User blog:DatoXx8/my array notation

{n}=n^[n]n         n^[n]n=n^^^^...n arrows…^^n

{n,m}= {n,m} but m replece with {n,m-1} times

{n,m,o} =}}}}}

m can be ordinals as in FGH referes to n

{n,m,o,p}= {{{{{{{...{n,m,o,p-1}...{n,m,o,p-1}}}...{n,m,o,p-1}...}}}

n_0= n^[n]n!!!!!.....n^[n]n!!!!!.....n^[n]n!!!!!..............

'''        itterating n^[n]n!!!!...n !`s…! ='''

n_1 is ((((((n_0)_0)...n_0 times…._0)))

n_2 is ((((((n_1)_1)...n_1 times…._1)))

….

a_b_c= a_(a_(a_…a_b_c-1 times…(a_b))))))....)

a_b_c_d= a_b_(a_b_(a_b_(......a_b_c_d-1 times….a_b_c_d-1)))).....=)

….

=n[m]= n_n_n_n…….n[m-1] times…._n

n[m{a}]=n[n[n[n[n[.....n[m{a-1}] times……n[m{a-1]]]]....]]]

n[m{a\b}]=    n[m{a^[n[m{a]]b}]=(step 1)

step 2

step 1 but a replaced with step 1  2 times   

 step 3

step 2 but a replaced with step 2 3 times  

….till step b

n[m{a\b#c}] =

     

n[m{a\b}] but b replaced with n[m{a\b#c-1}]  n[m{a\b#c-1}] times