1,2

Eric Weisstein's World of Mathematics, Link to a section of The World of Mathematics.

O.g.f f(z)=1+9*z+...= ((1+8*z+182*z^2+8*z^3+z^4)/((1-z)*(1-898*z^2+z^4))). With the first values, for n >+0 : a(n+5)=a(n+4)+898*a(n+3)-898*a(n+2)-a(n+1)+a(n). On every bisection modulo 2 : a(n+2)=30*a(n+1)-a(n)+200. On every bisection modulo 2 : a(n+1)=449*a(n)+100+60*sqrt(56*a(n)^2+25*a(n)). a(n)=(-25/112)+ ((11/28)+(11/112)*sqrt(14))*(15+4*sqrt(14))^n+ ((11/28)-(11/112)*sqrt(14))*(15-4*sqrt(14))^n+ ((7/32)-(1/16)*sqrt(14))*(-15+4*sqrt(14))^n+((7/32)+(1/16)*sqrt(14))*(-15-4*sqrt(14))^n [From Richard Choulet (richardchoulet(AT)yahoo.fr), May 08 2009]

a(0):=1:a(1):=9:a(2):=1089:a(3):=8281: a(4):=978121:for n from 0 to 20 do a(n+5):=a(n+4)+898*a(n+3)-898*a(n+2)-a(n+1)+a(n):od:seq(a(n), n=0..20); [From Richard Choulet (richardchoulet(AT)yahoo.fr), May 08 2009]

Cf. A048919, A048911, A001106.

Adjacent sequences: A036408 A036409 A036410 this_sequence A036412 A036413 A036414

Sequence in context: A099127 A054344 A048912 this_sequence A075412 A084149 A020261

easy,nonn

Jean-Francois Chariot (jeanfrancois.chariot(AT)afoc.alcatel.fr)

More terms from Eric Weisstein (eric(AT)weisstein.com)

More terms from Richard Choulet (richardchoulet(AT)yahoo.fr), May 08 2009