User blog comment:Denis Maksudov/Slowly growing ordinal function and FS up to BHO./@comment-28606698-20170402064919/@comment-28606698-20170402112614

Here I mean ordinals less than $$\Omega_2$$. May be I am not correct but I defined in  post $$\Omega^alpha \beta+\gamma$$ as uncountable only if $$\gamma=0$$ and $$\alpha, \beta$$ are successors, otherwise $$\Omega^alpha \beta+\gamma$$is (as I defined) limit or successor ordinal. May be more correctly to write about confinality.