Automatic Ordinals
Abstract
We prove that the injectively omega-tree-automatic ordinals are the ordinals smaller than ωωω. Then we show that the injectively ωn-automatic ordinals, where n>0 is an integer, are the ordinals smaller than ωωn. This strengthens a recent result of Schlicht and Stephan who considered in [Schlicht-Stephan11] the subclasses of finite word ωn-automatic ordinals. As a by-product we obtain that the hierarchy of injectively ωn-automatic structures, n>0, which was considered in [Finkel-Todorcevic12], is strict.
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