Omega^2: Difference between revisions
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{{DISPLAYTITLE:\( \omega^2 \)}}
The ordinal \( \omega^2 \) is the least ordinal which is a limit of limit ordinals. It is also the growth rate of [[Conway chained arrows]] in the fast-growing hierarchy.▼
▲The ordinal \( \omega^2 \) is the least ordinal which is a limit of limit ordinals, as well as the second infinite additive principal ordinal. It is also equal to the proof-theoretic ordinal of rudimentary function arithmetic, and of Peano arithmetic with induction restricted to \( \Delta^0_0 \)-formulae. It is also the approximate growth rate of
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