Omega-categorical theory mathematical logic , an omega-categorical theory is a theory that has exactly one countably infinite model up to isomorphism . Omega-categoricity is the special case κ = = ω of κ-categoricity , and omega-categorical theories are also referred to as ω-categorical . The notion is most important for countable first-order theories .Equivalent conditions for omega-categoricity Many conditions on a theory are equivalent to the property of omega-categoricity. In 1959 Erwin Engeler , Czesław Ryll-Nardzewski and Lars Svenonius , proved several independently. Despite this, the literature still widely refers to the Ryll-Nardzewski theorem as a name for these conditions. The conditions included with the theorem vary between authors.complete first-order theory T with infinite models, the following are equivalent: The theory T is omega-categorical. Every countable model of T has an oligomorphic automorphism group . Some countable model of T has an oligomorphic automorphism group . The theory T has a model which, for every natural number n , realizes only finitely many n -types, that is, the Stone space Sn is finite . For every natural number n , T has only finitely many n -types. For every natural number n , every n -type is isolated . For every natural number n , up to equivalence modulo T there are only finitely many formulas with n free variables , in other words, for every n , the n th Lindenbaum–Tarski algebra of T is finite. Every model of T is atomic . Every countable model of T is atomic. The theory T has a countable atomic and saturated model . The theory T has a saturated prime model .Examples theory of any countably infinite structure which is homogeneous over a finite relational language is omega-categorical. Hence, the following theories are omega-categorical:
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