This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
Formulas for initial columns are, for n>=0: T(n+1,1) = 1 - 2^(n+1); T(n+2,2) = 1 + 2^(n+1)*n; T(n+3,3) = 1 - 2^(n+1)*(n*(n+1)/2 + 1); T(n+4,4) = 1 + 2^(n+1)*(n*(n+1)*(n+2)/6 + n); T(n+5,5) = 1 - 2^(n+1)*(n*(n+1)*(n+2)*(n+3)/24 + n*(n+1)/2 + 1). Triangle begins: 1; 1,-1; 1,-3,1; 1,-7,5,-1; 1,-15,17,-7,1; 1,-31,49,-31,9,-1; 1,-63,129,-111,49,-11,1; 1,-127,321,-351,209,-71,13,-1; 1,-255,769,-1023,769,-351,97,-15,1; 1,-511,1793,-2815,2561,-1471,545,-127,17,-1; 1,-1023,4097,-7423,7937,-5503,2561,-799,161,-19,1; ... The matrix square, T^2, starts: 1; 0,1; -1,0,1; -2,-1,0,1; -3,-2,-1,0,1; -4,-3,-2,-1,0,1; ... where all columns are the same. The matrix product C^-1*T*C = T^-1*C^2 is: 1; -1,-1; 0, 1, 1; 0, 0,-1,-1; 0, 0, 0, 1, 1; ... where C(n,k) = n!/(n-k)!/k!.
Table[(1 + (-1)^k*2^(n - k + 1)*Sum[ Binomial[n - 2 j - 2, k - 2 j - 1], {j, 0, Floor[k/2]}]) - 4 Boole[And[n == 1, k == 0]], {n, 0, 10}, {k, 0, n}] // Flatten (* Michael De Vlieger, Nov 24 2016 *)
{T(n,k)=if(n==0&k==0,1,1+(-1)^k*2^(n-k+1)*sum(j=0,k\2,binomial(n-2*j-2,k-2*j-1)))}
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