Application of the Szili method of interpolation on the roots of the Legendre polynomials (Q1586367)

The regularity of the interpolation matrix \[ E=\{e_{i,k}\}_{i=1,k=0,1}^{2N+1}, \] with \(e_{i,0}=1\), \(i=1,\ldots ,N+1\); \(e_{i,1}=1\), \(i=1,N+2,\ldots ,2N+1\); \(e_{i,j}=0 \) for other \(i,j\), is proved for every \(n\in {\mathbb N}\) and for the set of knots \(X=\{x_1,\ldots ,x_{2N+1}\}\), \(x_1= -1, P_N(x_i)= 0\), \(i=2,\ldots ,N+1;\) \(P'_N(x_i)=0\), \(i=N+2,\ldots ,2N\); \(x_{2N+1}=1,\) where \(P_N(x)\) is the \(N\)-th Legendre polynomial.