Abstract
Given a sequence { αn } in (0,1) converging to a rational, we examine the model theoretic properties of structures obtained as limits of Shelah—Spencer graphs G(m, m-αn). We show that in most cases the model theory is either extremely well-behaved or extremely wild, and characterize when each occurs.
Citation
Justin Brody. M. C. Laskowski. "On rational limits of Shelah—Spencer graphs." J. Symbolic Logic 77 (2) 580 - 592, June 2012. https://doi.org/10.2178/jsl/1333566638
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