G.f. A(x) is defined as the limit A(x) = lim_{n->oo} F(n)^(1/2^(n-1)) where F(n) is defined by F(n) = F(n-1)^2 + (2*x)^(2^n-1) for n >= 1 with F(0) = 1.

A101189

G.f. A(x) is defined as the limit A(x) = lim_{n->oo} F(n)^(1/2^(n-1)) where F(n) is defined by F(n) = F(n-1)^2 + (2*x)^(2^n-1) for n >= 1 with F(0) = 1.

Terms

    a(0) =1a(1) =2a(2) =0a(3) =4a(4) =-8a(5) =16a(6) =-40a(7) =144a(8) =-512a(9) =1696a(10) =-5696a(11) =19840a(12) =-70048a(13) =247744a(14) =-880128a(15) =3152768a(16) =-11386624a(17) =41389568a(18) =-151273728a(19) =555794944a(20) =-2052141056a(21) =7610274816a(22) =-28331018240a(23) =105833345024a(24) =-396594444800

External references