User blog comment:DrCeasium/Hyperfactorial array notation: Analysis part 2/@comment-5029411-20130525221507

Here more:

n![1,2(1)1,2] is growth order phi(1,1,0)*2

n![1,1,2(1)1,2] is growth order phi(1,1,0)^2

n![1,1,1,2(1)1,2] is growth order phi(1,1,0)^phi(1,1,0)

n![1,1,1,1,2(1)1,2] is growth order epsilon(phi(1,1,0)*2)

n![1,1,1,1,1,2(1)1,2] is growth order zeta(phi(1,1,0)*2)

n![1,1,1,1,1,1,2(1)1,2] is growth order eta(phi(1,1,0)*2)

n![1...1,2(1)1,2] /w [1(1)2] is growth order gamma(phi(1,1,0)+1)

n![1...1,2(1)1,2] /w [1(1)1,2] is growth order gamma(gamma(phi(1,1,0)+1))

n![1(1)2,2] is growth order phi(1,1,1)

n![1(1)alpha,2] is growth order phi(1,1,alpha-1)

n![1(1)1,3] is growth order phi(1,2,0)

n![1(1)1,alpha+1] is growth order phi(1,alpha,0)

n![1(1)1,1,2] is growth order phi(2,0,0)

n![1(1)1,1,alpha] is growth order phi(alpha,0,0)

n![1(1)1,1,1,2] is growth order phi(1,0,0,0)

n![1(1)1...1,2] /w [1] is growth order SVO

n![1(1)1...1,2] /w [1(1)2] is growth order theta(Omega^gamma(0))

n![1(1)1...1,2] /w [1(1)1...1,2] /w [1(1)2] is growth order theta(Omega^theta(Omega^gamma(0)))

n![1(1)1(1)2] is growth order LVO

And here fixed:

n![1...1,2(1)2] /w alpha is growth order phi(alpha,phi(1,1,0)*2)