Interpolation and extremum problems in a Hilbert measures space (Q1974319)

Let \(X,Y\) be real Hilbert spaces (\(X\) is separable) and \(\mu\) a measure on \(X\) such that the corresponding correlation operator has an empty kernel. The measure \(\mu\) induces a scalar product with a corresponding norm on the space of all continuous polynomials from \(X\) into \(Y\) with degree \(\leq n\). The author gives necessary and sufficient conditions for the existence of interpolation polynomials and shows that in this case there is a unique solution with minimal norm. The further results deal with -- the existence of linear interpolation functionals, whose norm does not exceed upper bounds, -- examples where \(\dim (X)\) is 1, 2, or \(k\), -- the error estimation of this method, -- the question of convergence of the interpolation polynomials if the number of knots will be enlarged.