A recursive method for computing interpolants (Q929945)

The authors give a recursive solution of a general interpolation problem where the interpolation space \(V\) is spanned by some continuous functions defined on \(\mathbb{R}^d\). From this the authors describe another algorithm which allows to compute the coefficients of the interpolant related to the basis of \(V\). Further the authors apply this technique to the univariate spline spaces. In what follows the authors study the tensor product interpolation and describe a recursive construction of the corresponding interpolant. They consider also the multivariate interpolation problem and give a recursive algorithm allowing to simplify the resolution of the multivariate interpolation problem. A section in the paper contains some numerical examples for testing the performance of algorithm.