A177129 - cp's OEIS frontend

A177129 Sequence defined by the recurrence formula a(n+1)=sum(a(p)*a(n-p)+k,p=0..n)+l for n>=1, with here a(0)=1, a(1)=8, k=0 and l=1.

%I A177129 #5 Jun 14 2016 12:40:09
%S A177129 1,8,17,99,471,2816,16535,103942,661447,4327566,28698915,193214427,
%T A177129 1314753729,9035450112,62597834193,436806174807,3066961374135,
%U A177129 21653065678706,153619938907211,1094646596551549,7830810922793173
%N A177129 Sequence defined by the recurrence formula a(n+1)=sum(a(p)*a(n-p)+k,p=0..n)+l for n>=1, with here a(0)=1, a(1)=8, k=0 and l=1.
%F A177129 G.f f: f(z)=(1-sqrt(1-4*z*(a(0)-z*a(0)^2+z*a(1)+(k+l)*z^2/(1-z)+k*z^2/(1-z)^2)))/(2*z) (k=0, l=1).
%F A177129 Conjecture: (n+1)*a(n) +2*(-3*n+1)*a(n-1) +(-19*n+43)*a(n-2) +48*(n-3)*a(n-3) +24*(-n+4)*a(n-4)=0. - _R. J. Mathar_, Jun 14 2016
%e A177129 a(2)=2*1*8+1=17. a(3)=2*1*17+64+1=99.
%p A177129 l:=1: : k := 0 : m :=8: d(0):=1:d(1):=m: for n from 1 to 28 do d(n+1):=sum(d(p)*d(n-p)+k, p=0..n)+l:od :
%p A177129 taylor((1-sqrt(1-4*z*(d(0)-z*d(0)^2+z*m+(k+l)*z^2/(1-z)+k*z^2/(1-z)^2)))/(2*z), z=0, 31); seq(d(n), n=0..29);
%Y A177129 Cf. A177128.
%K A177129 easy,nonn
%O A177129 0,2
%A A177129 _Richard Choulet_, May 03 2010

cp's OEIS Frontend

A177129 Sequence defined by the recurrence formula a(n+1)=sum(a(p)*a(n-p)+k,p=0..n)+l for n>=1, with here a(0)=1, a(1)=8, k=0 and l=1.