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%I #9 Aug 28 2019 15:53:52
%S 1,10,92,833,7511,22547,202967,1826846,49326272,443941310,3995488586,
%T 35959456060,323635312552,2912718555868,2912718853028,26214470754457,
%U 235930240718743,6370116542620991,57331049042801819
%N Numerators of partial sums of Catalan numbers scaled by powers of 1/9.
%C Denominators are given under A120997.
%C This is the second member (p=1) of the first p-family of partial sums of normalized scaled Catalan series CsnI(p):=sum(C(k)/L(2*p)^(2*k),k=0..infinity) with limit L(2*p)*(F(2*p+1) - F(2*p)*phi) = L(2*p)/phi^(2*p), with C(n)=A000108(n) (Catalan), F(n)= A000045(n) (Fibonacci), L(n) = A000032(n) (Lucas) and phi:=(1+sqrt(5))/2 (golden section).
%C Other members of this rational p-family are: A120778(n)/A120777(n) (p=0), ......
%C From the expansion of sqrt(1-x) = 1 -(x/2)*sum(C(k)*(x/4)^k,k=0..infinity), for |x|<=1, one has sum(C(k)/q^k,k=0..infinity) = (q - sqrt(q*(q-4)))/2, for |q|>=4.
%C The CsnI(1) series value is lim_{n->infinity}(r(n)) = 3*(2-phi) = 3/phi^2 = 1.145898034 (maple10, 10 digits).
%C The partial sums of the above mentioned first p-family are rI(p;n):=sum(C(k)/L(2*p)^(2*k), k=0..n), n>=0, for p=0,1,...
%C For special q values q(n):=2 + L(2*n), n>=0, one finds the above given limits for the p-family members for n=2*p (even), p>=0. The Pell equation x^2 -5*y^2 = +4 with general (nonnegative) solutions (x,y)=(L(2*n),F(2*n)) and well known identities for Fibonacci and Lucas numbers were used to derive the above given p-family result. See the W. Lang link.
%H W. Lang: <a href="/A120996/a120996.txt">Rationals r(n), limit and four p-families of scaled Catalan series.</a>
%F a(n)=numerator(r(n)) with r(n) := rI(p=1,n) = sum(C(k)/L(2)^(2*k),k=0..n), with Lucas L(2)=3 and C(k):=A000108(k) (Catalan). The rationals r(n) are given in lowest terms.
%e Rationals r(n): [1, 10/9, 92/81, 833/729, 7511/6561, 22547/19683,
%e 202967/177147, 1826846/1594323,...].
%K nonn,frac,easy
%O 0,2
%A _Wolfdieter Lang_, Aug 16 2006
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