A triangular sequence based on a further generalization of the Cornelius-Schultz matrix polynomials to two sequences in i and j. a(n)=(n-1)!/f[n]: f[n]-> Fibonacci numbers; c(n)=1/n; B(i,j)=(-1)^(i + j)*a[j + 1]*c[i + 1]/(j!*(i - j)!) as a lower triangular matrix.

A135256

A triangular sequence based on a further generalization of the Cornelius-Schultz matrix polynomials to two sequences in i and j. a(n)=(n-1)!/f[n]: f[n]-> Fibonacci numbers; c(n)=1/n; B(i,j)=(-1)^(i + j)*a[j + 1]*c[i + 1]/(j!*(i - j)!) as a lower triangular matrix.

Terms

    a(0) =1a(1) =2a(2) =-1a(3) =12a(4) =-8a(5) =1a(6) =144a(7) =-108a(8) =20a(9) =-1a(10) =3600a(11) =-2844a(12) =608a(13) =-45a(14) =1a(15) =172800a(16) =-140112a(17) =32028a(18) =-2768a(19) =93a(20) =-1a(21) =15724800a(22) =-12922992a(23) =3054660a(24) =-283916a(25) =11231a(26) =-184a(27) =1a(28) =2641766400a(29) =-2186787456

External references