On Superstable Expansions of Free Abelian Groups
classification
🧮 math.LO
keywords
superstableexpansionsequippedlascarrankabelianadditionallydefining
read the original abstract
We prove that $(\Z,+,0)$ has no proper superstable expansions of finite Lascar rank. Nevertheless, this structure equipped with a predicate defining powers of a given natural number is superstable of Lascar rank $\omega$. Additionally, our methods yield other superstable expansions such as $(\Z,+,0)$ equipped with the set of factorial elements.
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