Additively indecomposable ordinal

An ordinal ${\displaystyle \alpha }$ is called additively indecomposable if it is not 0 and for any ${\displaystyle \beta ,\gamma <\alpha }$, we have ${\displaystyle \beta +\gamma <\alpha .}$ The set of additively indecomposable ordinals is denoted ${\displaystyle \mathbb {H} .}$

Obviously ${\displaystyle 1\in \mathbb {H} }$, since ${\displaystyle 0+0<1.}$ No finite ordinal other than ${\displaystyle 1}$ is in ${\displaystyle \mathbb {H} .}$ Also, ${\displaystyle \omega \in \mathbb {H} }$, since the sum of two finite ordinals is still finite. More generally, every infinite cardinal is in ${\displaystyle \mathbb {H} .}$

${\displaystyle \mathbb {H} }$ is closed and unbounded, so the enumerating function of ${\displaystyle \mathbb {H} }$ is normal. In fact, ${\displaystyle f_{\mathbb {H} }(\alpha )=\omega ^{\alpha }.}$

The derivative ${\displaystyle f_{\mathbb {H} }^{\prime }(\alpha )}$ is written ${\displaystyle \epsilon _{\alpha }.}$ Ordinals of this form (that is, fixed points of ${\displaystyle f_{\mathbb {H} }}$) are called epsilon numbers. The number ${\displaystyle \epsilon _{0}=\omega ^{\omega ^{\omega ^{\cdot ^{\cdot ^{\cdot }}}}}}$ is therefore the first fixed point of the series ${\displaystyle \omega ,\omega ^{\omega }\!,\omega ^{\omega ^{\omega }}\!\!,\ldots }$

• Ordinal arithmetic

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