cp's OEIS Frontend

a(3n) = A135364(2n+1). a(3n+1) = A137584(2n+1). a(3n+2) = A137531(2n+2).

From R. J. Mathar, Jul 06 2011: (Start)

G.f.: ( -2+x ) / ( -1+2*x-x^2+x^3 ).

a(n) = 2*A005314(n+1) - A005314(n). (End)

Sum_{k=0..n} T(n, k) = A100219(n) (row sums).

Number triangle T(n, k) = (-1)^(n-k)*(binomial(k, n-k) + binomial(k-1, n-k-1)), with T(0, 0) = 1. - Paul Barry, Nov 09 2004

T(n,k) = T(n-1,k) + T(n-1,k-1) - 2*T(n-2,k-1) + T(n-3,k-1), T(0,0)=1, T(1,0)=-1, T(1,1)=1, T(n,k)=0 if k < 0 or if k > n. - Philippe Deléham, Jan 09 2014

From G. C. Greubel, Mar 28 2024: (Start)

T(n, n-1) = A000027(n), n >= 1.

T(n, n-2) = -A080956(n-1), n >= 2.

T(2*n, n) = A280560(n).

T(2*n-1, n) = A157142(n-1), n >= 1.

T(2*n+1, n) = -A000007(n) = A154955(n+2).

T(3*n, n) = T(4*n, n) = A000007(n).

Sum_{k=0..n} (-1)^k*T(n, k) = A355021(n).

Sum_{k=0..floor(n/2)} T(n-k, k) = (-1)^n*A098601(n).

Sum_{k=0..floor(n/2)} (-1)^k*T(n-k, k) = -1 + 2*A077961(n) + A077961(n-2). (End)

From Peter Bala, Apr 28 2024: (Start)

This Riordan array has the form ( x*h'(x)/h(x), h(x) ) with h(x) = x*(1 - x) and hence belongs to the hitting time subgroup of the Riordan group (see Peart and Woan for properties of this subgroup).

T(n,k) = [x^(n-k)] (1/c(x))^n, where c(x) = (1 - sqrt(1 - 4*x))/(2*x) is the g.f. of the Catalan numbers A000108. In general the (n, k)-th entry of the hitting time array ( x*h'(x)/h(x), h(x) ) has the form [x^(n-k)] f(x)^n, where f(x) = x/( series reversion of h(x) ). (End)

Triangle: T(n, k) = binomial(k, n-k) + binomial(k-1, n-k-1), with T(0, 0) = 1.

Sum_{k=0..n} T(n, k) = A098600(n) (row sums).

T(n,k) = T(n-1,k-1) - T(n-1,k) + 2*T(n-2,k-1) + T(n-3,k-1), T(0,0)=1, T(1,0)=1, T(1,1)=1, T(n,k)=0 if k<0 or if k>n. - Philippe Deléham, Jan 09 2014

From G. C. Greubel, Mar 27 2024: (Start)

T(2*n, n) = A040000(n).

T(2*n+1, n) = A000007(n).

T(2*n-1, n) = A005408(n-1), n >= 1.

Sum_{k=0..n} (-1)^k*T(n, k) = A079757(n).

Sum_{k=0..floor(n/2)} T(n-k, k) = A098601(n). (End)