User blog comment:SuperSpruce/What do you think the growth rate of the Meameamealokkapowwa oompa is?/@comment-30990953-20190102211048

Hmm. I think in SAN:

{L,1} = {1,,1,2}

{L,2} = {1,,1{1,,1,2}2}

{L, X} = {1,,1{1,,1,,2}2}

{L, X^2} = {1{1,,1,,2}2,,1,,2}

{L, L} = {1,,1,2,,2}

{L, X, 2} = {1,,1,,1,2}

{L, X, 3} = {1,,1,,1,,1,2}

{L, X, X} = {1{2,,,2}2}

{L, X, 1, 2} = {1{1,,2,,,2}2}

{L, X (1) 2} = {1{1,,1,2,,,2}2}

{L, X (0,1) 2} = {1{1{2,,,2}2,,,2}2}

X^^X @ n = {1{1,,,3}2}

L2 = {1{1,,,1,2}2}

I do not know past L2, but I'm pretty sure pDAN can't reach meameamealokkapoowa oompa.

Reading from other pages, I think that meameamealokkapoowa is about s(10,100{1,,,1,,,2}2) and meameamealokkapoowa oompa is about s(10,100{1,,,1,,,3}2).