0,3

A107051(n)/a(n) = Sum_{k=0..n} T(n, k)*4^k where T(n, k) = A107045(n, k)/A107046(n, k) = [A079901^-1](n, k) (matrix inverse of A079901).

4^0 = 1;

4^1 = 1 + (3)*1;

4^2 = 1 + (3)*2 + (9/4)*2^2;

4^3 = 1 + (3)*3 + (9/4)*3^2 + (5/4)*3^3;

4^4 = 1 + (3)*4 + (9/4)*4^2 + (5/4)*4^3 + (127/256)*4^4.

Initial coefficients are:

A107051/A107052 = {1, 3, 9/4, 5/4, 127/256, 124273/800000,

385829/9600000, 70009765747/7906012800000,

220026935042111/129532113715200000, ...}.

(PARI) {a(n)=denominator(sum(k=0, n, 4^k*(matrix(n+1, n+1, r, c, if(r>=c, (r-1)^(c-1)))^-1)[n+1, k+1]))}

Cf. A107051, A107045/A107046, A107047/A107048 (y=2), A107049/A107050 (y=3), A107053/A107054 (y=5).

Sequence in context: A160365 A080509 A063439 this_sequence A000790 A068556 A078243

Adjacent sequences: A107049 A107050 A107051 this_sequence A107053 A107054 A107055

nonn,frac

Paul D. Hanna (pauldhanna(AT)juno.com), May 10 2005