A note on one-variable theorems for NSOP
Abstract
We give an example of an SOP theory T, such that any L(M)-formula (x,y) with |y|=1 is NSOP. We show that any such T must have the independence property. We also give a simplified proof of Lachlan's theorem that if every L-formula (x,y) with |x|=1 is NSOP, then T is NSOP.
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