

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