User blog:Boboris02/Compearing BHAN to FGH

My new notation (Boris's hyper array notation) seems to go quite far!

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BHAN
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Approximation in FGH

 * \(//a,b//\)
 * \(f_2(n)\)
 * \(//a,b,2//\)
 * \(f_3(n)\)
 * \(//a,b,3//\)
 * \(f_4(n)\)
 * \(//a,b,c//\)
 * \(f_{\omega}(n)\)
 * \(//a,b,c,2//\)
 * \(f_{\omega+1}(n)\)
 * \(//a,b,c,3//\)
 * \(f_{\omega+2}(n)\)
 * \(//a,b,c,d//\)
 * \(f_{\omega 2}(n)\)
 * \(//a,b,c,1,d//\)
 * \(f_{\omega 2 +1}(n)\)
 * \(//a,b,c,2,2//\)
 * \(f_{\omega 2 +2}(n)\)
 * \(//a,b,c,3,2//\)
 * \(f_{\omega 2 +3}(n)\)
 * \(//a,b,c,d,2//\)
 * \(f_{\omega 3}(n)\)
 * \(//a,b,c,2,3//\)
 * \(f_{\omega 3 +1}(n)\)
 * \(//a,b,c,3,3//\)
 * \(f_{\omega 3 +2}(n)\)
 * \(//a,b,c,4,3//\)
 * \(f_{\omega 3 +3}(n)\)
 * \(//a,b,c,d,3//\)
 * \(f_{\omega 4}(n)\)
 * \(//a,b,c,2,4//\)
 * \(f_{\omega 4 +1}(n)\)
 * \(//a,b,1,c,d//\)
 * \(f_{\omega^2}(n)\)
 * \(//a,b,c,d,e//\)
 * \(f_{\omega^2}(n)\)
 * }
 * \(//a,b,c,3,3//\)
 * \(f_{\omega 3 +2}(n)\)
 * \(//a,b,c,4,3//\)
 * \(f_{\omega 3 +3}(n)\)
 * \(//a,b,c,d,3//\)
 * \(f_{\omega 4}(n)\)
 * \(//a,b,c,2,4//\)
 * \(f_{\omega 4 +1}(n)\)
 * \(//a,b,1,c,d//\)
 * \(f_{\omega^2}(n)\)
 * \(//a,b,c,d,e//\)
 * \(f_{\omega^2}(n)\)
 * }
 * \(f_{\omega^2}(n)\)
 * \(//a,b,c,d,e//\)
 * \(f_{\omega^2}(n)\)
 * }
 * }