User blog comment:B1mb0w/Finite: a tour of the finite numbers/@comment-11227630-20160623112907

We haven't know much about the size of TREE(3) yet.

Now, as we know, a lower bound for TREE(3) is $$f_{\theta(\Omega^\omega,3)+\theta(\Omega^\omega,0)}(tree(tree(3)))$$, and an upper bound for TREE(3) (and TREE(TREE(...TREE(3)))) is SSCG(3).

So the claim that "TREE(3) is comparable to $$f_{LVO}(3)$$ (or $$f_{\vartheta(\Omega^\omega\omega)}(3)$$)" is wrong.